1. Field of the Invention
The present invention relates generally to optical metrology and more particularly to characterizing and monitoring intra-field distortions of projection imaging systems used in semiconductor manufacturing.
2. Description of the Related Art
Today's lithographic processing requires ever tighter layer-to-layer overlay tolerances to meet device performance requirements. Overlay registration is defined as the translational error that exists between features exposed layer to layer in the vertical fabrication process of semiconductor devices on silicon wafers. Other names for overlay registration include, registration error and pattern placement error, and overlay error. Overlay registration on critical layers can directly impact device performance, yield and repeatability. Increasing device densities, decreasing device feature sizes and greater overall device size conspire to make pattern overlay one of the most important performance issues during the semiconductor manufacturing process. The ability to accurately determine correctable and uncorrectable pattern placement error depends on the fundamental techniques and algorithms used to calculate lens distortion, stage error, and reticle error.
A typical microelectronic device or circuit may consist of 20–30 levels or pattern layers. The placement of pattern features on a given level must match the placement of corresponding features on other levels, i.e., overlap, within an accuracy which is some fraction of the minimum feature size or critical dimension (CD). Overlay error is typically, although not exclusively, measured with a metrology tool appropriately called an overlay tool using several techniques. See for example, Semiconductor Pattern Overlay, N. Sullivan, SPIE Critical Reviews Vol. CR52, 160:188. The term overlay metrology tool or overlay tool means any tool capable of determining the relative position of two pattern features or alignment attributes, that are separated within 500 um (microns) of each other. The importance of overlay error and its impact to yield can be found elsewhere. See Measuring Fab Overlay Programs, R. Martin, X. Chen, I. Goldberger, SPIE Conference on Metrology, Inspection, and Process Control for Microlithography XIII, 64:71, March, 1999; New Approach to Correlating Overlay and Yield, M. Preil, J. McCormack, SPIE Conference on Metrology, Inspection, and Process Control for Microlithography XIII, 208:216, March 1999.
Lithographers have created statistical computer algorithms (for example, Klass II and Monolith) that attempt to quantify and divide overlay error into repeatable or systematic and non-repeatable or random effects. See Matching of Multiple Wafer Steppers for 0.35 Micron Lithography Using Advanced Optimization Schemes, M. van den Brink, et al., SPIE Vol. 1926, 188:207, 1993; A Computer Aided Engineering Workstation for Registration Control, E. McFadden, C. Ausschnitt, SPIE Vol. 1087, 255:266, 1989; Semiconductor Pattern Overlay, supra; Machine Models and Registration, T. Zavecz, SPIE Critical Reviews Vol. CR52, 134:159. An overall theoretical review of overlay modeling can be found in Semiconductor Pattern Overlay, supra.
Overlay error is typically divided into the following two major categories. The first category, inter-field or grid overlay error, is concerned with the actual position of the translation and rotation, or yaw, of the image field as recorded in the photoresist on a silicon wafer using an exposure tool, i.e., stepper or scanner. Translation is referenced from the nominal center of the water while yaw is referenced with respect to the nominal center at each field. See
The second category, intra-field overlay error, is the positional offset of an individual point inside a field referenced to the nominal center of an individual exposure field, as illustrated in
It is important for this discussion to realize that most overlay measurements are made on silicon product wafers after each photolithographic process, prior to final etch. Product wafers cannot be etched until the resist target patterns are properly aligned to the underlying target patterns. See Super Sparse Overlay Sampling Plans: An Evaluation of Methods and Algorithms for Optimizing Overlay Quality Control and Metrology Tool Throughput, J. Pellegrini, SPIE Vol. 3677, 72:82. Manufacturing facilities rely heavily on exposure tool alignment and calibration procedures to help insure that the stepper or scanner tools are aligning properly; See Stepper Matching for Optimum Line Performance, T. Dooly et al., SPIE Vol. 3051, 426:432, 1997; Mix-and-Match: A Necessary Choice, R. DeJule, Semiconductor International, 66:76, February 2000; Matching Performance for Multiple Wafer Steppers Using an Advanced Metrology Procedure, supra. Inaccurate overlay modeling algorithms can corrupt the exposure tool calibration procedures and degrade the alignment accuracy of the exposure tool system. See Super Sparse Overlay Sampling Plans: An Evaluation of Methods and Algorithms for Optimizing Overlay Quality Control and Metrology Tool Throughput, supra.
Over the past 30 years the microelectronics industry has experienced dramatic rapid decreases in critical dimension by moving constantly improving photolithographic imaging systems. Today, these photolithographic systems are pushed to performance limits. As the critical dimensions of semiconductor devices approach 50 nm the overlay error requirements will soon approach atomic dimensions. See Life Beyond Mix-and-Match: Controlling Sub-0.18 micron Overlay Errors, T. Zavecz, Semiconductor International, July, 2000. To meet the needs of next generation device specifications new overlay methodologies will need to be developed. In particular, overlay methodologies that can accurately separate out systematic and random effects and break them into assignable causes will greatly improve device process yields. See A New Approach to Correlating Overlay and Yield, supra.
In particular, those new overlay methodologies that can be implemented into advanced process control or automated control loops will be most important. See Comparisons of Six Different Intra-field Control Paradigms in an Advanced Mix and Match Environment, J. Pellegrini, SPIE Vol. 3050, 398:406, 1997; Characterizing Overlay Registration of Concentric 5× and 1× Stepper Exposure Fields Using Inter-Field Data, F. Goodwin et al., SPIE Vol. 3050, 407:417, 1997. Finally, another area where quantifying lens distortion error is of vital concern is in the production of photomasks or reticles during the electron beam manufacturing process. See Handbook of Microlithography and Microfabrication, P. Rai-Choudhury, Vol. 1, pg. 417, 1997.
Semiconductor manufacturing facilities generally use some version of the following complex overlay procedure to help determine the magnitude of intra-field distortion independent of other sources of systematic overlay error for both photolithographic steppers and scanners. The technique has been simplified for illustration. See Analysis of Image Field Placement Deviations of a 5× Microlithographic Reduction Lens, D. MacMillen et al., SPIE Vol. 334, 78:89, 1982.
