Maze pattern analysis with image matching

Abstract

Processes and apparatuses analyze an image of a maze pattern in order to extract bits encoded in the maze pattern by iteratively obtaining a perspective transform from the captured image plane to the paper plane. The embedded interactive data is recognized by obtaining a perspective transform between the captured image plane and paper plane based on an obtained affine transform. The perspective transform typically models the relationship between two planes more precisely than the affine transform. The number of error bits in the extracted bit matrix is typically reduced, thus enabling decoding of position information to be more efficient and robust.

Description

TECHNICAL FIELD

The present invention relates to interacting with a medium using a digital pen. More particularly, the present invention relates to analyzing a maze pattern and extracting bits from the maze pattern.

BACKGROUND

Computer users are accustomed to using a mouse and keyboard as a way of interacting with a personal computer. While personal computers provide a number of advantages over written documents, most users continue to perform certain functions using printed paper. Some of these functions include reading and annotating written documents. In the case of annotations, the printed document assumes a greater significance because of the annotations placed on it by the user. One of the difficulties, however, with having a printed document with annotations is the later need to have the annotations entered back into the electronic form of the document. This requires the original user or another user to wade through the annotations and enter them into a personal computer. In some cases, a user will scan in the annotations and the original text, thereby creating a new document. These multiple steps make the interaction between the printed document and the electronic version of the document difficult to handle on a repeated basis. Further, scanned-in images are frequently non-modifiable. There may be no way to separate the annotations from the original text. This makes using the annotations difficult. Accordingly, an improved way of handling annotations is needed.

One technique of capturing handwritten information is by using a pen whose location may be determined during writing. One pen that provides this capability is the Anoto pen by Anoto Inc. This pen functions by using a camera to capture an image of paper encoded with a predefined pattern. An example of the image pattern is shown in FIG. 11. This pattern is used by the Anoto pen (by Anoto Inc.) to determine a location of a pen on a piece of paper. However, it is unclear how efficient the determination of the location is with the system used by the Anoto pen. To provide efficient determination of the location of the captured image, a system that provides an efficient extraction of bits from a captured image of the maze pattern and that is robust to the user's operating environment would be desirable.

SUMMARY

Aspects of the present invention provide solutions to at least one of the issues mentioned above, thereby enabling one to extract bits from a maze pattern to locate a position or positions of the captured image on a viewed document. The viewed document may be on paper, LCD screen, or any other medium with the predefined pattern. Aspects of the present invention include analyzing a document image and extracting bits of the associated m-array. A maze pattern is constructed from the m-array using selected embedded interaction code (EIC) fonts.

With one aspect of the invention, an image of a maze pattern is analyzed in order to extract bits encoded in the maze pattern by iteratively obtaining a perspective transform from the captured image plane to the paper plane. The embedded interactive data is recognized by obtaining a perspective transform between the captured image plane and paper plane based on an obtained affine transform. The perspective transform typically models the relationship between two planes more precisely than the affine transform. The number of error bits in the extracted bit matrix is typically reduced, thus enabling the m-array decoding to be more efficient and robust.

With another aspect of the invention, if the consecutive bit matrices are the same while performing an iterative process, the current bits are extracted from the bit matrix for subsequent decoding.

With another aspect of the invention, if the number of iterations of an iterative process exceeds a predetermined threshold, the iterative process is terminated.

These and other aspects of the present invention will become known through the following drawings and associated description.

BRIEF DESCRIPTION OF DRAWINGS

The foregoing summary of the invention, as well as the following detailed description of preferred embodiments, is better understood when read in conjunction with the accompanying drawings, which are included by way of example, and not by way of limitation with regard to the claimed invention.

FIG. 1 shows a general description of a computer that may be used in conjunction with embodiments of the present invention.

FIGS. 2A and 2B show an image capture system and corresponding captured image in accordance with embodiments of the present invention.

FIGS. 3A through 3F show various sequences and folding techniques in accordance with embodiments of the present invention.

FIGS. 4A through 4E show various encoding systems in accordance with embodiments of the present invention.

FIGS. 5A through 5D show four possible resultant corners associated with the encoding system according to FIGS. 4A and 4B.

FIG. 6 shows rotation of a captured image portion in accordance with embodiments of the present invention.

FIG. 7 shows various angles of rotation used in conjunction with the coding system of FIGS. 4A through 4E.

FIG. 8 shows a process for determining the location of a captured array in accordance with embodiments of the present invention.

FIG. 9 shows a method for determining the location of a captured image in accordance with embodiments of the present invention.

FIG. 10 shows another method for determining the location of captured image in accordance with embodiments of the present invention.

FIG. 11 shows a representation of encoding space in a document according to prior art.

FIG. 12 shows a flow diagram for decoding extracted bits from a captured image in accordance with embodiments of the present invention.

FIG. 13 shows bit selection of extracted bits from a captured image in accordance with embodiments of the present invention.

FIG. 14 shows an apparatus for decoding extracted bits from a captured image in accordance with embodiments of the present invention.

FIG. 15 shows an exemplary image of a maze pattern that illustrates a maze pattern cell with an associated maze pattern bar in accordance with embodiments of the invention.

FIG. 16 shows an exemplary image of a maze pattern that illustrates estimated directions for the effective pixels in accordance with embodiments of the invention.

FIG. 17 shows an exemplary image of a portion of a maze pattern that illustrates estimating a direction for an effective pixel in accordance with embodiments of the invention.

FIG. 18 shows an exemplary image of a maze pattern that illustrates calculating line parameters for a grid line that passes through a representative effective pixel in accordance with embodiments of the invention.

FIG. 19 shows an exemplary image of a maze pattern that illustrates estimated grid lines associated with a selected cluster in accordance with embodiments of the invention.

FIG. 20 shows an exemplary image of a maze pattern that illustrates estimated grid lines associated with the remaining cluster in accordance with embodiments of the invention.

FIG. 21 shows an exemplary image of a maze pattern that illustrates pruning estimated grid lines in accordance with embodiments of the invention.

FIG. 22 shows an exemplary image of a maze pattern in which best fit lines are selected from the pruned grid lines in accordance with embodiments of the invention.

FIG. 23 shows an exemplary image of a maze pattern with associated affine parameters in accordance with embodiments of the invention.

FIG. 24 shows an exemplary image of a maze pattern that illustrates tuning a grid line in accordance with embodiments of the invention.

FIG. 25 shows an exemplary image of a maze pattern with grid lines after tuning in accordance with embodiments of the invention.

FIG. 26 shows a process for determining grid lines for a maze pattern in accordance with embodiments of the invention.

FIG. 27 shows an exemplary image of a maze pattern that illustrates determining a correct orientation of the maze pattern in accordance with embodiments of the invention.

FIG. 28 shows an exemplary image of a maze pattern in which a bit is extracted from a partially visible maze pattern cell in accordance with embodiments of the invention.

FIG. 29 shows apparatus for extracting bits from a maze pattern in accordance with embodiments of the invention.

FIG. 30 shows an example of an original captured image in accordance with an embodiment of the invention.

FIG. 31 shows a normalized image of the image shown in FIG. 30 in accordance with an embodiment of the invention.

FIG. 32 shows affine grids that are derived from the image shown in FIG. 31 in accordance with an embodiment of the invention.

FIG. 33 shows maze pattern grids obtained from a perspective transform in accordance with an embodiment of the invention.

FIG. 34 shows a process for processing a captured stroke in accordance with an embodiment of the invention.

FIG. 35 shows a process for obtaining grid lines from an affine transform according to an embodiment of the invention.

FIG. 36 shows a process for obtaining grid lines from a perspective transform according to an embodiment of the invention.

FIG. 36A shows an example of a pattern image according to an embodiment of the invention.

FIG. 36B shows another example of a pattern image according to an embodiment of the invention.

FIG. 37 shows an example of an original image according to an embodiment of the invention.

FIG. 38 shows an example of a normalized image according to an embodiment of the invention.

FIG. 39 shows affine grids for the image shown in FIG. 38 according to an embodiment of the invention.

FIG. 40 shows bit matrix (B₀) corresponding to FIG. 39 according to an embodiment of the invention.

FIG. 41 shows a generated pattern image (I_{Generated—loop1}) based on the bit matrix B₀ according to an embodiment of the invention.

FIG. 42 shows grid lines derived from a perspective transform T₁ according to an embodiment of the invention.

FIG. 43 shows bit matrix (B₁) according to an embodiment of the invention.

FIG. 44 shows a generated pattern image (I_{Generated—loop2}) based on the bit matrix B₁ according to an embodiment of the invention.

FIG. 45 shows grid lines derived from a perspective transform T₂ according to an embodiment of the invention.

FIG. 46 shows bit matrix (B₂) according to an embodiment of the invention.

FIG. 47 shows a generated pattern image (I_{Generated—loop3}) based on the bit matrix B₂ according to an embodiment of the invention.

FIG. 48 shows grid lines derived from a perspective transform T₃ according to an embodiment of the invention.

FIG. 49 shows bit matrix (B₃) according to an embodiment of the invention.

FIG. 50 shows a generated pattern image (I_{Generated—loop4}) based on the bit matrix B₃ according to an embodiment of the invention.

FIG. 51 shows grid lines derived from a perspective transform T₄ according to an embodiment of the invention.

FIG. 52 shows bit matrix (B₄) according to an embodiment of the invention.

FIG. 53 shows apparatus for extracting a bit matrix from a captured image according to an embodiment of the invention.

DETAILED DESCRIPTION

Aspects of the present invention relate to extracting bits that are associated with an embedded interaction code (EIC) pattern of an electronic pattern.

The following is separated by subheadings for the benefit of the reader. The subheadings include: Terms, General-Purpose Computer, Image Capturing Pen, Encoding of Array, Decoding, Error Correction, Location Determination, Maze Pattern Analysis, and Maze Pattern Analysis with Image Matching.

Terms

Pen—any writing implement that may or may not include the ability to store ink. In some examples, a stylus with no ink capability may be used as a pen in accordance with embodiments of the present invention.

Camera—an image capture system that may capture an image from paper or any other medium.

General Purpose Computer

FIG. 1 is a functional block diagram of an example of a conventional general-purpose digital computing environment that can be used to implement various aspects of the present invention. In FIG. 1, a computer 100 includes a processing unit 110, a system memory 120, and a system bus 130 that couples various system components including the system memory to the processing unit 110. The system bus 130 may be any of several types of bus structures including a memory bus or memory controller, a peripheral bus, and a local bus using any of a variety of bus architectures. The system memory 120 includes read only memory (ROM) 140 and random access memory (RAM) 150.

A basic input/output system 160 (BIOS), containing the basic routines that help to transfer information between elements within the computer 100, such as during start-up, is stored in the ROM 140. The computer 100 also includes a hard disk drive 170 for reading from and writing to a hard disk (not shown), a magnetic disk drive 180 for reading from or writing to a removable magnetic disk 190, and an optical disk drive 191 for reading from or writing to a removable optical disk 192 such as a CD ROM or other optical media. The hard disk drive 170, magnetic disk drive 180, and optical disk drive 191 are connected to the system bus 130 by a hard disk drive interface 192, a magnetic disk drive interface 193, and an optical disk drive interface 194, respectively. The drives and their associated computer-readable media provide nonvolatile storage of computer readable instructions, data structures, program modules and other data for the personal computer 100. It will be appreciated by those skilled in the art that other types of computer readable media that can store data that is accessible by a computer, such as magnetic cassettes, flash memory cards, digital video disks, Bernoulli cartridges, random access memories (RAMs), read only memories (ROMs), and the like, may also be used in the example operating environment.

