Patent Grant
7477362
This invention relates to a moiré interferometric strain sensor and refers particularly, through not exclusively, to such a sensor using multiple microlenses.
Strain measurement is important in mechanics, material science and engineering. Devices used for strain measurement include mechanical extensometers and electrical resistance strain gauges. Optical devices such as moiré, speckle and holography have recently been developed and may also be used. Optical devices are whole-field, non-contact and sensitive methods for static and dynamic strain measurement. However, most optical devices provide contours of displacement components which need to be processed to obtain the distribution of strain and stress. For example, moiré interferometry uses a high frequency (typically 1200 lines/mm) diffraction grating replicated onto the specimen to map the whole field deformation in two perpendicular directions. The technique was extended to micron-level spatial resolution capability using a fiber optic based Micro-Moiré Interferometer (MMI). Numerical and optical schemes have been proposed to provide strain indications from these deformation maps.
However, the ubiquitous electrical resistance strain gauge is still popular since they can directly measure strain at a specific point.
Optical diffraction principles were proposed as an alternative by directly determining strain using a shift of a diffracted beam. Such Optical Diffraction Strain Sensors (ODSS) avoid the difficulty in fringe pattern interpretation associated with most optical techniques. With the advent of sensitive Position Sensing Detectors (PSD), the capabilities of the ODSS rival that of an electrical resistance strain gauge. However, as with the electrical strain gauge, the ODSS is still a point measurement scheme. Therefore, it has not been able to compete with the well-established electrical strain gauge.
In the paper “Optical Strain Sensor Using Position-Sensitive Detector and Diffraction Grating: Error Analysis” by Asundi and Zhao (Opt. Eng. 39(6) June 2000 at pages 1645 to 1651), the contents of which are hereby incorporated in their entirety as if disclosed herein, there is disclosed a strain sensor having a single incident light beam, and two detectors that is also able to detect strain at a single point only.
To have multi channel strain sensor where strains can be simultaneously and directly measured at many points requires a myriad of wires and data acquisition systems.
In accordance with a first preferred aspect there is provided a moiré interferometric strain sensor for detecting strain on a specimen, the strain sensor comprising:
According to a second preferred aspect there is provided a method for detecting a strain on a specimen, the method comprising placing a high frequency diffraction grating on the specimen; providing at least one incident beam on the specimen at the diffraction grating to cause at least one diffracted beam; using an array of a plurality of microlenses to receiving the at least one diffracted beam; and detecting the at least one diffracted beam at an array of a plurality of detectors at a focal plane of the array of a plurality of microlenses.
According to a third preferred aspect there is provided a moiré interferometric strain sensor for detecting strain on a specimen, a diffraction grating being on the specimen, and at least one light source for directing at least two light beams on the diffraction grating, the at least two light beams being able to illuminate at least a major portion of the diffraction grating without movement of the at least two light beams.
According to a fourth preferred aspect there is provided a method for detecting a strain on a specimen, the method comprising placing a high frequency diffraction grating on a surface of the specimen; providing at least one light source for directing at least two light beams on the diffraction grating, the at least two light beams illuminating at least a major portion of the diffraction grating without movement of the at least two light beams.
The at least two light beams may be coincident on the diffraction grating when the diffraction grating is in a reference state. The at least two light beams may be symmetrical about a line perpendicular to the specimen. The at least two light beams may be of the same frequency. The angle of symmetry may be determined by the diffraction grating frequency and the frequency of the at least two light beams. There may be a single light source, the at least two beams being from the single light source. The at least two beams may be collimated beams.
The array of a plurality of microlenses may be close packed or spaced apart. The detectors may be a charge coupled device or a complimentary metal oxide device.
There may be a single microlens for each of the plurality of detectors; and the microlens array may comprise a plurality of microlenses all being substantially identical.
There may be at least one further array of microlenses, the at least one further array of microlenses being of a different or similar sensitivity to that of the array of microlenses.