At this point the stepper and wafer stage are programmed to step and expose the small target box in the 5×5 array where each exposure is separated from the previous one by the stepping distance P. With the assumption of a perfect stage, the final coordinates of the small target boxes are assumed to form a perfect grid, where the spacing of the grid is equal to the programmed stepping distance, P. Finally, if the first full-field exposure truly formed a perfect image, then the entire 5×5 array of smaller target boxes would fit perfectly inside the 5×5 array of larger target boxes as illustrated in
The following inter-field and intra-field modeling equations are commonly used to fit the overlay data using a least square regression technique. See Analysis of Image Field Placement Deviations of a 5× Microlithographic Reduction Lens, supra; Super Sparse Overlay Sampling Plans: An Evaluation of Methods and Algorithms for Optimizing Overlay Quality Control and Metrology Tool Throughput, supra.
dxf(xf,yf)=Tx+s*xf−q*yf+t1*xf2+t2*xf*yf−E*(xf3+xf*yf2) (eq. 1)
dyf(xf,yf)=Ty+s*yf+q*xf+t2*yf2+t1*xf*yf−E*(yf3+yf*xf2) (eq. 2)
where
A problem with the this technique is two-fold, first, it is standard practice to assume that the wafer stage error is very small, randomly distributed, and can be completely accounted for using a statistical model. See Analysis of Image Field Placement Deviations of a 5× Microlithographic Reduction Lens, supra; A “Golden Standard” Wafer Design for Optical Stepper Characterization, supra; Matching Management of Multiple Wafer Steppers Using a Stable Standard and a Matching Simulator, M. Van den Brink et al., SPIE Vol. 1087, 218:232, 1989; Matching Performance for Multiple Wafer Steppers Using an Advanced Metrology Procedure, supra. In general, positional uncertainties in the wafer stage introduce both systematic and random errors, and since the intra-field is measured only in reference to the lithography tool's wafer stage, machine to machine wafer stage differences show up as inaccurate lens distortion maps. Secondly, the assumption that lens distortion is zero at the center of the lens is incorrect. Furthermore, the model represented by Equations 1 and 2 is entirely unsuited to modeling scanner scale overlay errors—typically the intra-field distortion model accounts only for the scanner skew and scanner scale overlay errors—in general, the synchronization errors between the reticle stage and wafer stage introduce more complex errors described below.
A technique for stage and ‘artifact’ self-calibration is described in See Self-Calibration in Two-Dimensions: The Experiment, M. Takac, et al., SPIE Vol. 2725, 130:146, 1996; Error Estimation for Lattice Methods of Stage Self-Calibration, M. Raugh, SPIE Vol. 3050, 614:625, 1997. It consists of placing a plate (artifact) with a rectangular array of measurable targets on a stage and measuring the absolute positions of the targets using a tool stage and the tool's image acquisition or alignment system. This measurement process is repeated by reinserting the artifact on the stage but shifted by one target spacing in the X-direction, then repeated again with the artifact inserted on the stage shifted by one target spacing in the Y-direction. Finally, the artifact is inserted at 90-degrees relative to its' initial orientation and the target positions measured. The resulting tool measurements are a set of (x, y) absolute positions in the tool's nominal coordinate system. Then, the absolute positions of both targets on the artifact and a mixture of the repeatable and non-repeatable parts of the stage x, y grid error are then determined to within a global translation (Txg, Tyg), rotation (qg) and overall scale ((sxg+syg)/2) factor. A drawback to this technique is that it requires that the measurements be performed on the same machine that is being assessed by this technique. Furthermore, this technique requires measurements made on a tool in absolute coordinates; the metrology tool measures the absolute position of the printed targets relative to it's own nominal center; so absolute measurements are required over the entire imaging field (typical size greater than about 100 mm2).
Another technique for the determination of intra-field distortion is the method of A. H. Smith et al. (“Method And Apparatus For Self-Referenced Projection Lens Distortion Mapping”, U.S. patent application Ser. No. 09/835,201, filed Apr. 13, 2001). It is a self-referencing technique that can be utilized with overlay metrology tools in a production environment. For diagnosing the intra-field scanner distortion in the presence of significant scanner non-repeatability, this technique teaches the use of a special reticle that has reduced optical transmission that is multiply scanned producing sub-Eo exposures on the wafer. This technique can be used to accurately determine the repeatable part of the scanner intra-field distortion but not that part of the intra-field distortion that changes from scan to scan (a simple example of which is the scanner y-magnification).
Another drawback to these techniques to determine the intra-field error is that they use the scanner itself as the metrology tool. Due to the cost of scanners, which can exceed 10 million dollars, it is desirable to have a technique for intra-field error that does not use the scanner itself as the metrology tool for determining intra-field distortion but utilizes relatively inexpensive overlay metrology tools. Furthermore, it is desirable that the technique be easy to perform and thereby allowing it to be used in a production environment by the day-to-day operating personnel. It is further desirable to have a technique that can distinguish between the non-repeatable parts of the scanner intra-field distortion.
Other references that discuss aspects of intra-field distortion include: New 0.54 Aperture I-Line Wafer Stepper with Field by Field Leveling Combined with Global Alignment, M. Van den Brink et al., SPIE Vol. 1463, 709:724, 1991; Impact of Lens Aberrations on Optical Lithography, T. Brunner; Lens Matching and Distortion Testing in a Multi-Stepper, Sub-Micron Environment; A. Yost et al., SPIE Vol. 1087, 233:244, 1989; The Attenuated Phase Shift Mask, B. Lin; Projection Optical System for Use in Precise Copy, T. Sato et al., U.S. Pat. No. 4,861,148, Aug. 29, 1989; Method of Measuring Bias and Edge Overlay Error for Sub 0.5 Micron Ground Rules, C. Ausschnitt et al., U.S. Pat. No. 5,757,507, May 26, 1998.
Therefore there is a need for an effective, and efficient, way to determine the scanner intra-field distortion or translation errors of a projection system.
A method and apparatus in accordance with the invention determines the reticle stage component of synchronization error in a projection imaging tool. The techniques include exposing a first portion of a reticle pattern onto a substrate with a recording media thereby producing a first exposure. The first portion of the reticle pattern includes at least two arrays of alignment attribute that have features complementary to each other. The reticle stage is then shifted and a second portion of the reticle pattern is exposed. The first and second exposures overlap and interlock to create completed alignment attributes. Measurements of positional offsets of the completed alignment attributes are used to determine the reticle stage portion of synchronization error. For example, the reticle stage portion of synchronization error can include grid and yaw error.
A desired number of completed alignment attributes can be produced by repeatedly shifting the reticle stage and exposing additional portions of the reticle. Exposing a portion of a reticle can be accomplished by using blades that cover a portion of a reticle. Also, the substrate that is exposed can be a semiconductor surface, a silicon wafer, a flat panel display, a reticle, a photolithographic mask, or an electronic recording media. The recording media on the substrate can be a negative resist material, a positive resist material, an electronic CCD, a liquid crystal material, or an optically sensitive material. In addition, the reticle can include a reduced transmission material or an attenuated phase shift mask. Also, the exposure may be made using a plurality of E0 (E zero) exposures.
The projection imaging tool that has its reticle stage grid and yaw determined can be used in a photolithographic stepper system, a photolithographic scanner system, an electronic beam imaging system, an extreme ultra-violet photolithographic tool, or an x-ray imaging system.