A number of program modules can be stored on the hard disk drive 170, magnetic disk 190, optical disk 192, ROM 140 or RAM 150, including an operating system 195, one or more application programs 196, other program modules 197, and program data 198. A user can enter commands and information into the computer 100 through input devices such as a keyboard 101 and pointing device 102. Other input devices (not shown) may include a microphone, joystick, game pad, satellite dish, scanner or the like. These and other input devices are often connected to the processing unit 110 through a serial port interface 106 that is coupled to the system bus, but may be connected by other interfaces, such as a parallel port, game port or a universal serial bus (USB). Further still, these devices may be coupled directly to the system bus 130 via an appropriate interface (not shown). A monitor 107 or other type of display device is also connected to the system bus 130 via an interface, such as a video adapter 108. In addition to the monitor, personal computers typically include other peripheral output devices (not shown), such as speakers and printers. In a preferred embodiment, a pen digitizer 165 and accompanying pen or stylus 166 are provided in order to digitally capture freehand input. Although a direct connection between the pen digitizer 165 and the serial port is shown, in practice, the pen digitizer 165 may be coupled to the processing unit 110 directly, via a parallel port or other interface and the system bus 130 as known in the art. Furthermore, although the digitizer 165 is shown apart from the monitor 107, it is preferred that the usable input area of the digitizer 165 be co-extensive with the display area of the monitor 107. Further still, the digitizer 165 may be integrated in the monitor 107, or may exist as a separate device overlaying or otherwise appended to the monitor 107.

The computer 100 can operate in a networked environment using logical connections to one or more remote computers, such as a remote computer 109. The remote computer 109 can be a server, a router, a network PC, a peer device or other common network node, and typically includes many or all of the elements described above relative to the computer 100, although only a memory storage device 111 has been illustrated in FIG. 1. The logical connections depicted in FIG. 1 include a local area network (LAN) 112 and a wide area network (WAN) 113. Such networking environments are commonplace in offices, enterprise-wide computer networks, intranets and the Internet.

When used in a LAN networking environment, the computer 100 is connected to the local network 112 through a network interface or adapter 114. When used in a WAN networking environment, the personal computer 100 typically includes a modem 115 or other means for establishing a communications over the wide area network 113, such as the Internet. The modem 115, which may be internal or external, is connected to the system bus 130 via the serial port interface 106. In a networked environment, program modules depicted relative to the personal computer 100, or portions thereof, may be stored in the remote memory storage device.

It will be appreciated that the network connections shown are illustrative and other techniques for establishing a communications link between the computers can be used.

The existence of any of various well-known protocols such as TCP/IP, Ethernet, FTP, HTTP, Bluetooth, IEEE 802.11x and the like is presumed, and the system can be operated in a client-server configuration to permit a user to retrieve web pages from a web-based server. Any of various conventional web browsers can be used to display and manipulate data on web pages.

Image Capturing Pen

Aspects of the present invention include placing an encoded data stream in a displayed form that represents the encoded data stream. (For example, as will be discussed with FIG. 4B, the encoded data stream is used to create a graphical pattern.) The displayed form may be printed paper (or other physical medium) or may be a display projecting the encoded data stream in conjunction with another image or set of images. For example, the encoded data stream may be represented as a physical graphical image on the paper or a graphical image overlying the displayed image (e.g., representing the text of a document) or may be a physical (non-modifiable) graphical image on a display screen (so any image portion captured by a pen is locatable on the display screen).

This determination of the location of a captured image may be used to determine the location of a user's interaction with the paper, medium, or display screen. In some aspects of the present invention, the pen may be an ink pen writing on paper. In other aspects, the pen may be a stylus with the user writing on the surface of a computer display. Any interaction may be provided back to the system with knowledge of the encoded image on the document or supporting the document displayed on the computer screen. By repeatedly capturing images with a camera in the pen or stylus as the pen or stylus traverses a document, the system can track movement of the stylus being controlled by the user. The displayed or printed image may be a watermark associated with the blank or content-rich paper or may be a watermark associated with a displayed image or a fixed coding overlying a screen or built into a screen.

FIGS. 2A and 2B show an illustrative example of pen 201 with a camera 203. Pen 201 includes a tip 202 that may or may not include an ink reservoir. Camera 203 captures an image 204 from surface 207. Pen 201 may further include additional sensors and/or processors as represented in broken box 206. These sensors and/or processors 206 may also include the ability to transmit information to another pen 201 and/or a personal computer (for example, via Bluetooth or other wireless protocols).

FIG. 2B represents an image as viewed by camera 203. In one illustrative example, the field of view of camera 203 (i.e., the resolution of the image sensor of the camera) is 32×32 pixels (where N=32). In the embodiment, a captured image (32 pixels by 32 pixels) corresponds to an area of approximately 5 mm by 5 mm of the surface plane captured by camera 203. Accordingly, FIG. 2B shows a field of view of 32 pixels long by 32 pixels wide. The size of N is adjustable, such that a larger N corresponds to a higher image resolution. Also, while the field of view of the camera 203 is shown as a square for illustrative purposes here, the field of view may include other shapes as is known in the art.

The images captured by camera 203 may be defined as a sequence of image frames {I_i}, where I_i is captured by the pen 201 at sampling time ti. The sampling rate may be large or small, depending on system configuration and performance requirement. The size of the captured image frame may be large or small, depending on system configuration and performance requirement.

The image captured by camera 203 may be used directly by the processing system or may undergo pre-filtering. This pre-filtering may occur in pen 201 or may occur outside of pen 201 (for example, in a personal computer).

The image size of FIG. 2B is 32×32 pixels. If each encoding unit size is 3×3 pixels, then the number of captured encoded units would be approximately 100 units. If the encoding unit size is 5×5 pixels, then the number of captured encoded units is approximately 36.

FIG. 2A also shows the image plane 209 on which an image 210 of the pattern from location 204 is formed. Light received from the pattern on the object plane 207 is focused by lens 208. Lens 208 may be a single lens or a multi-part lens system, but is represented here as a single lens for simplicity. Image capturing sensor 211 captures the image 210.

The image sensor 211 may be large enough to capture the image 210. Alternatively, the image sensor 211 may be large enough to capture an image of the pen tip 202 at location 212. For reference, the image at location 212 is referred to as the virtual pen tip. It is noted that the virtual pen tip location with respect to image sensor 211 is fixed because of the constant relationship between the pen tip, the lens 208, and the image sensor 211.

The following transformation F_S→P transforms position coordinates in the image captured by camera to position coordinates in the real image on the paper: L_paper=F_S→P (L_Sensor)

During writing, the pen tip and the paper are on the same plane. Accordingly, the transformation from the virtual pen tip to the real pen tip is also F_S→P: L_pentip=F_S→P (L_{virtual-pentip})

The transformation F_S→P may be estimated as an affine transform. This simplifies as: $F_{S\to P}=\left[\begin{array}{ccc}\frac{\sin {\theta }_y}{s_x}& \frac{\cos {\theta }_y}{s_x}& 0\\ \frac{-\sin {\theta }_x}{s_y}& \frac{\cos {\theta }_x}{s_y}& 0\\ 0& 0& 1\\ & & \end{array}\right]$ as the estimation of F_S→P, in which θ_x, θ_y, s_x, and s_y are the rotation and scale of two orientations of the pattern captured at location 204. Further, one can refine F′_S→P by matching the captured image with the corresponding real image on paper. “Refine” means to get a more precise estimation of the transformation F_S→P by a type of optimization algorithm referred to as a recursive method. The recursive method treats the matrix F′_S→P as the initial value. The refined estimation describes the transformation between S and P more precisely.

Next, one can determine the location of virtual pen tip by calibration.

One places the pen tip 202 on a fixed location L_pentip on paper. Next, one tilts the pen, allowing the camera 203 to capture a series of images with different pen poses. For each image captured, one may obtain the transformation F_S→P. From this transformation, one can obtain the location of the virtual pen tip L_{virtual-pentip}: L_{virtual-pentip}=F_P→S (L_pentip) where L_pentip is initialized as (0, 0) and F_P→S=(F_S→P)⁻¹

By averaging the L_{virtual-pentip} obtained from each image, a location of the virtual pen tip L_{virtual-pentip} may be determined. With L_{virtual-pentip}, one can get a more accurate estimation of L_pentip. After several times of iteration, an accurate location of virtual pen tip L_{virtual-pentip} may be determined.

The location of the virtual pen tip L_{virtual-pentip} is now known. One can also obtain the transformation F_S→P from the images captured. Finally, one can use this information to determine the location of the real pen tip L_pentip: L_pentip=F_S→P (L_{virtual-pentip}) Encoding of Array

A two-dimensional array may be constructed by folding a one-dimensional sequence. Any portion of the two-dimensional array containing a large enough number of bits may be used to determine its location in the complete two-dimensional array. However, it may be necessary to determine the location from a captured image or a few captured images. So as to minimize the possibility of a captured image portion being associated with two or more locations in the two-dimensional array, a non-repeating sequence may be used to create the array. One property of a created sequence is that the sequence does not repeat over a length (or window) n. The following describes the creation of the one-dimensional sequence then the folding of the sequence into an array.

Sequence Construction

A sequence of numbers may be used as the starting point of the encoding system. For example, a sequence (also referred to as an m-sequence) may be represented as a q-element set in field F_q. Here, q=p′ where n 1 and p is a prime number. The sequence or m-sequence may be generated by a variety of different techniques including, but not limited to, polynomial division. Using polynomial division, the sequence may be defined as follows: $\frac{R_l\left(x\right)}{P_n\left(x\right)}$ where P_n(x) is a primitive polynomial of degree n in field F_q[x] (having qⁿ elements). R_l(x) is a nonzero polynomial of degree l (where l<n) in field F_q[x]. The sequence may be created using an iterative procedure with two steps: first, dividing the two polynomials (resulting in an element of field F_q) and, second, multiplying the remainder by x. The computation stops when the output begins to repeat. This process may be implemented using a linear feedback shift register as set forth in an article by Douglas W. Clark and Lih-Jyh Weng, “Maximal and Near-Maximal Shift Register Sequences: Efficient Event Counters and Easy Discrete Logarithms,” IEEE Transactions on Computers 43.5 (May 1994, pp 560-568). In this environment, a relationship is established between cyclical shifting of the sequence and polynomial R_l(x): changing R_l(x) only cyclically shifts the sequence and every cyclical shifting corresponds to a polynomial R_l(x). One of the properties of the resulting sequence is that, the sequence has a period of qⁿ⁻1 and within a period, over a width (or length) n, any portion exists once and only once in the sequence. This is called the “window property”. Period qⁿ−1 is also referred to as the length of the sequence and n as the order of the sequence.

The process described above is but one of a variety of processes that may be used to create a sequence with the window property.

Array Construction

The array (or m-array) that may be used to create the image (of which a portion may be captured by the camera) is an extension of the one-dimensional sequence or m-sequence. Let A be an array of period (m₁, m₂), namely A(k+m₁, l)=A(k, l+m₂)=A(k, l). When an n₁×n₂ window shifts through a period of A, all the nonzero n₁×n₂ matrices over F_q appear once and only once. This property is also referred to as a “window property” in that each window is unique. A widow may then be expressed as an array of period (m₁, m₂) (with m₁ and m₂ being the horizontal and vertical number of bits present in the array) and order (n₁, n₂).

A binary array (or m-array) may be constructed by folding the sequence. One approach is to obtain a sequence then fold it to a size of m₁×m₂ where the length of the array is L=m₁×m₂=2−1. Alternatively, one may start with a predetermined size of the space that one wants to cover (for example, one sheet of paper, 30 sheets of paper or the size of a computer monitor), determine the area (m₁×m₂), then use the size to let L m₁×m₂, where L=2ⁿ−1.

A variety of different folding techniques may be used. For example, FIGS. 3A through 3C show three different sequences. Each of these may be folded into the array shown as FIG. 3D. The three different folding methods are shown as the overlay in FIG. 3D and as the raster paths in FIGS. 3E and 3F. We adopt the folding method shown in FIG. 3D.

