Yoel Shkolnisky

Department of Mathematics

Yale University

Email: yoel.shkolnisky@yale.edu

 You can find here the following:

·         My contact info

·         List of journal papers, technical reports, and conference proceedings

·         Link to my PhD Thesis

 

Contact Info

Email:

yoel.shkolnisky@yale.edu

Office

(203) 432 1231

Fax

(203) 432 7316

Address:

Department of Mathematics
10 Hillhouse Avenue PO Box 28283
Yale University
New Haven, CT  06520-8283

 

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Journal papers

[1] A. Averbuch and Y. Shkolnisky. 3D Fourier based discrete Radon transform. Applied and Computational Harmonic Analysis, 15(1):33–69, 2003. PDF

[2] A. Averbuch and Y. Shkolnisky. 3D discrete X-ray transform. Applied and Computational Harmonic Analysis, 17(3):259–276, 2004. PDF

[3] Y. Keller, Y. Shkolnisky, and A. Averbuch. The angular difference function and its application to image registration. IEEE Transactions on Pattern Analysis and Machine Intelligence, 27(6):969–976, 2005.PDF

[4] Y. Keller and Y. Shkolnisky. A signal processing approach to symmetry detection. IEEE Transactions on Image Processing, 15(8):2198–2207, 2006. PDF

[5] Y. Keller, Y. Shkolnisky, and A. Averbuch. Volume registration using the 3-D pseudo-polar Fourier transform. IEEE Transactions on Signal Processing, 54(11):4323–4331, 2006.  PDF

[6] Y. Shkolnisky, M. Tygert, and V. Rokhlin. Approximation of bandlimited functions. Applied and Computational Harmonic Analysis, 21(3):413–420, November 2006.  PDF

[7] Y. Shkolnisky. Prolate spheroidal wave functions on a disc - Integration and approximation of two-dimensional bandlimited functions. Applied and Computational Harmonic Analysis, 22(2):235–256, March 2007. PDF

[8] A. Averbuch, R. R. Coifman, D. L. Donoho, M. Israeli, and Y. Shkolnisky. A framework for discrete integral transformations I – the pseudo-polar Fourier transform. To appear in SIAM Journal on Scientific Computing (SISC). PDF

[9] A. Averbuch, R.R. Coifman, D. L. Donoho, M. Israeli, Y. Shkolnisky and I. Sedelnikov. A framework for discrete integral transformations II – the 2D discrete Radon transform. To appear in SIAM Journal on Scientific Computing (SISC). PDF

[10] R. R. Coifman, Y. Shkolnisky, F. J. Sigworth, and A. Singer. Graph Laplacian tomography from unknown random projections. Accepted to IEEE Transactions on Image Processing. PDF

 

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Technical Reports

[1] R. R. Coifman, Y. Shkolnisky, F. J. Sigworth, and A. Singer. Cryo-EM Structure Determination through Eigenvectors of Sparse Matrices. Technical Report 1389, Yale University, Department of Computer Science, November 2007. PDF

 

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Conferences Proceedings

 

[1] A. Averbuch and Y. Shkolnisky. Multidimensional discrete Radon transform. Wavelets and their Applications (M. Krishna, R. Radha, and S. Thangavelu editors), Allied Publishers Private Limited, 2003, pp. 63–88.

[2] Y. Keller and Y. Shkolnisky. An algebraic approach to symmetry detection, Proceedings of the 17th International Conference on Pattern Recognition (ICPR2004), volume 3, pages 186–189, August 2004.

[3] Y. Keller, A. Averbuch, and Y. Shkolnisky. Algebraically Accurate Volume Registration using Euler’s Theorem and the 3-D Pseudo-polar FFT, IEEE Computer Society Conference on Computer Vision and Pattern Recognition (CVPR 2005), volume 2, pages 795–800, June 2005.

[4] Y. Keller, Y. Shkolnisky, and A. Averbuch. A non-Cartesian FFT approach to image alignment, Proceedings of the IEEE International Conference on Image Processing (ICIP2005), volume 3pages 50-53, September 2005.

[5] Y. Keller, Y. Shkolnisky, and A. Averbuch. Accurate Multi-Dimensional Alignment, Proceedings of the IEEE International Conference on Image Processing (ICIP2005), volume 3pages 1052-1055, September 2005.

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PhD Thesis

Here you can find a link to my PhD thesis

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Last modified 07/17/2008