Another technique is that a projection imaging tool reticle stage grid and yaw can be determined by stepping a wafer stage so as to position a substrate with a recording media in a desired location and then exposing a first portion of a reticle pattern onto a substrate with a recording media thereby producing a first exposure. A first portion of the reticle pattern includes at least two arrays of alignment attribute that have features complementary to each other. The reticle stage is then shifted and a second portion of the reticle pattern is exposed. The first and second exposures overlap and interlock to create completed alignment attributes. Then, repeated stepping, exposing, shifting, a desired number of times produces completed alignment attributes. Measurements of positional offsets of the completed alignment attributes are used to determine the reticle stage grid and yaw.
The techniques can be used on projection imaging tools used in the manufacture of integrated circuits. In addition, the determined reticle grid and yaw can be used in controlling the reticle stage of a projection imaging tool.
Other features and advantages of the present invention should be apparent from the following description of the preferred embodiment, which illustrates, by way of example, principles of the invention.
a is a schematic of a typical scanner exposure field and the coordinate system used for calculation purposes.
b shows a schematic of some typical alignment attributes—described in
a shows a schematic of a typical reticle used to calculate stage metered scan and lens distortion.
b shows a reticle schematic for the preferred embodiment for use with photolithographic scanners.
a shows a schematic of a 180 degree R-shear overlay on wafer.
b shows a schematic of a 90 degree R-shear overlay on wafer.
Overview
Overlay error is often referred to as registration error or pattern placement error, or simply error, of a reticle pattern projected onto a substrate or wafer. Overlay error is typically classified, or divided, into the following two categories: grid or inter-field error and intra-field error. Intra-field error is the overlay error in placement within a projection field (or simply referred to as a field), of a lithographic projection system. Inter-field error is the overlay error from field to field on the wafer. Examples of intra-field error are illustrated in
In order to measure overlay error using conventional optical metrology tools, special alignment attributes or overlay target patterns (See
The deviation of the positional overlap of the alignment attributes from their nominal or machine-programmed position is the metric used to quantify overlay error.
Examples of photolithographic scanning tools that the techniques described below cab be used with include, deep-UV, e-beam systems, EUV and x-ray imaging systems. See Mix-and-Match: A Necessary Choice, supra; Reduction Imaging at 14 nm Using Multiplayer-Coated Optics: Printing of Features Smaller than 0.1 Micron, J. Bjorkholm et al., Journal Vacuum Science and Technology, B 8(6), 1509:1513, November/December 1990; Development of XUV Projection Lithography at 60–80 nm, B. Newnam et al., SPIE Vol. 1671, 419:436, 1992; Optical Lithography—Thirty years and Three Orders of Magnitude, J. Bruning, SPIE Vol. 3051, 14:27, 1997. Vector displacement plots can provide a visual description of the direction, magnitude, and location of overlay error that are mathematically separated into components using variety of regression routines.
As discussed above, other techniques used to measure the intra-field distortion use the projection lithography tool that is being assessed to make the measurements. An aspect of a technique in accordance with the invention is that the measurements required for determining the intra-field lens distortion can, and preferably are, made on an overlay metrology tool quite distinct from the projection lithography tool that we are assessing. In addition, some other techniques require measurements made on a tool in absolute coordinates. In these techniques the metrology tool measures the absolute position of the printed targets relative to it's own nominal center; so absolute measurements are required over the entire imaging field (typical size greater than about 100 mm2). An aspect of a technique in accordance with the invention uses relative coordinates or displacements of features, such as box in box structures or some other alignment attribute, that are measured with respect to each other, and the distances between these alignment attributes is typically less than about 0.5 mm. For example, in the case of box in box structures these distances are typically less than about 0.02 mm. Eliminating the need to maintain absolute position over a large area is very beneficial. For example, absolute metrology tools such as the Leica LMS 2000, Leica IPRO (See Leica LMS IPRO brochure, Leica), or Nikon 5I (See Measuring system XY-5i, K. Kodama et al., SPIE Vol. 2439, 144:155, 1995) typically cost in excess of 2 million dollars and are uncommon in semiconductor manufacturing facilities (“fabs”) while overlay metrology tools such as the KLA 5200, or Bio-rad Q7 typically cost 0.5 million dollars and are widely deployed in fabs. Another drawback to using an absolute position technique is that it requires that the intra-field distortion to be repeatable from exposure to exposure, this is precluded by the scanner dynamics.
The structure of scanner intra-field distortion or translational error can be decomposed into a lens component, dependent only on the projection imaging objective or projection system objective or projection system aberrations, See
a and 1b show an instantaneous (top down) view of a partially exposed scanner field (and coordinate system) as it might appear on a photoresist coated silicon wafer during a scan. Lack of coordination between the wafer stage and reticle stage in the absence of lens distortion will manifest itself as translational offset error −ΔT♦(x,y,ys) which is defined as the instantaneous translational offset error on the wafer at intra-field position x,y—located inside the image of the lens slit—when the scanner is at position (ys). See
Thus, there are two independent sources of transverse scanning error or scanning distortion; projection lens distortion error—that varies in magnitude and direction across the scanner field (in the x direction, or perpendicular to the scanning direction) and synchronization errors that represent an average of the instantaneous (repeatable and non-repeatable) positional offsets of the wafer and reticle stage. These errors are expressed in Equations 3–13 in detail.
Because the reticle and wafer move in a coordinated manner as rigid bodies relative to one another, lack of coordination will show up as instantaneous offset errors, (ΔTx, ΔTy)♦(x,y,ys). Here (ΔTx, ΔTy)♦(x,y,ys) is the instantaneous translational offset error of the projected image at the wafer relative to a perfectly placed wafer is a function not only of the intra-field coordinate (x,y) but also of the instantaneous position, ys, of the wafer relative to the center of the scanning slit.
(ΔTx, ΔTy)♦(x,y,ys)=(ΔX(ys)+θs(ys)*(y−ys), ΔY(ys)−θs(ys)*x) eq. 3)
Another contributor to the instantaneous offset vector arises from the static distortion contribution of the projection lens. Thus if (ΔXsl, ΔYsl)♦(x,y) is the static lens distortion, then it's contribution to the instantaneous offset vector (ΔTx, ΔTy) will be:
(ΔTx, ΔTy)♦(x,y,ys)=(ΔXsl, ΔYsl)♦(x,y−ys) eq. 3a)
Lens distortion is the intra-field distortion of the scanner as determined when the wafer and reticle stages are not moved with respect to one another to produce the scanned image field. Thus, the static lens distortion does not include any contribution from synchronization or dynamic yaw errors due to the relative motion of the reticle and wafer stages. Referring to
x=(−SW/2:SW/2) y=(−SH/2:SH/2) eq. 3b)
There are various techniques for determining (ΔXsl, ΔYsl), a very accurate technique is described in “Method And Apparatus For Self-Referenced Projection Lens Distortion Mapping”, A. H. Smith et al., U.S. patent application Ser. No. 09/835,201, filed Apr. 13, 2001. However, this and other techniques for measuring static lens distortion are not required for the techniques described below.