To create the folding method as shown in FIG. 3D, one creates a sequence {a_l} of length L and order n. Next, an array {b_kl} of size m₁×m₂, where gcd(m₁, m₂)=1 and L=m₁×m₂, is created from the sequence {a_i} by letting each bit of the array be calculated as shown by equation 1: b_kl=a_i, where k=i mod(m₁), l=i mod(m₂), i=0, . . . , L−1   (1)

This folding approach may be alternatively expressed as laying the sequence on the diagonal of the array, then continuing from the opposite edge when an edge is reached.

FIG. 4A shows sample encoding techniques that may be used to encode the array of FIG. 3D. It is appreciated that other encoding techniques may be used. For example, an alternative coding technique is shown in FIG. 11.

Referring to FIG. 4A, a first bit 401 (for example, “1”) is represented by a column of dark ink. A second bit 402 (for example, “0”) is represented by a row of dark ink. It is appreciated that any color ink may be used to represent the various bits. The only requirement in the color of the ink chosen is that it provides a significant contrast with the background of the medium to be differentiable by an image capture system. The bits in FIG. 4A are represented by a 3×3 matrix of cells. The size of the matrix may be modified to be any size as based on the size and resolution of an image capture system. Alternative representation of bits 0 and 1 are shown in FIGS. 4C-4E. It is appreciated that the representation of a one or a zero for the sample encodings of FIGS. 4A-4E may be switched without effect. FIG. 4C shows bit representations occupying two rows or columns in an interleaved arrangement. FIG. 4D shows an alternative arrangement of the pixels in rows and columns in a dashed form. Finally FIG. 4E shows pixel representations in columns and rows in an irregular spacing format (e.g., two dark dots followed by a blank dot).

Referring back to FIG. 4A, if a bit is represented by a 3×3 matrix and an imaging system detects a dark row and two white rows in the 3×3 region, then a zero is detected (or one). If an image is detected with a dark column and two white columns, then a one is detected (or a zero).

Here, more than one pixel or dot is used to represent a bit. Using a single pixel (or bit) to represent a bit is fragile. Dust, creases in paper, non-planar surfaces, and the like create difficulties in reading single bit representations of data units. However, it is appreciated that different approaches may be used to graphically represent the array on a surface. Some approaches are shown in FIGS. 4C through 4E. It is appreciated that other approaches may be used as well. One approach is set forth in FIG. 11 using only space-shifted dots.

A bit stream is used to create the graphical pattern 403 of FIG. 4B. Graphical pattern 403 includes 12 rows and 18 columns. The rows and columns are formed by a bit stream that is converted into a graphical representation using bit representations 401 and 402. FIG. 4B may be viewed as having the following bit representation: $\left[\begin{array}{ccccccccc}0& 1& 0& 1& 0& 1& 1& 1& 0\\ 1& 1& 0& 1& 1& 0& 0& 1& 0\\ 0& 0& 1& 0& 1& 0& 0& 1& 1\\ 1& 0& 1& 1& 0& 1& 1& 0& 0\end{array}\right]\hspace{1em}$ Decoding

When a person writes with the pen of FIG. 2A or moves the pen close to the encoded pattern, the camera captures an image. For example, pen 201 may utilize a pressure sensor as pen 201 is pressed against paper and pen 201 traverses a document on the paper. The image is then processed to determine the orientation of the captured image with respect to the complete representation of the encoded image and extract the bits that make up the captured image.

For the determination of the orientation of the captured image relative to the whole encoded area, one may notice that not all the four conceivable corners shown in FIG. 5A-5D can present in the graphical pattern 403. In fact, with the correct orientation, the type of corner shown in FIG. 5A cannot exist in the graphical pattern 403. Therefore, the orientation in which the type of corner shown in FIG. 5A is missing is the right orientation.

Continuing to FIG. 6, the image captured by a camera 601 may be analyzed and its orientation determined so as to be interpretable as to the position actually represented by the image 601. First, image 601 is reviewed to determine the angle θ needed to rotate the image so that the pixels are horizontally and vertically aligned. It is noted that alternative grid alignments are possible including a rotation of the underlying grid to a non-horizontal and vertical arrangement (for example, 45 degrees). Using a non-horizontal and vertical arrangement may provide the probable benefit of eliminating visual distractions from the user, as users may tend to notice horizontal and vertical patterns before others. For purposes of simplicity, the orientation of the grid (horizontal and vertical and any other rotation of the underlying grid) is referred to collectively as the predefined grid orientation.

Next, image 601 is analyzed to determine which corner is missing. The rotation amount o needed to rotate image 601 to an image ready for decoding 603 is shown as o=(θ plus a rotation amount {defined by which corner missing}). The rotation amount is shown by the equation in FIG. 7. Referring back to FIG. 6, angle θ is first determined by the layout of the pixels to arrive at a horizontal and vertical (or other predefined grid orientation) arrangement of the pixels and the image is rotated as shown in 602. An analysis is then conducted to determine the missing corner and the image 602 rotated to the image 603 to set up the image for decoding. Here, the image is rotated 90 degrees counterclockwise so that image 603 has the correct orientation and can be used for decoding.

It is appreciated that the rotation angle θ may be applied before or after rotation of the image 601 to account for the missing corner. It is also appreciated that by considering noise in the captured image, all four types of corners may be present. We may count the number of corners of each type and choose the type that has the least number as the corner type that is missing.

Finally, the code in image 603 is read out and correlated with the original bit stream used to create image 403. The correlation may be performed in a number of ways. For example, it may be performed by a recursive approach in which a recovered bit stream is compared against all other bit stream fragments within the original bit stream. Second, a statistical analysis may be performed between the recovered bit stream and the original bit stream, for example, by using a Hamming distance between the two bit streams. It is appreciated that a variety of approaches may be used to determine the location of the recovered bit stream within the original bit stream.

As will be discussed, maze pattern analysis obtains recovered bits from image 603. Once one has the recovered bits, one needs to locate the captured image within the original array (for example, the one shown in FIG. 4B). The process of determining the location of a segment of bits within the entire array is complicated by a number of items. First, the actual bits to be captured may be obscured (for example, the camera may capture an image with handwriting that obscures the original code). Second, dust, creases, reflections, and the like may also create errors in the captured image. These errors make the localization process more difficult. In this regard, the image capture system may need to function with non-sequential bits extracted from the image. The following represents a method for operating with non-sequential bits from the image.

Let the sequence (or m-sequence) I correspond to the power series I(x)=1/P_n(x), where n is the order of the m-sequence, and the captured image contains K bits of I b=(b₀ b₁ b₂ . . . b_K−1)^t, where K≧n and the superscript t represents a transpose of the matrix or vector. The location s of the K bits is just the number of cyclic shifts of I so that b₀ is shifted to the beginning of the sequence. Then this shifted sequence R corresponds to the power series x^s/P_n(x) , or R=T^s (I), where T is the cyclic shift operator. We find this s indirectly. The polynomials modulo P_n (x) form a field. It is guaranteed that x^s≡r₀+r₁x+ . . . r_n−1xⁿ⁻¹mod(P_n(x)) . Therefore, we may find (r₀, r₁, . . . r_n−1) and then solve for s.

The relationship x^s≡r₀+r_{x+ . . . rn−1}xⁿ⁻¹mod(P_n(x)) implies that R=r₀+r₁T(I)+ . . . +r_n−1Tⁿ⁻¹ (I) . Written in a binary linear equation, it becomes: R=r^tA   (2) where r=(r₀ r₁ r₂ . . . r_n−1)^t, and A=(I T(I) . . . Tⁿ⁻¹(I)^t which consists of the cyclic shifts of I from 0-shift to (n−1)-shift. Now only sparse K bits are available in R to solve r. Let the index differences between b_i and b₀ in R be k_i, i=1, 2, . . . , k−1, then the 1^st and (k_i+1)-th elements of R, i=1,2, . . . , k−1, are exactly b₀, b₁, . . . , b_k−1. By selecting the 1^st and (k_i+1)-th columns of A, i=1, 2, . . . k−1, the following binary linear equation is formed: b^t=r^tM   (3)

• • where M is an n×K sub-matrix of A.

If b is error-free, the solution of r may be expressed as: r^t={tilde over (b)}^t{tilde over (M)}⁻¹   (4)

where {tilde over (M)} is any non-degenerate n×n sub-matrix of M and {tilde over (b)} is the corresponding sub-vector of b.

With known r, we may use the Pohlig-Hellman-Silver algorithm as noted by Douglas W. Clark and Lih-Jyh Weng, “Maximal and Near-Maximal Shift Register Sequences: Efficient Event Counters and Easy Discrete Logorithms,” IEEE Transactions on Computers 43.5 (May 1994, pp 560-568) to find s so that x^s≡r₀+r₁x+ . . . r_n−1xⁿ⁻¹mod(P_n(x)).

As matrix A (with the size of n by L, where L=2ⁿ −1) may be huge, we should avoid storing the entire matrix A. In fact, as we have seen in the above process, given extracted bits with index difference k_i, only the first and (k_i+1)-th columns of A are relevant to the computation. Such choices of k_i is quite limited, given the size of the captured image. Thus, only those columns that may be involved in computation need to saved. The total number of such columns is much smaller than L (where L=2^m−1 is the length of the m-sequence).

Error Correction

If errors exist in b, then the solution of r becomes more complex. Traditional methods of decoding with error correction may not readily apply, because the matrix M associated with the captured bits may change from one captured image to another.

We adopt a stochastic approach. Assuming that the number of error bits in b, n_e, is relatively small compared to K, then the probability of choosing correct n bits from the K bits of b and the corresponding sub-matrix {tilde over (M)} of M being non-degenerate is high.

When the n bits chosen are all correct, the Hamming distance between b^t and r^tM, or the number of error bits associated with r, should be minimal, where r is computed via equation (4). Repeating the process for several times, it is likely that the correct r that results in the minimal error bits can be identified.

If there is only one r that is associated with the minimum number of error bits, then it is regarded as the correct solution. Otherwise, if there is more than one r that is associated with the minimum number of error bits, the probability that n_e exceeds the error correcting ability of the code generated by M is high and the decoding process fails. The system then may move on to process the next captured image. In another implementation, information about previous locations of the pen can be taken into consideration. That is, for each captured image, a destination area where the pen may be expected next can be identified. For example, if the user has not lifted the pen between two image captures by the camera, the location of the pen as determined by the second image capture should not be too far away from the first location. Each r that is associated with the minimum number of error bits can then be checked to see if the location s computed from r satisfies the local constraint, i.e., whether the location is within the destination area specified.

If the location s satisfies the local constraint, the X, Y positions of the extracted bits in the array are returned. If not, the decoding process fails.

FIG. 8 depicts a process that may be used to determine a location in a sequence (or m-sequence) of a captured image. First, in step 801, a data stream relating to a captured image is received. In step 802, corresponding columns are extracted from A and a matrix M is constructed.

In step 803, n independent column vectors are randomly selected from the matrix M and vector r is determined by solving equation (4). This process is performed Q times (for example, 100 times) in step 804. The determination of the number of loop times is discussed in the section Loop Times Calculation.

In step 805, r is sorted according to its associated number of error bits. The sorting can be done using a variety of sorting algorithms as known in the art. For example, a selection sorting algorithm may be used. The selection sorting algorithm is beneficial when the number Q is not large. However, if Q becomes large, other sorting algorithms (for example, a merge sort) that handle larger numbers of items more efficiently may be used.

The system then determines in step 806 whether error correction was performed successfully, by checking whether multiple r's are associated with the minimum number of error bits. If yes, an error is returned in step 809, indicating the decoding process failed. If not, the position s of the extracted bits in the sequence (or m-sequence) is calculated in step 807, for example, by using the Pohig-Hellman-Silver algorithm.

Next, the (X,Y) position in the array is calculated as: x=s mod m₁ and y=s mod m₂ and the results are returned in step 808.

Location Determination

FIG. 9 shows a process for determining the location of a pen tip. The input is an image captured by a camera and the output may be a position coordinates of the pen tip. Also, the output may include (or not) other information such as a rotation angle of the captured image.