The microlens array may be a virtual microlens array and may be produced by a spatial light modulator. The spatial light modulator may be a liquid crystal display, a liquid crystal on silicon, or a digital micro-mirror device.
In order that the present invention may be fully understood and readily put into practical effect, there shall now be described by way of non-limitative example only preferred embodiments of the present invention, the description being with reference to the accompanying illustrative drawings.
In the drawings:
a) is an illustration of two preferred mircolens arrays;
b) is an illustration of a spatial light;
This embodiments described provide a method and apparatus able to measure strain simultaneously at multiple points using optical diffraction techniques.
As shown in
Each beam 14, 16 is diffracted by the specimen 12 and is separately sampled using a microlens array 18 placed in front of a detector array 20. The microlens array 18 comprises a plurality of microlenses 19. Each detector in the array 20 may be a Charged Coupled Device (CCD), complimentary metal oxide (CMOS) or other multi-point position sensor detector (PSD). The detector array 20 is placed at the focal plane of microlens array 18; there being one detector array 20 for each microlens array 18. A spot from each of the microlenses 19 is formed on the detector array 20, there being one spot for each of the illuminating beams thus giving two spots for each microlens 19 and detector 20. (
It is preferred for both the beams 14, 16 to illuminate the entire area under scrutiny. This may be all or a major portion of the grating 10, as shown in
At the same time, Moiré Interferometric (MI) fringes may be recorded using the traditional Moiré imaging system comprising a beam splitter 28, an objective lens 30 and a detector array 32.
The system can simultaneously record contours of displacement components in the direction perpendicular to the grating lines by interference of the two beams reflected by the specimen 12 and diffracted by the grating 10. The result is shown on
Two symmetrical beams 14, 16 are used. The two beams 14, 16 should be symmetrical about a line perpendicular to the surface of the specimen 12. The angle of symmetry is determined by the frequency of the grating and the wavelength of the source of the beams 14, 16. It is preferred that the beams 14, 16 are of the same frequency and more preferably are from the same source. That source may be a laser. Each beam 14, 16 may comprise more than one beam. As shown on
The beams 14, 16 are directed towards the specimen 12 with the grating 10 and are diffracted by the specimen 12, onto which is bonded the grating 10, and captured by the microlens array 18. The bonding may be by any suitable bonding method or apparatus. The diffracted beams 24, 26 respectively emerge as distorted wavefronts. The wavefront shape at the plane of the microlens 18 array is identical to the shape at the plane of the grating 10. The microlens array 18 forms the array of spot images on the detector array 20 as shown in
sin α=λf (1)
where λ is the wavelength of the laser used and f is the frequency of the grating. From the diffraction equation
sin β=mλf+sin α (2)
where β is the angle of the diffracted beam with respect to the surface normal and m is the diffraction order, it is observed that the +1 order of beam incident at an angle −α, emerges normal to the grating plane (β=0) as does the −1 order of the +α beam. When the specimen deforms, i.e. the pitch of the grating changes to f+Δf, equation (2) becomes
sin(β+Δβ)=∓λ(f+Δf)+sin α (3)
where m =1, and Δβ is the change in the diffraction angle.
From this the following relation between change in frequency and change in diffraction angle can be derived
±Δβ=λΔf (4)
The derivative of displacement (strain) in the direction perpendicular to the grating line is proportional to the change in pitch or frequency of the grating. Thus
Using matrix optics formulation, the matrix equation for a parallel beam passing through a lens followed by propagation by one focal length , can be written as
where xout and θ are the position and slope of the rays at the output (focal plane of lens), xin and β are the ray position and angle at the input (grating) plane and F is the focal length of the lens. For the undeformed case it is observed that xout is zero for both diffracted rays as they emerge parallel to the optical axis. If the specimen and hence the specimen grating were tilted, then once again both rays are coincident but since the angle β is non-zero, the spots are not at the optical axis (xout is not zero). When the specimen deforms, β changes locally based on strain as per equation (5) and hence xout=Fβ.