Combining equations 3 and 3a give the total contribution to the instantaneous offset error as:
(ΔTx, ΔTy)♦(x,y,ys)=(ΔXsl, ΔYsl)♦(x,y−ys)+(ΔX(ys)+θs(ys)*(y−ys), ΔY(ys)−θs(ys)*x) eq. 3c)
Here x,y vary over the entire span of intra-field coordinates;
x=(−SW/2:SW/2) y=(−L/2:L/2) eq. 3d)
while ys varies over the range:
ys=(y−SH/2:y+SH/2) eq. 3e)
since the projected image suffers a shift only when the slot (or more precisely any part of the illuminated slot) is over field position (x,y).
The effect of the projected image is then just a weighted average over the slot of the instantaneous offsets (ΔTx, ΔTy):
(ΔXF, ΔYF)♦(x,y)=INT{dys*w(y−ys)*(ΔTx, ΔTy)♦(x,y,ys)}/INT{dys*w(y−ys)} eq. 3f)
where;
The two distinct parts of (ΔTx, ΔTy) (scanner dynamics (Equation 3) and lens distortion (Equation 3a)) are additive and therefore the intra-field distortion, (ΔXF, ΔYF), can also be divided up into similar parts as:
(ΔXF, ΔYF)♦(x,y)=(ΔxL, ΔyL)♦(x)+(ΔXS(y), ΔYS(y)−x*dΔYS(y)/dx) eq. 3g)
where the lens aberration contribution, (ΔxL, ΔyL)♦(x), is given by:
(ΔxL, ΔyL)♦(x)=INT{dys*w(y−ys)*(ΔXsl, ΔYsl)♦(x,y−ys)}/INT{dys*w(y−ys)} eq. 3h)
and the scanning dynamics contribution, (ΔXS(y), ΔYS(y)−x*dΔYS(y)/dx), is given by:
(ΔXS(y), ΔYS(y)−x*dΔYS(y)/dx)=INT{dys*w(y−ys)*(ΔX(ys)+θs(ys)*(y−ys), ΔY(ys)−θs(ys)*x)}/INT{dys*w(y−ys)} eq. 3i)
Identifying separate components in Equations 3h and 3i gives individual expressions for the various components of overlay error. Thus, the dynamic slip in the x and y directions due to synchronization error is given by:
ΔXS(y)=dynamic slip in the x direction=INT{dys*w(ys)*ΔX(y−ys)}/INT{dys*w(ys)} eq. 3j)
ΔYS(y)=dynamic slip in the y direction=INT{dys*w(ys)*ΔY(y−ys)}/INT {dys*w(ys)} eq. 3k)
the dynamic yaw or rotational error due to synchronization error is given by;
dΔYS(y)/dx=dynamic yaw=INT{dys*w(ys)*θs(ys))}/INT {dys*w(ys)} eq. 31)
The influence of the dynamic lens distortions on the intra-field error, (ΔxL, ΔyL), is given by;
ΔxL(y)=dynamic lens distortion in the x direction=INT{dys*w(ys)*ΔXsl(y−ys)}/INT{dys*w(ys)} eq. 3m)
ΔyL(y)=dynamic lens distortion in the y direction=INT{dys*w(ys)*ΔYsl(y−ys)}/INT{dys*w(ys)} eq. 3n)
The interpretation of the structure of the intra-field distortion, (ΔXF, ΔYF), can be explained with reference to Equation 3g. In Equation 3g the intra-field distortion is divided into a contribution by the dynamic lens distortion, (ΔxL, ΔyL), that depends only on the cross scan coordinate, x, and is independent of the position along the scanning direction, y. From Equations 3m and 3n, the dynamic lens distortion is a weighted average of the static lens distortion where the weighting factor, w(y), depends on the intensity distribution in the scan direction, y, possibly the photoresist process, and the scanning direction. Because the dynamic lens distortion contains none of the effects of scanning synchronization errors and only effects that are highly repeatable, the dynamic lens distortion will not vary from scan to scan. Thus, the contribution of dynamic lens distortion to the intra-field distortion can be some arbitrary set of vector displacements along a single scan row but will be the same for all rows in the scan as shown in
The other contributor to intra-field distortion in Equation 3g is the dynamic slip and yaw errors, ΔXS(y), ΔYS(y), dΔYS(y)/dx, which depend only on the position along the scanning direction, y, and are independent of the cross scan coordinate, x. From Equations 3j, 3k, 3l the dynamic slip and yaw are convolutions of the weighting factor w(y) with the instantaneous translational and yaw offsets. Because dynamic slip and yaw contain nothing but the effects of scanner synchronization error, they will contain both repeatable parts that do not vary from scan to scan and non-repeatable parts that vary from scan to scan. Referring to
Thus, in the presence of both lens distortion and scanner synchronization error the total overlay distortion error, [δX(x,y), δY(x,y)] can be expressed in the following form;
δX(x,y)=ΔXS(y)+ΔxL(x), eq. 12)
δY(x,y)=ΔYS(y)+ΔyL(x)−x*dΔYS(y)/dx eq. 13)
For example, in acid catalyzed photoresists such as those used for KrF or 248 nm lithography, the weighting function will typically be directly proportional to the intensity of light, I(y), across the slot since the latent acid image does not saturate until at very high exposure doses. However, in typical I-line photoresists the latent image saturates at normal exposure doses. This means that at a given location on the photoresist, the exposing light that first impinges consumes a larger portion of the photoactive material than an equal amount of exposing light impinging at a later time. Thus the w(y) will not be proportional to I(y) any longer. Because of this saturation effect, the weighting function will depend not only on the photoresist exposure dose used but also on the scanning direction (positive y or negative y).
A method for determining the overlay error associated with lens distortion to within a translation, rotation, and x-scale factor in the presence of scanner synchronization error is described See
Following the first exposure the wafer is shifted or sheared (−p″−dp) in the x direction and a second exposure (X-shear exposure) of the reticle is performed.
The number of rows of alignment attributes exposed during the second or X-shear exposure is typically half of the number of rows exposed during the first exposure.