In step 901, an image is received from a camera. Next, the received image may be optionally preprocessed in step 902 (as shown by the broken outline of step 902 ) to adjust the contrast between the light and dark pixels and the like.

Next, in step 903, the image is analyzed to determine the bit stream within it.

Next, in step 904, n bits are randomly selected from the bit stream for multiple times and the location of the received bit stream within the original sequence (or m-sequence) is determined.

Finally, once the location of the captured image is determined in step 904, the location of the pen tip may be determined in step 905.

FIG. 10 gives more details about 903 and 904 and shows the approach to extract the bit stream within a captured image. First, an image is received from the camera in step 1001. The image then may optionally undergo image preprocessing in step 1002 (as shown by the broken outline of step 1002). The pattern is extracted in step 1003. Here, pixels on the various lines may be extracted to find the orientation of the pattern and the angle θ.

Next, the received image is analyzed in step 1004 to determine the underlying grid lines. If grid lines are found in step 1005, then the code is extracted from the pattern in step 1006. The code is then decoded in step 1007 and the location of the pen tip is determined in step 1008. If no grid lines were found in step 1005, then an error is returned in step 1009.

Outline of Enhanced Decoding and Error Correction Algorithm

With an embodiment of the invention as shown in FIG. 12, given extracted bits 1201 from a captured image (corresponding to a captured array) and the destination area, a variation of an m-array decoding and error correction process decodes the X,Y position. FIG. 12 shows a flow diagram of process 1200 of this enhanced approach. Process 1200 comprises two components 1251 and 1253.

Decode Once. Component 1251 includes three parts.

• • random bit selection: randomly selects a subset of the extracted bits 1201 (step 1203)
  • decode the subset (step 1205)
  • determine X,Y position with local constraint (step 1209)

Decoding with Smart Bit Selection. Component 1253 includes four parts.

• • smart bit selection: selects another subset of the extracted bits (step 1217)
  • decode the subset (step 1219)
  • adjust the number of iterations (loop times) of step 1217 and step 1219 (step 1221)
  • determine X,Y position with local constraint (step 1225)

The embodiment of the invention utilizes a discreet strategy to select bits, adjusts the number of loop iterations, and determines the X,Y position (location coordinates) in accordance with a local constraint, which is provided to process 1200. With both components 1251 and 1253, steps 1205 and 1219 (“Decode Once”) utilize equation (4) to compute r.

Let {circumflex over (b)} be decoded bits, that is: {circumflex over (b)}^t=r^tM   (5)

The difference between b and {circumflex over (b)} are the error bits associated with r.

FIG. 12 shows a flow diagram of process 1200 for decoding extracted bits 1201 from a captured image in accordance with embodiments of the present invention. Process 1200 comprises components 1251 and 1253. Component 1251 obtains extracted bits 1201 (comprising K bits) associated with a captured image (corresponding to a captured array).

In step 1203, n bits (where n is the order of the m-array) are randomly selected from extracted bits 1201. In step 1205, process 1200 decodes once and calculates r. In step 1207, process 1200 determines if error bits are detected for b. If step 1207 determines that there are no error bits, X,Y coordinates of the position of the captured array are determined in step 1209. With step 1211, if the X,Y coordinates satisfy the local constraint, i.e., coordinates that are within the destination area, process 1200 provides the X,Y position (such as to another process or user interface) in step 1213. Otherwise, step 1215 provides a failure indication.

If step 1207 detects error bits in b, component 1253 is executed in order to decode with error bits. Step 1217 selects another set of n bits (which differ by at least one bit from the n bits selected in step 1203 ) from extracted bits 1201. Steps 1221 and 1223 determine the number of iterations (loop times) that are necessary for decoding the extracted bits. Step 1225 determines the position of the captured array by testing which candidates obtained in step 1219 satisfy the local constraint. Steps 1217-1225 will be discussed in more details.

Smart Bit Selection

Step 1203 randomly selects n bits from extracted bits 1201 (having Kbits), and solves for r₁. Using equation (5), decoded bits can be calculated. Let I₁={k ε {1, 2, . . . , K}|b_k={circumflex over (b)}_k}, {overscore (I)}₁={k ε {1, 2, . . . , K}|b_k≢{circumflex over (b)}_k}, where {circumflex over (b)}_k is the k^th bit of {circumflex over (b)}, B₁={b_k|k ε I₁} and {overscore (B)}₁={b_k|k ε {overscore (I)}₁}, that is, B₁ are bits that the decoded results are the same as the original bits, and {overscore (B)}₁ are bits that the decoded results are different from the original bits, I₁ and {overscore (I)}₁ are the corresponding indices of these bits. It is appreciated that the same r₁ will be obtained when any n bits are selected from B₁. Therefore, if the next n bits are not carefully chosen, it is possible that the selected bits are a subset of B₁, thus resulting in the same r₁ being obtained.

In order to avoid such a situation, step 1217 selects the next n bits according to the following procedure:

• • 1. Choose at least one bit from {overscore (B)}₁ 1303 and the rest of the bits randomly from B₁ 1301 and {overscore (B)}₁ 1303, as shown in FIG. 13 corresponding to bit arrangement 1351. Process 1200 then solves r₂ and finds B₂ 1305, 1309 and {overscore (B)}₂ 1307, 1311 by computing {circumflex over (b)}₂^t=r₂^tM₂.
  • 2. Repeat step 1. When selecting the next n bits, for every {overscore (B)}_i (i=1, 2, 3 . . . , x−1, where x is the current loop number), there is at least one bit selected from {overscore (B)}_i. The iteration terminates when no such subset of bits can be selected or when the loop times are reached. Loop Times Calculation

With the error correction component 1253, the number of required iterations (loop times) is adjusted after each loop. The loop times is determined by the expected error rate. The expected error rate p_e in which not all the selected n bits are correct is: $\begin{array}{cc}{p}_e={\left(1-\frac{C_{K-n_e}^n}{C_K^n}\right)}^{\mathrm{lt}}\approx -e^{-{\mathrm{lt}\left(\frac{K-n}{K}\right)}^{n_e}}& \left(6\right)\end{array}$ where lt represents the loop times and is initialized by a constant, K is the number of extracted bits from the captured array, n_e represents the minimum number of error bits incurred during the iteration of process 1200, n is the order of the m-array, and C_Kⁿ is the number of combinations in which n bits are selected from K bits.

In the embodiment, we want p_e to be less than e⁻⁵=0.0067. In combination with (6), we have: $\begin{array}{cc}{\mathrm{lt}}_i=\min \left({\mathrm{lt}}_{i-1},\frac{5}{{\left(\frac{K-n}{K}\right)}^{n_e}}+1\right)& \left(7\right)\end{array}$

Adjusting the loop times may significantly reduce the number of iterations of process 1253 that are required for error correction.

Determine X, Y Position with Local Constraint

In steps 1209 and 1225, the decoded position should be within the destination area. The destination area is an input to the algorithm, and it may be of various sizes and places or simply the whole m-array depending on different applications. Usually it can be predicted by the application. For example, if the previous position is determined, considering the writing speed, the destination area of the current pen tip should be close to the previous position. However, if the pen is lifted, then its next position can be anywhere. Therefore, in this case, the destination area should be the whole m-array. The correct X,Y position is determined by the following steps.

In step 1224 process 1200 selects r_i whose corresponding number of error bits is less than: $\begin{array}{cc}{N}_e=\frac{{\log }_{10}\left(\frac{3}{\mathrm{lt}}\right)}{{\log }_{10}\left(\frac{K-n}{K}\right)\times {\log }_{10}\left(\frac{10}{\mathrm{lr}}\right)}& \left(8\right)\end{array}$ where lt is the actual loop times and lr represents the Local Constraint Rate calculated by: $\begin{array}{cc}\mathrm{lr}=\frac{\mathrm{area}\mathrm{of}\mathrm{the}\mathrm{destination}\mathrm{area}}{L}& \left(9\right)\end{array}$ where L is the length of the m-array.

Step 1224 sorts r_i in ascending order of the number of error bits. Steps 1225, 1211 and 1212 then finds the first r_i in which the corresponding X,Y position is within the destination area. Steps 1225, 1211 and 1212 finally returns the X,Y position as the result (through step 1213), or an indication that the decoding procedure failed (through step 1215).

Illustrative Example of Enhanced Decoding and Error Correction Process

An illustrative example demonstrates process 1200 as performed by components 1251 and 1253. Suppose n=3, K=5, I=(I₀, I₁ . . . I₆)t is the m-sequence of order n=3. Then $\begin{array}{cc}A=\left(\begin{array}{ccccccc}{I}_0& I_1& I_2& I_3& I_4& I_5& I_6\\ I_6& I_0& I_1& I_2& I_3& I_4& I_5\\ I_5& I_6& I_0& I_1& I_2& I_3& I_4\end{array}\right)& \left(10\right)\end{array}$ Also suppose that the extracted bits b=(b₀ b₁ b₂ b₃ b₄)^t, where K=5, are actually the s^th, (s+1)^th, (s+3)^th, (s+4)^th, and (s+6)^th bits of the m-sequence (these numbers are actually modulus of the m-array length L=2ⁿ−1=2³−1=7). Therefore $\begin{array}{cc}M=\left(\begin{array}{ccccc}{I}_0& I_1& I_3& I_4& I_6\\ I_6& I_0& I_2& I_3& I_5\\ I_5& I_6& I_1& I_2& I_4\end{array}\right)& \left(11\right)\end{array}$ which consists of the 0^th, 1^st, 3^rd, 4^th, and 6^th columns of A. The number s, which uniquely determines the X,Y position of b₀ in the m-array, can be computed after solving r=(r₀ r₁ r₂)^t that are expected to fulfill b^t=r^tM. Due to possible error bits in b, b^t=r^tM may not be completely fulfilled.

Process 1200 utilizes the following procedure. Randomly select n=3 bits, say {tilde over (b)}₁^t=(b₀ b₁ b₂), from b. Solving for r₁: {tilde over (b)}₁^t=r₁^t{tilde over (M)}₁   (12) where {tilde over (M)}₁ consists of the 0th, 1st, and 2nd columns of M. (Note that {tilde over (M)}₁ is an n×n matrix and r₁^t is a 1×n vector so that {tilde over (b)}₁^t is a 1×n vector of selected bits.)

Next, decoded bits are computed: {circumflex over (b)}₁^t=r₁^tM   (13) where M is an n×K matrix and r₁^t is a 1×n vector so that {circumflex over (b)}₁^t is a 1×K vector. If {circumflex over (b)}₁ is identical to b, i.e., no error bits are detected, then step 1209 determines the X,Y position and step 1211 determines whether the decoded position is inside the destination area. If so, the decoding is successful, and step 1213 is performed. Otherwise, the decoding fails as indicated by step 1215. If {circumflex over (b)}₁ is different from b, then error bits in b are detected and component 1253 is performed. Step 1217 determines the set B₁, say {b₀ b₁ b₂ b₃}, where the decoded bits are the same as the original bits. Thus, {overscore (B)}₁={b₄} (corresponding to bit arrangement 1351 in FIG. 13). Loop times (lt) is initialized to a constant, e.g., 100, which may be variable depending on the application. Note that the number of error bits corresponding to r₁ is equal to 1. Then step 1221 updates the loop time (lt) according to equation (7), lt₁=min(lt, 13)=13.

Step 1217 next chooses another n=3 bits from b. If the bits all belong to B₁, say {b₀ b₂ b₃}, then step 1219 will determine r₁ again. In order to avoid such repetition, step 1217 may select, for example, one bit {b₄} from {overscore (B)}₁, and the remaining two bits {b₀ b₁} from B₁.

The selected three bits form {tilde over (b)}₂^t=(b₀ b₁ b₄). Step 1219 solves for r₂: {tilde over (b)}₂^t=r₂^t{tilde over (M)}₂   (14) where {tilde over (M)}₂ consists of the 0^th, 1^st, and 4^th columns of M.