A single illumination beam 14 or 16 may suffice. However, it is noted from equation (6) that a rigid body tilt of the specimen grating 10, would also cause β to change and hence xout would also change. For two symmetrical illuminating beams 14, 16, rigid body tilt would still cause a change in xout but it will same for the two beams 14, 16 and thus the spots will move by the same amount in the same direction. A change in the frequency of the grating 10 due to strain would cause the two beams 14, 16 to diffract in equal but opposite directions. Hence the diffraction spots move in different directions and hence can be measured.
In this system each microlens 19 samples a specific part of wavefront emerging from the grating, i.e. the diffracted ray emerging from a specific portion of the grating. The size of the microlens 19 determines the area sampled and hence is related to the gauge length of the strain sensor. In the undeformed case the spots from the two illumination rays overlap, while when the specimen deforms, the diffracted dots separate either in the horizontal or the vertical directions. The relative separation (p) between the two spots gives the derivative of displacement, i.e. strain from equations (5) and (6) as
The factor of 2 in the denominator is due to the fact that the two spots moved in opposite directions.
Demonstration of this new method is shown using a 1200 lines/mm grating 10 on a glass substrate as the specimen 12. The grating 10 was mounted on a stage that could be translated as well as rotated in a plane. The microlens array 18 was placed 12 cm from the plane of the grating 10 to capture the sampled spots image.
The null field was established by overlapping the spots from both the diffracted wavefronts (
The spots image and fringe pattern for the deformed state are shown in
The spot centroids were determined by capturing the spots image for the reference state of the object. The image is segmented into zones based on the configuration of the micro-lens array 20. The centroids in each segment are then calculated. The same process is followed for the second beam. The deformed image is followed and the same procedure followed. The spot separation is then determined. The strain can be determined by using the position of the dots from the reference and deformed images. Using the system parameters, equation. (7) becomes ε=0.082 (p). The camera has a pixel size of 8.6 μm (H)×8.3 μm (V) and hence the strain sensitivity is 0.71*10−3 and 0.69*10−3 per pixel shift in the horizontal and vertical direction respectively. Using sub-pixel centroid detection algorithms, the sensitivity can be significantly improved.
From the spots image and the fringe patterns shown in
For the spot image the derivative of displacement was calculated using the strain sensitivity multiplied by the pixel number, while for the moiré interferometric the derivative of displacement is given as the reciprocal of the fringe spacing multiplied by the frequency of the reference grating which is twice that of the specimen grating.
The strain gauge is able to determine the in-plane strain and/or geometric changes at multiple point of the specimen, and is effective for diverse engineering materials, and diverse applications, particularly for composites such as in the study of strain concentration, crack initiation, residual strain and the micro/macro mechanics of composite structures.
Different microlens arrays 18 of different materials and various array dimensions and focal length may be used. As shown in
As shown in
As shown in
As shown in
As shown in
Whilst there has been described in the foregoing description preferred embodiments of the present invention, it will be understood by those skilled in the technology concerned that many variations or modifications in details of design or construction may be made without departing from the present invention.
| Number | Name | Date | Kind |
|---|---|---|---|
| 4432239 | Bykov | Feb 1984 | A |
| 5026154 | Deason | Jun 1991 | A |
| 5233174 | Zmek | Aug 1993 | A |
| 5737075 | Koch et al. | Apr 1998 | A |
| 5828455 | Smith et al. | Oct 1998 | A |
| 5898486 | Chesko et al. | Apr 1999 | A |
| 6587211 | Gelbart | Jul 2003 | B1 |
| 7170597 | Hooper et al. | Jan 2007 | B1 |
| Number | Date | Country | |
|---|---|---|---|
| 20070070327 A1 | Mar 2007 | US |