The final or third exposure sequence (R-shear exposure) consists of rotating the wafer 180-degrees, possibly using wafer alignment marks that have been rotated by 180 degrees, as illustrated in
The wafer is then developed. Finally, an overlay metrology tool is used to determine the positional offset error for each overlapping overlay target or alignment attribute. A software algorithm is then used to calculate the lens distortion overlay components independent from the effects of the scanning dynamics the result being a table, such as illustrated in
The mathematical operation for extraction of the distortion components is now described. As noted, overlay error manifests itself as translational offset of the nominal alignment attributes as shown in
Equations 12 and 13 above show that the overall overlay distortion error (for each alignment attribute) in the presence of scanner synchronization error and lens distortion is the sum of two vector parts:
δX(xfn,y)=ΔXS(yfn)+ΔxL(xfn), eq. 13a)
δY(xfn,yfn)=ΔYS(yfn)+ΔyL(xfn)−ΔYR(xfn,yfn) eq. 13b)
Where (xfn, yfn) replace (x,y) as the nominal field position of each individual alignment attribute, See
The equations for the locations of the 2*(Mx×2) overlay target boxes following the complete exposure and development sequence are now expressed. The field indices for the alignment attributes are shown in detail in
The positions of the (Mx×2) small outer boxes associated with the first exposure sequence (See small box 2804 of
Row 1 position, 1st exposure=[T1x−θ1*yfn+ΔxL(xfn)+ΔXS(yfn)], [T1y+θ1*xfn+ΔyL(xfn)+ΔYS(yfn)+xfn*θavg(yfn)] eq. 14)
Row 2 position, 1st exposure=[T1x−θ1*yfn′+ΔxL(xfn)+ΔXS(yfn′)], [T1y+θ1*xfn+ΔyL(xfn)+ΔYS(yfn′)+xfn*θavg(yfn′)] eq. 15)
Where T1x and T1y are unknown field translations and θ1 is an unknown field rotation. Note: the single prime symbol “′” highlights the fact that the scanning error in row 2 is different from row 1.
The positions of the (Mx×1) large inner boxes associated with the second X-shear exposure sequence, illustrated in
Row 2 position, 2nd or X-shifted exposure=[T2x−θ2*yfn′+ΔxL(xfn−Δ)+ΔXS2(yfn′)], [T2y+θ2*xfn+ΔyL(xfn−Δ)+ΔYS2(yfn′)+xfn*θavg2(yfn′)] eq. 16)
Where T2x and T2y are unknown field translations, θ2 an unknown rotation, Δ=(−p″), (See
The positions of the (Mx×1) large inner boxes associated with the third R-shear exposure sequence, illustrated in
Row 1 position, 3rd or 180 degree rotated exposure=[T3x−θ3*yfn−ΔxL(−xfn)+ΔXS3(yfn)], [T3y+θ3*xfn−ΔyL(−xfn)+ΔYS3(yfn)+xfn*θavg3(yfn)] eq. 17)
Where T3x and T3y are unknown field translations, θ3 an unknown rotation, and the dynamic scan induced error terms (ΔXS3, ΔYS3, θavg3) are distinctly different from those of the 1st and 2nd exposures and this is denoted by their suffix, 3.
Finally, the measured offsets for the X-shear exposure is just the difference of Equations 16 and 14 or:
BBX(a,2,X)=[(T2x−T1x+ΔXS2(yfn′)−ΔXS(yfn′))−(θ2−θ1)*yfn′+ΔxL(xfn−Δ)−ΔxL(xfn)] eq. 18)
BBY(a,2,X)=[(T2y−T1y+ΔYS2(yfn′)−ΔYS(yfn′))+(θ2−θ1+θavg2(yfn′)−θavg(yfn′))*xfn+ΔyL(xfn−Δ)−ΔyL(xfn)] eq. 19)
Where we use BBX(a,2,X) and BBY(a,2,X) to denote the X-shear overlay error for the overlapping alignment attributes (Box-in-Box structures) located at (a,b=2) or row 2 of
The measured offsets for the R-shear exposures (the difference between the large boxes in row 1 from the R-shear exposure and the small boxes in row 1 from the first exposure)=Equation 17−Equation 15 or;
BBX(a, 1,R)=[(T3x−T1x+ΔXS3(yfn)−ΔXS(yfn))−(θ3−θ1)*yfn−ΔxL(−xfn)−ΔxL(xfn)]; eq. 20)
BBy(a,1,R)=[(T3y−T1y+ΔYS3(yfn)−ΔYS(yfn))+(θ3−θ1+θavg3(yfn)−θavg(yfn))*xfn−ΔyL(−xfn)−ΔyL(xfn)] eq. 21)
Where we use BBx(a,1,R) and BBy(a,1,R) to denote the R-shear overlay error for the overlapping alignment attributes (Box-in-Box structures) located at (a,b=1). See
Equations 18–21 are typically solved using the singular value decomposition to produce the minimum length solution. See Numerical recipes, The Art of Scientific Computing, supra. They are typically over-determined in the sense of equation counting (there are more equations than unknowns) but are still singular in the mathematical sense; there is an ambiguity in the solution of these equations. The unknowns in Equations 18–21 are the intra-field distortion map ΔxL(xfn), ΔyL(xfn), all of the scanner dynamic and yaw errors (ΔXS(yfn),ΔYS(yfn),θavg(yfn)). (ΔXS2(yfn′),ΔYS2(yfn′),θavg2(yfn′))), etc., and the field translations and rotations (T1x,T1y,θ1 . . . T3x,T3y,θ3). It can be mathematically shown that we can solve for the distortion map (ΔxL(xfn),ΔyL(xfn)) uniquely to within a translation, rotation, and x-scale factor.
From the X-shear overlay measurements alone, we can determine the lens distortion, ΔxL(xfn), ΔyL(xfn) to within:
ΔxL(xfn)=A+B*xfn eq. 22)
ΔyL(xfn)=C+D*xfn+E*xfn2 eq. 22a)
where A, B, C, D, and E are unknown constants.
This follows from setting up the linear equations for each overlapping alignment attribute and solving an over-determined system of equations as noted above. By including the R-shear overlay measurements we eliminate some noise in the calculations (by including more data) and in addition E is determined. Hence by combining the X-shear and R-shear measurements we can determine the lens distortion to within:
ΔxL(xfn)=A+B*xfn eq. 23)
ΔyL(xfn)=C+D*xfn eq. 23a)
Interpretation of the Unknown Constants
(A,C)=(x,y), the intra-field translation contribution due to the scanner projection lens. Because there is also a translational scanning error contribution it can be included with this unknown translational constant into the unknown scanning error (ΔXS(yfn),ΔYS(yfn)) which is disregarded for the purposes of this analysis. In addition, the wafer stage can also be the source of this error.
B=x−intra-field scale or magnification factor. This must be determined using other techniques, it remains unknown for the purposes of the present invention.