Step 1219 computes {circumflex over (b)}₂^t=r₂^tM. Find the set B₂, e.g., {b₀ b₁ b₄}, such that {circumflex over (b)}₂ and b are the same. Then {overscore (B)}₂={b₂ b₃} (corresponding to bit arrangement 1353 in FIG. 13). Step 1221 updates the loop times (lt) according to equation (7). Note that the number of error bits associated with r₂ is equal to 2. Substituting into (7), lt₂=min(lt₁, 32)=13.

Because another iteration needs to be performed, step 1217 chooses another n=3 bits from b. The selected bits shall not all belong to either B₁ or B₂. So step 1217 may select, for example, one bit {b₄} from {overscore (B)}₁, one bit {b₂} from {overscore (B)}₂, and the remaining one bit {b₀}.

The solution of r, bit selection, and loop times adjustment continues until we cannot select any new n=3 bits such that they do not all belong to any previous B_i's, or the maximum loop times lt is reached.

Suppose that process 1200 calculates five r_i (i=1,2,3,4,5), with the number of error bits corresponding to 1, 2, 4, 3, 2, respectively. (Actually, for this example, the number of error bits cannot exceed 2, but the illustrative example shows a larger number of error bits to illustrate the algorithm.) Step 1224 selects r_i's, for example, r₁, r₂, r₄, r₅, whose corresponding numbers of error bits are less than N_e shown in (8).

Step 1224 sorts the selected vectors r₁, r₂, r₄, r₅ in ascending order of their error bit numbers: r₁, r₂, r₅, r₄. From the sorted candidate list, steps 1225, 1211 and 1212 find the first vector r, for example, r₅, whose corresponding position is within the destination area. Step 1213 then outputs the corresponding position. If none of the positions is within the destination area, the decoding process fails as indicated by step 1215.

Apparatus

FIG. 14 shows an apparatus 1400 for decoding extracted bits 1201 from a captured array in accordance with embodiments of the present invention. Apparatus 1400 comprises bit selection module 1401, decoding module 1403, position determination module 1405, input interface 1407, and output interface 1409. In the embodiment, interface 1407 may receive extracted bits 1201 from different sources, including a module that supports camera 203 (as shown in FIG. 2A). Bit selection module 1401 selects n bits from extracted bits 1201 in accordance with steps 1203 and 1217. Decoding module 1403 decodes the selected bits (n bits selected from the K extracted bits as selected by bit selection module 1401 ) to determine detected bit errors and corresponding vectors r_i in accordance with steps 1205 and 1219. Decoding module 1403 presents the determined vectors r_i to position determination module 1405. Position determination module 1405 determines the X,Y coordinates of the captured array in accordance with steps 1209 and 1225. Position determination module 1405 presents the results, which includes the X,Y coordinates if successful and an error indication if not successful, to output interface 1409. Output interface 1409 may present the results to another module that may perform further processing or that may display the results.

Maze Pattern Analysis

FIG. 15 shows an exemplary image of a maze pattern 1500 that illustrates maze pattern cell 1501 with an associated maze pattern bar 1503 in accordance with embodiments of the invention. Maze pattern 1500 contains maze pattern bars, e.g., 1503. Effective pixels (EPs) are pixels that are most likely to be located on the maze pattern bars as shown in FIG. 15. In an embodiment, the ratio (r) of the pixels on maze pattern bars can be approximated by calculating the area of a maze pattern bar divided by the area of a maze pattern cell. For example, if the maze pattern cell size is 3.2×3.2 pixel and the bar size is 3.2×1 pixel, then r=1/3.2. For an image without document content captured by a 32×32 pixel camera, the number of effective pixels is approximately 32×32×(1/3.2)=320. Consequently, one estimates 320 effective pixels in the image. Since the effective pixels tend to be darker, 320 pixels with lower gray level values are selected. (In the embodiment, a lower gray level value corresponds to a darker pixel. For example, a gray level value equal to ‘0’ corresponds to a darkest pixel and a gray level value equal to ‘255’ corresponds to a lightest pixel.) FIG. 15 shows separated effective pixels of an example image corresponding to maze pattern 1500. If document content is captured, then the number of effective pixels is estimated as (32*32−n)×(1/3.2), where n is the number of pixels which lie on document content area.

FIG. 16 shows an exemplary image of maze pattern 1600 that illustrates estimated directions for the effective pixels in accordance with embodiments of the invention. In FIG. 16 an estimated direction (e.g., estimated directions 1601 or 1603) is associated with each effective pixel. A histogram of all estimated directions is formed. From the histogram, two directions that are about 90 degrees apart (for example, they may be 80, 90 or 100 degrees apart) and occurred the most often (sum of their frequencies is the maximum among all pairs of directions that are 80, 90, or 100 degrees apart) are chosen as the initial centers of two clusters of estimated directions. All effective pixels are clustered into the two clusters based on whether their estimated directions are closer to the center of the first cluster or to the center of the second cluster. The distance between the estimated direction and a center can be expressed as min(180−|x−center|, |x−center|), where x is the estimated direction of an effective pixel and center is the center of a cluster. We then calculate the mean value of estimated directions of all effective pixels in each cluster and use the values as estimates of the two principal directions of the grid lines for further processing. Direction 1605 and direction 1607 correspond to the two principal directions of the grid lines.

FIG. 17 shows an exemplary image of a portion of maze pattern 1700 that illustrates estimating a direction for an effective pixel in accordance with embodiments of the invention. For each effective pixel (e.g., effective pixel 1701 ), one estimates the direction of the bar which passes the effective pixel. The mean gray level value for points 1711, 1713, 1721, and 1715 (represented as A⁺₀, B⁺₀, A⁻₀, B⁻₀ in the equation below) is calculated as: S(θ=0 degree)=(G(A⁺₀)+G(B⁺₀)+G(A⁻₀)+G(B⁻₀))/4   (15) where G(·) is the gray level value of a point. The mean gray level value for points 1707, 1709, 1719, and 1717 (represented as A⁺₁, B⁺₁, A⁻₁, B⁻₁ in the equation below) and S(θ=10 degree) is obtained in the same manner: S(θ=10 deg)=(G(A⁺₁)+G(B⁺₁)+G(A⁻₁)+G(B⁻₁))/4   (16) This process is repeated 18 times, from 0 degree, in 10 degree steps to 170 degree. The direction 1723 with lowest mean gray level value is selected as the estimated direction of effective pixel 1701. In other embodiments, the sampling angle interval may be less than 10 degrees to obtain a more precise estimate of the direction. The length of radius PA⁺₀ 1705 and radius PB⁺₀ 1703 are selected as 1 pixel and 2 pixels, respectively.

The x, y value of position of points used to estimate the direction may not be an integer, e.g., points A⁺₁, B⁺₁, A⁻₁, and B⁻₁. The gray level values of corresponding points may be obtained by bilinear sampling the gray level values of neighbor pixels. Bilinear sampling is expressed by: G(x,y)=(1−y_d)·[(1−x_d)·G(x₁,y₁)+x_d·G(x₁1, y₁)+y_d·[(1−x_d)·G(x₁, y₁+1)+x_d·G(x₁+1, y₁+1)]  (17) where (x, y) is the position of a point, for a 32×32 pixel image sensor, −0.5<=x<=31.5, −0.5<=y<=31.5, and x₁,y₁ and x_d,y_d are the integer parts and the decimal fraction parts of x, y, respectively. If x is less than 0, or greater than 31, or y is less than 0, or greater than 31, bilinear extrapolation is used. In such cases, Equation 17 is still applicable, except that x₁, y₁ should be 0 (when the value is less than 0) or 30 (when the value is greater than 31), and x_d=x−x₁, y_d=y−y₁.

FIG. 18 shows an exemplary image of maze pattern 1800 that illustrates calculating line parameters for a grid line that passes through representative effective pixel 1809 in accordance with embodiments of the invention. One selects a cluster with more effective pixels and computes the line parameters in this direction because there is typically a larger error when estimating the principal direction with less effective pixels. By calculating the line parameters in the direction with more effective pixels, a more precise estimate of the principal direction with less effective pixels is obtained by using a perpendicular constraint of two directions. (In the embodiment, grid lines are associated with two nearly orthogonal sets of grid lines.) The approach is typically effective in a maze pattern with a text area.

In an embodiment, one calculates the line parameters for lines that pass through selected effective pixels. There are two rules to select effective pixels. First, the selected effective pixel must be darker than any other effective pixels that lie in 8 pixel neighborhood.

Second, if one effective pixel is selected, the 24 neighbor pixels of the effective pixel should not be selected. (The 24 neighbors of pixel (x₀, y₀) denotes any pixel with coordinates (x, y), and |x−x₀| 2, and |y−y₀| 2, where |·| means absolute value). For effective pixel 1809, a sector of interest area is determined based on the principal direction. The sector of interest is determined by vector 1805 and 1807, in which the angle between each vector and the principle direction 1801 is less than a constant angle, e.g., 10 degrees. Now, we use a robust regression algorithm to estimate the parameters of the line passing effective pixel 1809, i.e. line 1803 which can be expressed as y=k×x+b, where parameters of the line include slope k and line offset b.

Step 1. All effective pixels which are in the cluster, and located in the sector of interest of effective pixel 1809, are incorporated to calculate the line parameters by using a least squares regression algorithm.

Step 2. The distance between each effective pixel used in regressing the line and the estimated line is calculated. If all these distances are less than a constant value, e.g. 0.5 pixels, the estimated line parameters are sufficiently good, and the regression process ends. Otherwise, the standard deviation of the distances is calculated.

Step 3. Effective pixels used in regressing the line whose distance to the estimated line is less than the standard deviation multiplied by a constant (for example 1.2) are chosen to estimate the line parameters again to obtain another estimate of the line parameters.

Step 4. The estimated line parameters are compared with the estimated parameters from the last iteration. If the difference is sufficiently small, i.e., |k^new−k^old| constant value (for example, 0.01), and |b^new−b^old| constant value (for example, 0.01), regression process ends. Otherwise, repeat the regression process, starting from Step 2.

This process iterates for a maximum of 10 times. If the line parameters obtained do not converge, i.e. do not satisfy the condition |k^new−k^old| constant value (for example, 0.01), and |b^new−b^old| constant value (for example, 0.01), regression fails for this effective pixel. We go on to the next effective pixel.

At the end of this process (of selecting effective pixels and obtaining the line passing through the effective pixel with regression), we obtain a set of grid lines that are independently obtained.

FIG. 19 shows all regressed lines of one example image in a first principal direction.

Apparently, there exist error lines as illustrated in FIG. 19. In the subsequent stage of processing, estimated lines are pruned and used to obtain affine parameters of grids.

FIG. 21 shows an exemplary image of maze pattern 2100 that illustrates pruning estimated grid lines for a first principal direction in accordance with embodiments of the invention. In the embodiment, one prunes the lines by associated slope variances. The mean slope value g and the standard deviation σ of all lines are calculated. If σ<0.05, lines are regarded as parallel and no pruning is needed. Otherwise, each line that has a slope k that differs significantly from the mean slope value i are pruned, namely if |k−μ| 1.5×σ. All the kept lines after pruning are shown in FIG. 21. By averaging the slope value of all the kept lines, a final estimate of the rotation angle of the grid lines is obtained.

Then, one clusters the remaining lines by line distance, e.g., distance 2151. A line that passes the image center and is perpendicular to the mean slope of the lines is obtained. Then the intersection points between regressed lines and the perpendicular line are calculated. All intersection points are clustered with the condition that the center of any two clusters should be larger than a constant. The constant is the possible smallest scale of grid lines. The example shown in FIG. 21 has six groupings of lines: 2101, 2103, 2105, 2107, 2109, and 2111.