D=intra-field rotation. Since the Yaw term (ΔYR(xfn,yfn)=xfn*[dΔYS(yfn)/dx]=xfn*[θavg(yfn)]) also has a xfn term we can absorb this factor into the scanning yaw term. In addition, the wafer stage can also induce intra-field rotation errors.
Therefore, using the method of this embodiment we can uniquely determine the lens distortion components in the presence of scanning synchronization error within a translation, rotation and x-scale factor. The translation, rotation and x-scale must be determined otherwise. Having accomplished the last step in the process of this embodiment the final results of the intra-field lens distortion in the presence of scanner synchronization error can be recorded in tabular form as illustrated in
Embodiment for Determining Reticle Stage Grid and Yaw Error
In a step and scan system (see, for example, J. Bruning, “Optical Lithography—Thirty years and three orders of magnitude”, SPIE, Vol. 3051, pp. 14–27, 1997), at each printed exposure field, the wafer stage and reticle stage simultaneously and precisely move in coordination over a fixed rectangular field of view (slot S in
In one embodiment a reticle stage portion of the synchronization error, such as grid and yaw error, of a projection imaging tool may be determined using self-referenced techniques. These techniques are independent of static lens distortion and wafer stage positioning errors. To determine the error, an overlay reticle containing an array of overlay groups is provided. Next, a photoresist coated wafer is inserted into the projection lithography tool under examination and the wafer is stepped to a desired position. Using only the reticle stage, the overlay reticle is then successively shifted and exposed in a one-dimensional interlocking pattern creating columns of printed, completed alignment attributes. The completed alignment attributes may then be measured on an overlay tool. The resulting overlay measurements may then be fed into a computer program and reconstruction of the reticle stage portion of the synchronization error, such as grid and yaw, to within a translation and rotation determined.
Except for the initial wafer positioning, the fact that we are using the reticle stage only for the exposure sequence is what allows us to uniquely separate and extract the contribution of the reticle stage to distortion. What we are in particular measuring is imperfections in the reticle stage mirror and interferometer subsystem.
In block 3804 of
YS(IY)=−YR(IY)+(IY−1)*G′ eq. 24)
and doing a static exposure. What results is an NX×(NY−1) array of printed completed alignment attributes “PCAA.”
An example of exposing a wafer includes using blades, or other devices, to cover the reticle that includes a first set of attributes and a second set of attributes that are complementary. The blades are positioned such that only a single row of complementary paired attributes, comprising a row of alignment attributes and a row of complementary attributes, is exposed. The reticle stage is then shifted in a desired direction, such as in the scan direction. The blades covering the reticle are then adjusted so that the next row of complementary paired attributes, comprising a row of alignment attributes and a row of complementary attributes, is exposed. The second exposure of alignment attributes align and interlock with the first exposure of alignment attributes to form printed completed alignment attributes. The shifting, adjusting, and exposing can be performed a desired number of times.
When done, the wafer is taken off the wafer stage and developed.
After the series of exposures are completed, the NX×(NY−1) array of printed completed alignment attributes, PCAA, are measured (Block 3806 in
(BBX, BBY)(IYi, IYo;IX)=overlay measurement corresponding to inner box from row, column=(IYi, IX) of reticle and outer box from row, column=(IYo, IX) of reticle R. (See
Using the overlay measurements a reticle stage distortion is reconstructed (Block 3808 of
(BBX, BBY)(IYi, IYo;IX)=(dXi, dYi)(IYi,IX)−(dXo, dYo)(IYo,IX) eq. 25)
where:
(dXi,dYi)(IX,IY)=total displacement of inner box from row IY, column IX=(dXWi,dYWi)(IX,IY)+(dXLi,dYLi)(IX,IY)+(dXRSi,dYRSi)(IX,IY)
and similarly for the outer box displacement (dXo, dYo).
dXWi, dYWi is the wafer stage displacement contribution to the inner box and it is given by:
(dXWi, dYWi)(IX,IY)=wafer stage displacement=(TxWS−QWS*XR(IX)/M, TyWS+QWS*(YR(IY)+G9+YS(IY)/M)=(TxWS−QWS*XR(LX)/M, TyWS+QWS*IY*G9/M) eq. 26)
Similarly, the wafer stage contribution to the outer box position is given by:
(dXWo, dYWo)(IX,IY)=(TxWS−QWS*XR(IX)/M, TyWS+QWS*(IY−1)*G9/M) eq. 27)
Combining Equations 25 and 26 and using the fact that WYo=WYi+1, the total wafer stage contribution to Equation 25 is eliminated. This is what is expected because the wafer stage is not moved during the exposures and therefore, it should not influence overlay measurements.
Next, the lens contribution is simply a function of the position within the static lens field (dxSL,dySL)(X,Y). So we get:
and the contribution of static lens aberrations vanishes. This is intuitively clear since we are shooting the AA and AA′ through exactly the same part of the lens.
Contribution of reticle stage grid and yaw is:
where;
Taking Equations 30 and 31, we can write the resulting overlay measurements in terms of (TXRS, TYRS, QRS) as:
Equation 32 can be solved by singular value decomposition (see, for example, W. Press et al., “Numerical Recipes, The Art of Scientific Computing”, Cambridge University Press, pp. 52–64, 1990). There is a three-fold ambiguity in the solution of Equation 9, namely we can determine the reticle stage grid and yaw errors to within a net translation and rotation. Put differently, if (TXRS, TYRS, QRS) (IY) solves Equation 32 then so does (TXRS, TYRS, QRS) (IY)+(A, B, C) where A, B, C are constants independent of IY. This last statement is strictly true if we neglect the G′/M term in Equation 32. This term is a small correlation that in principle (with zero noise measurements) could determine the rotation but in practice would result in a low quality result. Hence, we regard this mode as indeterminate. So, if we have a particular solution to Equation 32, (TXRS9, TYRS9, QRS9) (IY), we get a unique solution by removing the average translation and rotation, e.g.,
TXRS(IY)=TXRS′ (IY)−AVG (TXRS′) eq. 33)
and similarly for TYRS QRS.
Alternative Embodiments for Determining Reticle Stage Grid and Yaw Error
In another embodiment, exposing a wafer includes using blades, or other devices, to cover the reticle such that only a single row of complementary paired attributes, comprising a row of alignment attributes and a row of complementary attributes, is exposed. The reticle stage is then shifted in a desired direction, such as in the scan direction. The blades covering the reticle are then adjusted so that a non-successive row of complementary paired attributes, comprising a row of alignment attributes and a row of complementary attributes, is exposed. That is, the non-successive row is not the next row, but some other row of complementary paired attributes on the reticle. The second exposure of alignment attributes align and interlock with the first exposure of alignment attributes to form printed completed alignment attributes. The shifting, adjusting, and exposing can be performed a desired number of times.
In yet another embodiment, a single row, say Row 1, could be exposed, the reticle then shifted and Row 2 exposed over the exposure of Row 1 (with a reticle stage move only). Then, step (with the wafer stage) to another field, expose Row 1 and then Row 3 on top of it. Repeating until all rows of interest are exposed, the box-in-box measurements then give, directly, the difference between Row IY and Row 1 in TXR, TYR, QR. Calling the measured difference between Row 1 and itself zero, we can then remove the average translation and rotation from the collection TXR, TYR, QR (vide supra) to arrive at our reconstructed results.
In still another embodiment, a reduced transmission reticle can be used (see, for example, A. Smith et al., “Method and Apparatus for Self-Referenced Wafer Stage Positional Error Mapping”, U.S. Pat. No. 6,734,971, issued May 11, 2004) for overlay reticle R and the reticle stage motions repeated on a single field to get only the repeatable part of (TXR, TYR, QR). Also, sub-E0 exposures as described in U.S. Pat. No. 6,734,971, supra could be used.
In yet another embodiment, the minimum height we can adjust the exposure slot height (SH in
To summarize, the reticle stage portion of the synchronization error, such as grid and yaw error, of a projection imaging tool may be determined using self-referenced techniques. These techniques may be independent of static lens distortion and wafer stage positioning errors. An overlay reticle including an array of overlay groups is provided. Next, a photoresist coated wafer is inserted into the projection lithography tool under examination and the wafer stepped to a specified position. Using only the reticle stage, the overlay reticle is then successively shifted and exposed in a one-dimensional interlocking pattern creating columns of printed, completed alignment attributes. The completed alignment attributes are then measured on an overlay tool. The resulting overlay measurements are then used to reconstruct the reticle stage portion of the synchronization error of the projection imaging tool. For example, the overlay measurements could be used to reconstruct the reticle stage grid and yaw error to within a translation and rotation.
The reconstruction steps outlined herein can be incorporated into a computer program whose general outline is
XR=X-position on reticle of inner and outer box
YRi, YRo=Y-position on reticle of inner, outer box
DXRi, DYRi=X,Y reticle fabrication error for inner box
DXRo, DYRo=X,Y reticle fabrication error for outer box
I=consecutive index for each data line.
Next, Block 4902 of
BBX(I)→BBX(I)−(DXRi(I)−DXRo(I))/M eq. 34)
BBY(I)→BBY(I)−(DYRi(I)−DYRo(I))/M eq. 35)
The 2*ND length input vector (Block 4903) consists of the reticle corrected box-in-box measurements:
V(1:2*ND)=(BBX(1), BBY(1), BBX(2), BBY(2), . . . BBX(ND), BBY(ND)) eq. 36)
Design matrix D (ir, ic) consists of ir=1:2*ND rows and ic=1:3*NY columns. Writing D with a column ordering of:
W=TXRS(1) TYRS(1) QRS(1) TXRS(2) . . . QRS(NY) eq. 36.1)
We can look to Equation 32 to read off our matrix elements for D. Thus, in row
ir=2*[IYi+(IX−1)(NY−1)]−1(IYi=1:NY−1, IX=1:NX) eq. 37
the only non-zero matrix elements are in columns:
ic1=1+3*(IYi−1) eq. 38)
ic2=4+3*(IYi−1) eq. 39)
ic3=3+3*(IYi−1) eq. 40)
and have values:
D(ir, ic1)=1 eq. 41)
D(ir, ic2)=−1 eq. 42)
D(ir, ic3)=−G′/M eq. 43)
In row:
ir=2*[IYi+(IX−1)(NY−1)](IY=1:NY−1, IX=1:NX) eq. 44)
the only non-zero matrix elements are in columns ic1, ic2, ic3 (supra) and
ic4=6+3*(IYi−1) eq. 45)
with values:
Having formed the input vector (Equation 36) and design matrix (Equations 37–49) we move from Block 4903 to 4904 and solve for the unknowns (Equation 36.1). The preferred technique is the singular value decomposition (supra). The public domain Fortran 77 LAPACK driver routine SGESVD (Reference 1000) can be used to carry out decomposition of design matrix D into the form:
D=UΣRT eq. 50)
Where U is a 2*ND×2*ND orthogonal matrix, Σ is a diagonal 2*ND×3*NY matrix and R is a 3*NY×3*NY orthogonal matrix. All three of these matrices are produced by routine SGESVD. The diagonal elements (singular values) of Σ are σ1, σ2, . . . σ3*NY-3 σ3*NY-2, σ3*NY-1, σ3*NY and are sorted in descending order. From the previous discussion, the last three singular values will be zero or negligibly small compared to the others. Solving the problem at hand:
V=DW eq. 51)
we get:
W=R Σ−1 UTV eq. 52)
where:
T denotes matrix transposition and
So at this point we have a solution, W which gives us the components of reticle stage translation and yaw error (Equation 36.1).
Moving now to Block 4905 we remove the average values of translation and yaw from the completed solution.
And similarly for TYRS (I) and QRS (I).
The final step (Block 4906) is to output a horizontal tab delimited file (
The improvement to this process provided by the results of this invention involves taking the as determined reticle stage translation and yaw (Block 4701) and feeding it to the reticle stage offset input subfunction (Block 4702) which then determines the specific signal biases (analog or digital) needed by the reticle stage controller/amplifier (Block 4503) to alter the path of reticle stage RS so that in the present corrected state subsequent measurement of reticle stage translation and yaw by the method of this invention would give a substantially null result. This process improvement would manifest itself in improved overlay of features on product reticle PR (contact holes in
Reticle Plate:
A portion of the reticle plate for an embodiment is shown in
In another embodiment, instead of the reticle illustrated in
The reticles are typically made of glass with openings defined in a chrome coating. This is common for projection lithography tools utilized in semiconductor manufacture. The form the reticle can take will be determined by the format required by the specific projection lithography tool on which the reticle is loaded.
Overlay metrology tools utilized are typically conventional optical overlay tools such as those manufactured by KLA-Tencor (See KLA 5105 Overlay Brochure, KLA-Tencor; KLA 5200 Overlay Brochure, KLA-Tencor) or Bio-Rad Semiconductor Systems. See Quaestor Q7 Brochure, Bio-Rad Semiconductor Systems. Other optical overlay tools that can be used as well, include those described in Process for Measuring Overlay Misregistration During Semiconductor Wafer Fabrication, I. Mazor et al., U.S. Pat. NO. 5,438,413, Aug. 1, 1995. In addition, some steppers or scanners (See Matching Management of Multiple Wafer Steppers Using a Stable Standard and a Matching Simulator, supra) can utilize their wafer alignment systems and wafer stages to function as overlay tools. However, the total size of the alignment attribute would be limited (consisting of 2 wafer alignment marks) to a distance over which the wafer stage would be as accurate as a conventional optical overlay tool. This distance is typically less than about 0.5 mm.