FIG. 22 shows an exemplary image of maze pattern 2200 in which best fit lines (e.g., line 2201) are selected from the pruned grid lines in accordance with embodiments of the invention. The best fit line corresponds to a line having a regression error (obtained in the robust regression step) that is smaller than the other lines in the same group of lines.

FIG. 20 shows an exemplary image of maze pattern 2000 that illustrates estimated grid lines associated with the remaining cluster in accordance with embodiments of the invention. In the embodiment, grid lines are estimated using a perpendicular constraint for the remaining cluster, i.e., the direction that is perpendicular to the final estimate of the direction of the first cluster is used as the initial direction during line regression. The process is the same as illustrated in FIGS. 18-22 for the first principle direction.

FIG. 23 shows an exemplary image of maze pattern 2300 with associated affine parameters in accordance with embodiments of the invention. One estimates the scale (S_y 2301 and S_x 2303) and offset (d_y 2311 and d_x 2309) of grid lines. The scale is obtained by averaging the distance of adjacent best fit lines as shown in FIG. 22. The distance between two adjacent lines in FIG. 22 may be two or more times of the real scale. (For example, line 2203 and line 2205 may be two or more times of the real scale.) In other words, there is a line between 2203 and 2205 whose parameters are not obtained. A prior knowledge about the range of possible scales (given the size of the image sensor, size of maze pattern printed on paper, etc.) is used to estimate how many times a distance should be divided. In this case, the distance between line 2203 and 2205 is divided by 2 and then averaged with other distances. The offset is obtained from the distance between the image center and the nearest line to the image center. (The offset may be needed to obtain grid lines on which points are sampled to extract bits.) Assuming that the grid lines are evenly spaced and that grid lines are parallel, a group of affine parameters may be used to describe the grid lines.

The result of maze pattern analysis as shown in FIG. 23 includes the scale (S_y 2301 and S_x 2303), the rotation of the grid lines in two directions θ_x 2305 and θ_y 2307, and the nearest distance between grid lines in 2 directions (d_y 2311 and d_x 2309).

A transformation matrix F_S→P is obtained from the rotation and scale parameters as: $F_{S\to P}=\left[\begin{array}{ccc}\frac{\sin {\theta }_y}{s_x}& \frac{\cos {\theta }_y}{s_x}& 0\\ \frac{-\sin {\theta }_x}{s_y}& \frac{\cos {\theta }_x}{s_y}& 0\\ 0& 0& 1\\ & & \end{array}\right]$ where F_S→P maps the captured images in sensor plane coordinate to paper coordinate as previously discussed.

FIG. 24 shows an exemplary image of maze pattern 2400 that illustrates tuning a grid line in accordance with embodiments of the invention. There may be several reasons that may cause the actual grid lines not to be absolutely evenly spaced, such as perspective distortion. A line that is parallel and near each obtained grid line L 2401 may be found, in which the line better approximates the actual grid line. The optimal line L_koptimal is selected from lines 2403-2417 L_k, k=−d, −d+1, . . . d, where the distance between L and L_k is k×δ×Scale. δ is a small constant (e.g., δ=0.05), d is another constant (e.g., d=4), and scale is the grid scale (s_x). k_optimal is obtained from: $\begin{array}{cc}{k}_{\mathrm{optimal}}=\arg \underset{k=-d}{\stackrel{d}{\min }}\sum _{i=1}^{N}G\left(P_{k,i}\right)& \left(18\right)\end{array}$ where p_k,i is a pixel on line L_k, i=1, 2, . . . , N. The selection of P_k,i is shown in FIG. 24. P_k,i are selected starting from one border of the image in equal distances, which may be a constant, for example, ⅓ of the scale of the direction of the line (s_y). In the embodiment, a smaller gray level value corresponds to a darker image element. However, other embodiments of the invention may associate a larger gray level value with a darker image element. (The “arg” function denotes that k_optimal has a minimum gray level sum that corresponds to one of the lines having an index between −d and d.)

FIG. 25 shows an exemplary image of a maze pattern with grid lines after tuning in accordance with embodiments of the invention.

FIG. 26 shows process 2600 for determining grid lines for a maze pattern in accordance with embodiments of the invention. Process 2600 incorporates the processing as previously discussed. Process 2600 can be grouped into sub-processes 2651, 2653, 2655, and 2657. Sub-process 2651 includes step 2601, in which effective pixels are separated for an image of a maze pattern.

In sub-process 2653, lines are estimated for representative effective pixels. Sub-process 2653 comprises steps 2603-2611 and 2625. In step 2603, the direction of the maze pattern bar is estimated for each effective pixel. In step 2605, the estimated directions are grouped into two clusters. In step 2607, the cluster with the greater number of effective pixels is selected and the principal direction is estimated from the directions of the effective pixels that are associated with the selected cluster in step 2609. In step 2611, lines are estimated through selected effective pixels with regression techniques.

In sub-process 2655, affine parameters of the grid lines are determined. Sub-process 2655 includes steps 2613-2621. The lines are pruned in step 2613 by slope variance analysis and the pruned lines are grouped by the projection distance in step 2615. The best fit line is selected in each group in step 2617.

If step 2619 determines that the remaining cluster has not been processed, the remaining cluster is selected in step 2627. The associated grid lines are estimated using a perpendicular constraint in step 2625. Consequently, steps 2611-2617 are repeated. In step 2621, affine parameters are determined from the grouped lines.

In sub-process 2657, the grid lines are tuned in step 2623 as discussed with FIG. 24.

FIG. 27 shows an exemplary image of a maze pattern that illustrates determining a correct orientation of the maze pattern in accordance with embodiments of the invention. After detecting grid lines, the correct orientation of the maze pattern has to be determined. In the embodiment, one determines the correct orientation of maze pattern based on the corner property of maze patterns. The algorithm has three stages. As shown in FIG. 27, grid edges are separated into two groups, i.e., X and Y edges that are parallel with H axis and V axis respectively, and with corresponding scores are represented as ScoreX and ScoreY. Scores are calculated by bilinear sampling algorithm. As FIG. 27 shows, the bilinear sampling score is calculated by the following formula: ScoreX(u, v)=(1−η_q)−[(1−η_p)·G(m, n)+η_p·G(m+1,n)]+η_q·[(1−η_p)·G(m,n+1)+η_p·G(m+1,n+1)]  (19) where (p, q) is the position of sampling point 2751 (P) in image coordinates, ScoreX(u,v) is the score of edge (u, v) along ′ axis, where u and v are indexes of grid lines along H′ and V′ axis respectively (in FIG. 27, the range of indexes along H′ axis is [0, 13] and [0, 15] along V′ axis, and u=7, v=9), (m, n), (m+1, n), (m, n+1) and (m+1, n+1) are the nearest four pixels of point 2751, G(m, n), G(m+1, n), G(m, n+1) and G(m+1, n+1) are the gray level values of each pixel respectively, and η_p=p−m, n₁=q−n. A score is valid (therefore is actually calculated using equation 19) if all the pixels for bilinear sampling are located in the image (i.e. 0<=p<31, 0<=q<31 for a 32×32 pixel image sensor), and are non-document content pixels. In the embodiment, the sampling point on each edge to calculate the score corresponds to the middle point of the edge. ScoreY is calculated by the same bilinear sampling algorithm as ScoreX except for using a different sampling point in the image as the bilinear input.

Referring to FIG. 27, maze pattern cell 2709 is associated with corners 2701, 2703, 2705, and 2707. In the following discussion, corners 2701, 2703, 2705, and 2707 correspond to corner 0, corner 1, corner 2, and corner 3, respectively. The associated number of a corner is referred to as the quadrant number as will be discussed.

As previously discussed in the context of FIGS. 5A-5D, when a maze pattern is properly oriented, the type of corner shown in FIG. 5A (corresponding to corner 0) is missing. When a maze pattern is rotated 90 degrees clockwise, the type of corner shown in FIG. 5B (corresponding to corner 1) is missing. When a maze pattern is rotated 180 degrees clockwise, the type of corner shown in FIG. 5V (corresponding to corner 3) is missing. When a maze pattern is rotated 270 degrees clockwise, the type of corner shown in FIG. 5D (corresponding to corner 4) is missing. By determining the type of missing corner, one can correctly orientate the maze pattern by rotating the maze pattern by: OrientationRotation=quadrant number×90 deg   (21)

In an embodiment, one determines the type of missing corner by calculating the mean score difference of each corner type. For corner 2701 (corner 0), the mean score difference Q[0] is: $\begin{array}{cc}Q\left[0\right]=\left(\sum _{i=0}^{n_i-1}\sum _{j=0}^{n_j-1}\mathrm{ScoreX}\left(i,j\right)-\mathrm{ScoreY}\left(i,j\right)\right)/N_0& \left(22\right)\end{array}$ where n_i and n_j are the total count of grid cells within the image in H axis and V axis direction respectively. For example, in FIG. 27, n_i=14, n_j=16, and N₀ is the number of grid cells in which both ScoreX(i, j) and ScoreY(i, j) are valid. (The validity of ScoreX(i,j) and ScoreY(i,j) is determined by bilinear sampling shown in Equation 19.)

For corner 2703 (corner 1), the mean score difference Q[1] is: $\begin{array}{cc}Q\left[1\right]=\left(\sum _{i=0}^{n_i-1}\sum _{j=0}^{n_j-1}\mathrm{ScoreX}\left(i,j\right)-\mathrm{ScoreY}\left(i+1,j\right)\right)/N_1& \left(23\right)\end{array}$ where n_i and n_j are the total count of grids within the image in H axis and V axis direction respectively, N₁ is the number of grid cells in which both ScoreX(i, j) and ScoreY(i+1, j) are valid.

For corner 2705 (corner 2), the mean score difference Q [2] is: $\begin{array}{cc}Q\left[2\right]=\left(\sum _{i=0}^{n_i-1}\sum _{j=0}^{n_j-1}\mathrm{ScoreX}\left(i,j+1\right)-\mathrm{ScoreY}\left(i+1,j\right)\right)/N_2& \left(24\right)\end{array}$ where n_i and n_j are the total count of grids within the image in H axis and V axis direction respectively, N₂ is the number of grid cells in which both ScoreX(i, j+1) and ScoreY(i+1, j) are valid.

For corner 2707 (corner 3), the mean score difference Q[3] is: $\begin{array}{cc}Q\left[3\right]=\left(\sum _{i=0}^{n_i-1}\sum _{j=0}^{n_j-1}\mathrm{ScoreX}\left(i,j+1\right)-\mathrm{ScoreY}\left(i,j\right)\right)/N_3& \left(25\right)\end{array}$ where n_i and n_j are the total count of grids within the image in H axis and V axis direction respectively, N₃ is the number of grid cells in which both ScoreX(i, j+1) and ScoreY(i, j) are valid.

The correct orientation is i if Q[i] is maximum of Q, where i is the quadrant number. In an embodiment, one rotates the grid coordinate system H′, V′ of the maze pattern to the correct orientation i (corresponding to Equation 21) so that corner 0 in the new coordinate system is the correct corner. ScoreX and ScoreY are also rotated for the next stage of extracting bits from the maze pattern.

After determining the correct orientation of maze pattern, bits are extracted. Maze pattern cells in captured images fall into two categories: completely visible cells and partially visible cells. Completely visible cells are maze pattern cells in which both ScoreX and ScoreY are valid. Partially visible cells are the maze pattern cells in which only one score of ScoreX and ScoreY is valid.

A complete visible bits extraction algorithm is based on a simple gray level value comparison of ScoreX and ScoreY, and bit B(i, j) is calculated by: $\begin{array}{cc}B\left(i,j\right)=\{\begin{array}{c}0,\mathrm{if}\mathrm{ScoreX}\left(i,j\right)<\mathrm{ScoreY}\left(i,j\right)\\ 1,\mathrm{if}\mathrm{ScoreX}\left(i,j\right)>\mathrm{ScoreY}\left(i,j\right)\\ \mathrm{invalid},\mathrm{if}\mathrm{ScoreX}\left(i,j\right)=\mathrm{ScoreY}\left(i,j\right)\end{array}& \left(26\right)\end{array}$ The corresponding bit confidence Conf (i, j) is calculated by: Conf(i, j)=|ScoreX(i, j)−ScoreY(i, j)|/MaxDiff   (27) where MaxDiff is the maximum score difference of all complete visible cells.

FIG. 28 shows an exemplary image of maze pattern 2800 in which a bit is extracted from partially visible maze pattern cell 2801 in accordance with embodiments of the invention. A partially visible maze pattern cell may occur at an edge of an image or in an area of an image where text or drawings obscure the maze pattern. In an embodiment, a partially visible bits extraction algorithm is based on completely visible cells (corresponding to maze pattern cells 2803, 2805, and 2807) in the 8-neighbor cells of partially visible cell 2801. For extracting a bit from a cell that is partially visible (e.g. maze pattern cell 2801), one may compare score values of the partially visible maze pattern cell with a function of mean scores along edges of neighboring maze pattern cells (e.g., maze pattern cells 2803, 2805, and 2807).

In an embodiment of the invention for a partially visible bit (i, j), the reference black edge mean score (BMS) and reference white edge mean score (WMS) of complete visible bits in 8-neighor maze pattern cells can be calculated respectively by following: $\begin{array}{cc}\mathrm{BMS}=\left(\sum _{l=i-1}^{i+1}\sum _{k=j-1}^{j+1}\min \left(\mathrm{ScoreX}\left(l,k\right),\mathrm{ScoreY}\left(l,k\right)\right)\right)/n& \left(28\right)\\ \mathrm{WMS}=\left(\sum _{l=i-1}^{i+1}\sum _{k=j-1}^{j+1}\max \left(\mathrm{ScoreX}\left(l,k\right),\mathrm{ScoreY}\left(l,k\right)\right)\right)/n& \left(29\right)\end{array}$ where n is the completely visible maze pattern cell count in 8 -neighor maze pattern cells.

In an embodiment, one compares ScoreX or ScoreY of a partially visible bit with BMS and WMS. A partially visible bit B(i, j) is calculated by: $\begin{array}{cc}B\left(i,j\right)=\{\begin{array}{c}0,\mathrm{if}\mathrm{ScoreX}\left(i,j\right)\mathrm{is}\mathrm{valid},\mathrm{ScoreX}\left(i,j\right)<\frac{\mathrm{BMS}+\mathrm{WMS}}{2}\\ 1,\mathrm{if}\mathrm{ScoreX}\left(i,j\right)\mathrm{is}v\mathrm{alid},\mathrm{ScoreX}\left(i,j\right)>\frac{\mathrm{BMS}+\mathrm{WMS}}{2}\\ 1,\mathrm{if}\mathrm{ScoreY}\left(i,j\right)\mathrm{is}v\mathrm{alid},\mathrm{ScoreY}\left(i,j\right)<\frac{\mathrm{BMS}+\mathrm{WMS}}{2}\\ 0,\mathrm{if}\mathrm{ScoreY}\left(i,j\right)\mathrm{is}v\mathrm{alid},\mathrm{ScoreY}\left(i,j\right)>\frac{\mathrm{BMS}+\mathrm{WMS}}{2}\\ \mathrm{invalid},\mathrm{if}\mathrm{other}\mathrm{cases}\end{array}& \left(30\right)\end{array}$

In an embodiment of the invention, a degree of confidence of the partially visible bit (i, j) is determined by: Conf(i,j)=max(|Score(i,j)−BMS|,|Score(i,j)−WMS|)/MaxDiff   (31) where Score(i, j) is the valid score of ScoreX(i,j) or ScoreY(i, j), and MaxDiff is a maximum score difference of all complete visible bits. (As previously discussed, with a partially visible cell, only one score is valid.)

Referring to FIG. 12, extracted bits 1201 are decoded, and error correction is performed if needed. In an embodiment of the invention, selected bits that have a confidence level greater than a predetermined level are used for error correction if the number of selected bits is sufficiently large. (As previously discussed, at least n bits are necessary to decode an m-sequence, where n is the order of the m-sequence.) In another embodiment, the extracted bits are rank ordered in accordance with associated confidence levels. Decoding of the extracted bits utilizes extracted bits according to the rank ordering.

In an embodiment of the invention, the degree of confidence associated with an extracted bit may be utilized when correcting for bit errors. For example, bits having a lowest degree of confidence are not processed when performing error correction.

FIG. 29 shows apparatus 2900 for extracting bits from a maze pattern in accordance with embodiments of the invention. Normalized image 2951 is first processed by grid lines analyzer 2901 in order to determine the grid lines of the image. In an embodiment of the invention, grid line analyzer 2901 performs process 2600 as shown in FIG. 26. Grid line analyzer 2901 determines grid line parameters 2953 (e.g., S_x, S_y, θ_x, θ_y, d_x, d_y as shown in FIG. 23). Orientation analyzer 2903 further processes normalized image 2951 using grid line parameters 2953 to determine correct orientation information 2955 of the maze pattern. Bit extractor 2905 processes normalized image 2951 using grid line parameters 2953 and correct orientation information 2955 to extract bit stream 2957.

Additionally, apparatus 2900 may incorporate an image normalizer (not shown) that reduces the effect of non-uniform illumination of the image. Non-uniform illumination may cause some pattern bars not to be as dark as they should be and some non-bar areas to be darker than they should be, possibly affecting the estimate of the direction of effective pixels and may result in error bits being extracted.

Apparatuses 1400 and 2900 may assume different forms of implementation, including modules utilizing computer-readable media and modules utilizing specialized hardware such as an application specific integrated circuit (ASIC).

Maze Pattern Analysis with Image Matching

As previously discussed, to recognize the embedded data from captured image when a digital pen moving on a surface with data embedded, the captured image with maze pattern is analyzed, an affine transform from the captured image plane to the paper plane is obtained, and the information embedded in the captured maze pattern is recognized as a bit matrix. In the embodiment, the embedded interaction code is obtained from the bit matrix.

With an embodiment of the invention, methods and apparatuses obtain a perspective transform between the captured image plane and paper plane based on the obtained affine transform. The perspective transform typically models the relationship between two planes more precisely than an affine transform. Therefore, the number of error bits with the extracted bit matrix that is based on the perspective transform is typically less than the number of error bits with an extracted bit matrix that is based only on the affine transform, thus enabling the m-array decoding to be more efficient and robust.

A perspective transform typically provides a more robust analysis than an affine transform. (An affine transform preserves parallelism which may be restrictive with respect to some types of distortion.) For example, a paper document that is being annotated with an image-capturing pen may be crumbled, thus distorting the embedded interaction code. (For example, a tilted flat plane with respect to the camera requires a perspective transform.) A perspective transform typically provides better results than an affine transform in such cases.

FIG. 30 shows an example of an original captured image (I) 3000 in accordance with an embodiment of the invention. The image I is first preprocessed to obtain a normalized image I₀ 3100 with the document content mask and effective pixel mask, as shown in FIG. 31 in accordance with an embodiment of the invention. Pixels (e.g., pixel 3103) are associated with the document content mask and other pixels (e.g., pixel 3101) are associated with the effective maze pattern mask. (By normalizing an image, the resulting normalized image reduces the effect of non-uniform illumination of the image.)

As previously discussed, an affine transform (T₀) is obtained, and a bit matrix B₀ is extracted. FIG. 32 shows affine grids that are derived from the image shown in FIG. 31 in accordance with an embodiment of the invention. The grids are calculated from T₀. It can be seen that the grid lines (e.g., horizontal grid line 3201 and vertical grid line 3203) at the edges of the image may not be consistent with the real maze pattern grids.

An embodiment of the invention uses an iterative image matching approach to obtain a perspective transform. The approach is especially efficient when the captured image is under-sampled and the array size is small, such as 32×32 pixels, as the example image in FIG. 30. In such cases, obtaining the perspective transform from the effective pattern pixel directly is very difficult. Whereas by using the affine transform as an initial approximation, one may obtain the perspective transform in an iterative way. By extracting a bit matrix with affine transform parameters, one can estimate and generate a generated pattern image. Subsequently, by matching the captured maze pattern with the generated pattern image, a better approximation of the perspective transform is obtained. By performing iterative approximation, one can better estimate the perspective transform and an extracted bit matrix with fewer errors. The following are steps for estimating the perspective transform and obtaining the extracted bit matrix.

Step 1: Generate a generated pattern image I_i based on the extracted bit matrix B_i−1.

Step 2: Obtain a new transform T_i by matching the original image I₀ and the generated pattern I_i.

Step 3: Extract bits based on the transform T_i to get bit matrix B_i using grid lines obtained from T_i to extract bits from normalized image I₀.

Step 4: Compare the bit matrix B_i and B_i−1.

With the first step, the embodiment of the invention generates a generated pattern image I_i based on the extracted bit matrix B_i−1 as will be illustrated. Based on a priori knowledge about mapping “0” and “1” to what is printed on paper (e.g., the EIC fonts shown in FIG. 4A), one can generate the generated pattern image for paper coordinates. To facilitate the image matching, the resolution of the generated image should be near the resolution of the captured image, i.e., the pattern size of the generated image is sufficiently close to the pattern size of the captured image. FIG. 36A shows an example of a pattern image according to an embodiment of the invention. FIG. 36B shows another example of a pattern image according to an embodiment of the invention. For image I₀ in FIG. 31, the resolution of the pattern image in FIG. 36B is closer with I₀ than the pattern image in FIG. 36A, thus pattern image in FIG. 36B may be used.

With the second step, one obtains a new perspective transform T_i by matching the image I₀ and the generated pattern I_i. For example, one may use a technique described in “Panoramic Image Mosaics,” Microsoft Research Technical Report MSR-TR-97-23, by Heung-Yeung Shum and Richard Szeliski, published Sep. 1, 1997 and updated October 2001 to obtain the perspective matrix. Grid lines may be approximated from the perspective matrix. The grid lines in paper coordinates can be expressed as: y=c_m (Horizontal lines), x=c_n (Vertical lines), where c_m and c_n are constant values; m and n are the horizontal and vertical line index respectively. The distance between any two adjacent horizontal or vertical lines is assumed to be 1. One can determine the grid lines in the image sensor plane. One may assume a vertical line x=c₀, as an example, and transform the vertical line to the image sensor plane. One may select two positions in the line, for example: P_paper¹ (c₀, a) and P_paper² (c₀, b). The distance between these two points (b-a) should be large enough to ensure sufficient accuracy. The positions of these two points in the image sensor plane are: P_sensor¹ (x₁, y₁)=T_i⁻¹ P_paper¹ P_sensor² (x₂, y₂) 32T_i⁻¹ P_paper² where T_i is the obtained perspective matrix, which transforms a position from the image sensor plane to a position in the paper plane. T_i⁻¹ (the inverse matrix of T_i) transforms a position in the paper plane to the image sensor plane.

When the horizontal line x=c₀ is transformed to image sensor coordinates, the transformed line equation is determined by: $\frac{\begin{array}{c}x=x_1,\\ y=y_1,\\ x-x_1\end{array}}{x_2-x_1}=\frac{\begin{array}{c}\mathrm{if}{x}_1=x_2;\\ \mathrm{if}{y}_1=y_2;\\ y-y_1\end{array}}{y_2-y_1},\mathrm{else}.$

FIG. 33 shows maze pattern grid lines obtained from a perspective transform in accordance with an embodiment of the invention. Grid lines 3301 and 3303 are obtained from the perspective transform, and grid lines 3305 and 3307 are obtained from the affine transform.

In the third step, bits are extracted using the perspective transform T_i to obtain the corresponding bit matrix B_i.