When electrical alignment attributes are used for overlay (See Matching Management of Multiple Wafer Steppers Using a Stable Standard and a Matching Simulator, supra; Automated Electrical Measurements of Registration Errors in Step and Repeat Optical Lithography Systems, supra; Capacitor Circuit Structure for Determining Overlay Error, supra), the overlay metrology tool utilized would correspond to the electrical equipment utilized for making the corresponding measurement.
The embodiments described above have been mainly described with respect to their application on projection imaging tools (scanners See Micrascan™ III Performance of a Third Generation, Catadioptric Step and Scan Lithographic Tool, D. Cote et al., SPIE Vol. 3051, 806:816, 1997; ArF Step and Scan Exposure System for 0.15 Micron and 0.13 Micron Technology Node; J. Mulkens et al., SPIE Conference on Optical Microlithography XII, 506:521, March 1999; 0.7 NA DUV Step and Scan System for 150 nm Imaging with Improved Overlay, J. V. Schoot, SPIE Vol. 3679, 448:463, 1999) commonly used in semiconductor manufacturing. The techniques and methods can be applied to other scanning projection tools such as; 2-dimensional scanners (See Large-area, High-Throughput, High-Resolution Projection Imaging System, K. Jain, U.S. Pat. No. 5,285,236, Feb. 8, 1994; Optical Lithography—Thirty Years and Three Orders of Magnitude, supra), office copy machines, and next generation lithography (ngl) systems such as XUV (See Development of XUV Projection Lithography at 60–80 nm, supra), SCALPEL, EUV (Extreme Ultra Violet) (See Reduction Imaging at 14 nm Using Multiplayer-Coated Optics: Printing of Features Smaller than 0.1 Micron, supra), IPL (Ion Projection Lithography), and EPL (electron projection lithography) See Mix-and-Match: A Necessary Choice, supra.
The techniques have been described with respect to the recording medium being positive photoresist. The techniques would work equally well with negative photoresist, providing appropriate adjustment to the box in box structures on the reticle are made. In general, the recording medium can be any recording media that is used on the lithographic projection tool being measured. For example, on an EPL tool, an electron beam photoresist such as PMMA could be utilized as the recording medium.
In the embodiments above, the substrates on which the recording media is placed were described as wafers. This will be the case in semiconductor manufacture. The techniques described will work on other forms of substrate, with the exact form of the substrate dictated by the projection lithography tool and it's use in a specific manufacturing environment. For example, in a flat panel manufacturing facility, the substrate on which the photoresist would be placed would be a glass plate or panel. A mask making tool would utilize a reticle as a substrate. Circuit boards or multi-chip module carriers are other possible substrates.
The present invention has been mainly described with respect to it's application on the projection imaging tools (scanners (See Micrascan™ III Performance of a Third Generation, Catadioptric Step and Scan Lithographic Tool, D. Cote et al., SPIE Vol. 3051, 806:816, 1997; ArF Step and Scan Exposure System for 0.15 Micron and 0.13 Micron Technology Node, J. Mulkens et al., SPIE Conference on Optical Microlithography XII, 506:521, March 1999; 0.7 NA DUV Step and Scan System for 150 nm Imaging with Improved Overlay, J. V. Schoot, SPIE Vol. 3679, 448:463, 1999) commonly used in semiconductor manufacturing today. The methods of the present invention can be applied to other scanning projection tools such as; 2-dimensional scanners (See Large-Area, High-Throughput, High Resolution Projection Imaging System, Jain, U.S. Pat. No. 5,285,236, Feb. 8, 1994; Optical Lithography—Thirty Years and Three Orders of Magnitude, supra), office copy machines, and next generation lithography (ngl) systems such as XUV (See Development of XUV Projection Lithography at 60–80 nm, B. Newnam et al., SPIE Vol. 1671, 419:436, 1992), SCALPEL, EUV (Extreme Ultra Violet) (See Reduction Imaging at 14 nm Using Multilayer-Coated Optics: Printing of Features Smaller than 0.1 Micron, J. Bjorkholm et al., Journal Vacuum Science and Technology, B 8(6), 1509:1513, November/December 1990), IPL (Ion Projection Lithography), and EPL (electron projection lithography). See Mix-and Match: A Necessary Choice, supra.
The present invention has been mainly described with respect to the recording medium being positive photoresist. The present invention could equally well have used negative photoresist providing we make appropriate adjustment to the overlay groups on the reticle. In general, the recording medium is whatever is typically used on the lithographic projection tool we are measuring. Thus, on an EPL tool, an electron beam photoresist such as PMMA could be utilized as the recording medium.
So far, we have described the substrates on which the recording media is placed as wafers. This will be the case in semiconductor manufacture. The exact form of the substrate will be dictated by the projection lithography tool and it's use in a specific manufacturing environment. Thus, in a flat panel manufacturing facility, the substrate on which the photoresist would be placed would be a glass plate or panel. A mask making tool would utilize a reticle as a substrate. Circuit boards or multi-chip module carriers are other possible substrates.
The foregoing description details certain embodiments of the invention. It will be appreciated, however, that no matter how detailed the foregoing appears, the invention may be embodied in other specific forms without departing from its spirit or essential characteristics. The described embodiments are to be considered in all respects only as illustrative and not restrictive and the scope of the invention is, therefore, indicated by the appended claims rather than by the foregoing description. All changes, which come with the meaning and range of equivalency of the claims, are to be embraced within their scope.
This application is a continuation-in-part of U.S. patent application Ser. No. 10/869,270 filed Jun. 15, 2004 entitled “Method for Self-Referenced Dynamic Step and Scan Intra-Field Lens Distortion” which is now U.S. Pat. No. 6,975,382, by Adlai Smith, which is a continuation of U.S. patent application Ser. No. 10/252,020 filed Sep. 20, 2002, now U.S. Pat. No. 6,906,780 issued Jun. 14, 2005, entitled “Method for Self-Referenced Dynamic Step and Scan Intra-Field Lens Distortion” by Adlai Smith, which claims the benefit of priority to U.S. Provisional Patent Application Ser. No. 60/323,571 filed Sep. 20, 2001, entitled “Method for Self-Referenced Dynamic Step and Scan Intra-Field Lens Distortion”, by Adlai Smith. Priority of the filing date of these applications is hereby claimed, and the disclosures of the Patent Applications are hereby incorporated by reference.
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Child | 10869270 | US |
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Parent | 10869270 | Jun 2004 | US |
Child | 11289112 | US |