In the fourth step, bit matrix B_i and bit matrix B_i−1, are compared. If the bit matrices B_i and B_i−1 are the same, then T_i is the final perspective transform and bit matrix B_i contains the final extracted bits. However, if the number of iterations (i) exceeds a predetermined threshold, for example 10 iterations, the process is deemed as unsuccessful. (The number of iterations is typically between 1 and 10.) In such a case, an embodiment sets i=i+1 and returns to step 1 as discussed above. Other embodiments of the invention may use other approaches for terminating or continuing subsequent iterations. For example, if the number of iterations exceeds a predetermined threshold, decoding of the extracted bits from B_i may be performed. If the number of errors does not exceed the maximum number of correctable errors, the error correction process will consequently remove the bit errors. With another embodiment, subsequent iterations of steps 1-4 continue if the number of matching bits between B_i and B_i−1 continues to decrease for consecutive iterations. In other words, if the number of matching bits between adjacent iterations remains the same, the process is terminated and error decoding may be performed on the extracted bits.

FIG. 34 shows process 3400 for processing a captured stroke in accordance with an embodiment of the invention. In step 3401, an image is captured by an image capturing pen. The image is then processed to obtain a normalized image in step 3403. In steps 3405-3407, the maze pattern is analyzed using steps 1-4 as discussed above. In step 3409, the extracted bits are decoded using the process shown in FIG. 12. Process 3400 is repeated if another image from the image capturing pen is to be processed as determined by step 3411.

FIG. 35 shows process 3500 for obtaining grid lines from an affine transform according to an embodiment of the invention. Process 3500 is similar to process 2600 as shown in FIG. 26, in which step 3501 corresponds to step 2601, step 3503 corresponds to steps 2603-2617, step 3505 corresponds to step 2621, and step 3507 corresponds to step 2623.

FIG. 36 shows process 3600 for obtaining grid lines from a perspective transform according to an embodiment of the invention. Steps 3601, 3603, and 3605 correspond to steps 3501, 3503, and 3505, respectively, as shown in FIG. 35. However, steps 3607-3615 replace step 3507 as well as provide bit matrix extraction. Steps 3607-3615 will be illustrated in the example that follows.

Example of Maze Pattern Analysis with Image Matching

In the following illustrative example of maze pattern analysis with image matching, the corresponding captured image 3700 is shown in FIG. 37. Image 3700 is normalized to form image 3800 as shown in FIG. 38.

The obtained affine transform matrix is:

0.333481	2.990952	0.000000
−3.283554	0.163605	0.000000
0.000000	0.000000	1

The grids defined by affine transform are shown in FIG. 39. FIG. 40 shows the bit matrix B₀ obtained based on the affine parameters as shown in FIG. 39. The valid bit count is 82, in which “−1” denotes an invalid bit.

Iteration 1:

The generated pattern image I_{Generated—loop1} based on B₀ is shown in FIG. 41. One obtains generated pattern image I_{Generated—loop1} from the extracted bit matrix B₀ and the a priori knowledge of the bit pattern (e.g., the bit patterns shown in FIG. 36A and 36B). The perspective transform matrix T₁ obtained by matching I₀ with I_{Generted—loop1} is:

0.104132	3.223432	0
−3.054295	0.305382	0
−0.011197	0.000697	1

The grid lines defined by perspective transform matrix T₁ is shown in FIG. 42. FIG. 43 shows bit matrix B₁. The number of valid bits in B₁ is 100, where the number of different extracted bits between B₀ and B₁ is 69.

Iteration 2:

The generated pattern image I_{Generated—loop2} based on B₁ is shown in FIG. 44. The perspective transform matrix T₂ obtained by matching I₀ with I_{Generated—loop2} is:

0.089394	3.248723	0.000000
−2.983796	0.361935	0.000000
−0.007464	0.002458	1

FIG. 45 shows grid lines derived from perspective transform T₂. FIG. 46 shows bit matrix B₂ according to an embodiment of the invention. The number of valid bits in B₂ is 109, and the number of different extracted bits between B₁ and B₂ is 22.

Iteration 3:

The generated pattern image I_{Generated—loop3} based on B₂ is shown in FIG. 47. The perspective transform matrix T₃ obtained by matching I₀ with I_{Generated—loop3} is:

0.098045	3.246665	0.000000
−2.999606	0.347929	0.000000
−0.008336	0.002458	1

FIG. 48 shows grid lines derived from the perspective transform T₃. FIG. 49 shows bit matrix B₃. The number of valid bits in B₃ is 110, and the number of different extracted bits between B₂ and B₃ is 5. One observes that the number of different bits between successive bit matrices is decreasing with respect to the previous iterations. However, because the difference is not zero, another iteration is performed to reduce the subsequent difference.

Iteration 4:

FIG. 50 shows a generated pattern image (I_{Generated—loop4}) based on the bit matrix B₃. The perspective transform matrix T₄ obtained by matching I₀ with I_{Generated—loop4} is:

0.098045	3.246665	0.000000
−2.999606	0.347929	0.000000
−0.008336	0.002458	1

FIG. 51 shows grid lines derived from the perspective transform T₄. FIG. 52 shows bit matrix B₄. The number of valid bits in B₄ is 110, and the number of different extracted bits between B₃ and B₄ is 0. Thus, no further iterations are necessary.

In the above example, one observes that the number of matching bits between adjacent iterations decreases with each subsequent iteration (i.e., 69, 22, 5, and 0 corresponding to iterations 1, 2, 3, and 4, respectively).

FIG. 53 shows apparatus 5300 for extracting a bit matrix from a captured image according to an embodiment of the invention. Apparatus 5300 comprises pre-processor 5301, affine transform analyzer 5303, and perspective transform analyzer 5305. Pre-processor 5301 processes the captured image in order to compensate for non-uniform illumination of the captured image. If the captured image is sufficiently and uniformly illuminated, then pre-processor 5301 may not process the captured image. In such a case, the pre-processed image corresponds to the captured image. Affine transform analyzer 5305 analyzes the pre-processed image to obtain the initial bit matrix B₀. In the shown embodiment, affine transform analyzer 5305 corresponds to steps 3601-3607 as shown in FIG. 36. Subsequently, perspective transform analyzer 5305 analyzes the initial bit matrix and the pre-processed image in order to obtain the final bit matrix. As previously discussed, the extracted bits may be subsequently corrected for errors (for example, as discussed with FIG. 12).

As can be appreciated by one skilled in the art, a computer system with an associated computer-readable medium containing instructions for controlling the computer system can be utilized to implement the exemplary embodiments that are disclosed herein. The computer system may include at least one computer such as a microprocessor, digital signal processor, and associated peripheral electronic circuitry.

Although the invention has been defined using the appended claims, these claims are illustrative in that the invention is intended to include the elements and steps described herein in any combination or sub combination. Accordingly, there are any number of alternative combinations for defining the invention, which incorporate one or more elements from the specification, including the description, claims, and drawings, in various combinations or sub combinations. It will be apparent to those skilled in the relevant technology, in light of the present specification, that alternate combinations of aspects of the invention, either alone or in combination with one or more elements or steps defined herein, may be utilized as modifications or alterations of the invention or as part of the invention. It may be intended that the written description of the invention contained herein covers all such modifications and alterations.

Claims

1. A computer-readable medium for analyzing a captured image of a document, wherein the document contains an embedded interaction code (EIC) pattern, and having computer-executable instructions to perform the steps comprising: (A) determining an affine transform and affine grid lines associated with the affine transform; (B) extracting an initial bit matrix (B0) from a pre-processed image using the affine grid lines; (C) generating a first generated pattern image (I1) from the initial bit matrix; (D) obtaining a first perspective transform (T1) by matching the pre-processed image and the first generated pattern image and obtaining first perspective grid lines associated with the first perspective transform; and (E) extracting a first bit matrix (B1) from the pre-processed image using the first perspective grid lines.

2. The computer-readable medium of claim 1, having computer-executable instructions to perform: (F) for i>1, generating an ith generated pattern image (Ii) from an (i-1)th bit matrix (Bi−1); (G) obtaining an ith perspective transform (Ti) by matching the pre-processed image and the ith generated pattern image and obtaining ith perspective grid lines associated with the ith perspective transform; and (H) determining an ith bit matrix (Bi) from the pre-processed image using the ith perspective grid lines.

3. The computer-readable medium of claim 2 having computer-executable instructions to perform: (I) comparing the ith bit matrix with an (i−1)th bit matrix (Bi−1).

4. The computer-readable medium of claim 3 having computer-executable instructions to perform: (J) if the ith bit matrix equals the (i−1)th bit matrix, setting final extracted bits to the ith bit matrix.

5. The computer-readable medium of claim 4 having computer-executable instructions to further perform: (K) decoding the final extracted bits.

6. The computer-readable medium of claim 3 having computer-executable instructions to perform: (J) if the ith bit matrix does not equal the (i−1)th bit matrix, repeating (F)-(I).

7. The computer-readable medium of claim 2 having computer-executable instructions to perform: (I) determining the ith perspective grid lines in an image sensor plane from a paper document plane with an inverse of the ith perspective transform (Ti−1).

8. The computer-readable medium of claim 1 having computer-executable instructions to perform: (F) pre-processing the captured image to obtain the pre-processed image.

9. The computer-readable medium of claim 8 having computer-executable instructions to perform: (G) normalizing the captured image for non-uniform illumination.

10. The computer-readable medium of claim 2, wherein (F) utilizes a priori knowledge of embedded interaction code (EIC) fonts.

11. The computer-readable medium of claim 3 having computer-executable instructions to perform: (J) if the ith bit matrix does not equal the (i−1)th bit matrix and a number of iterations exceeds a predetermined threshold, performing error correction on the ith bit matrix.

12. The computer-readable medium of claim 3 having computer-executable instructions to perform: (J) if a number of matching bits between the ith bit matrix and the (i−1)th bit matrix increases with consecutive iterations, repeating (F)-(I).

13. The computer-readable medium of claim 3 having computer-executable instructions to perform: (J) if a number of iterations exceeds a predetermined threshold, setting final extracted bits to the ith bit matrix.

14. The computer-readable medium of claim 13 having computer-executable instructions to perform: (K) decoding the final extracted bits.

15. An apparatus for analyzing a captured image of a document that contains an embedded interaction code (EIC) pattern, comprising: an affine transform analyzer that determines an affine transform corresponding to a pre-processed image and that determines an initial bit matrix from affine grid lines that are associated with the affine transform; and a perspective transform analyzer that iteratively determines an ith bit matrix (Bi) by utilizing an ith perspective transform (Ti) and the pre-processed image.

16. The apparatus of claim 15, wherein, if an ith bit matrix is equal to the (i−1)th bit matrix, the perspective transform analyzer terminates iteratively determining the ith bit matrix and sets a final bit matrix to the ith bit matrix.

17. The apparatus of claim 15, wherein the perspective transform analyzer determines the ith perspective transform by matching the pre-processed image with an ith generated image (Ii).

18. The apparatus of claim 17, wherein the perspective transform analyzer determines the ith generated image based on an (i-1)th bit matrix.

19. The apparatus of claim 15, further comprising: a pre-processor that normalizes the captured image for illumination to obtain the pre-processed image.

20. A method for analyzing a captured image of a document, the document containing an embedded interaction code (EIC) pattern, the method comprising: (A) normalizing the captured image for non-uniform illumination to obtain a pre-processed image; (B) determining an affine transform and affine grid lines associated with the affine transform; (C) extracting an initial bit matrix (B0) from the pre-processed image using the affine grid lines; (D) obtaining an ith perspective transform (Ti) by matching the pre-processed image and the ith generated pattern image (Ii) and obtaining ith perspective grid lines associated with the ith perspective transform; (E) determining an ith bit matrix (Bi) from the pre-processed image using the ith perspective grid lines; (F) comparing the ith bit matrix with an (i−1)th bit matrix (Bi−1); (G) if the ith bit matrix equals the (i−1)th bit matrix, setting final extracted bits to the ith bit matrix; and (H) if the ith bit matrix does not equal the (i−1)th bit matrix, repeating (D)-(G).