Result 1 to 20 of 28 total
Invariant histograms. (English)
Am. Math. Mon. 119, No. 1, 4-24 (2012).
1
Invariant submanifold flows. (English)
J. Phys. A, Math. Theor. 41, No. 34, Article ID 344017, 22 p. (2008).
2
Numerical invariantization for morphological PDE schemes (English)
SSVM, 508-519 (2007).
3
Computer algebra and geometric algebra with applications. 6th international workshop, IWMM 2004, Shanghai, China, May 19‒21, 2004 and international workshop, GIAE 2004, Xian, China, May 24‒28, 2004. Revised selected papers. (English)
Lecture Notes in Computer Science 3519. Berlin: Springer (ISBN 3-540-26296-2/pbk). ix, 449~p. EUR~60.00/net; sFr~106.00; \sterling~46.00; \$~60.00 (2005).
4
An introduction to moving frames. (English)
Mladenov, Ivaïlo M. (ed.) et al., Proceedings of the 5th international conference on geometry, integrability and quantization, Sts. Constantine and Elena, Bulgaria, June 5‒12, 2003. Sofia: Bulgarian Academy of Sciences (ISBN 954-84952-8-7/pbk). 67-80 (2004).
5
A survey of moving frames (English)
IWMM/GIAE, 105-138 (2004).
6
Maximal entropy for reconstruction of back projection images. (English)
Olver, Peter J. (ed.) et al., Mathematical methods in computer vision. Papers presented at the IMA workshops: “Image processing and low level vision", October 16‒20, 2000, and “Image analysis and high level vision", November 13‒17, 2000, Minneapolis, MN, USA. New York, NY: Springer (ISBN 0-387-00497-1/hbk). IMA Vol. Math. Appl. 133, 57-64 (2003).
7
Moving frames. (English)
J. Symb. Comput. 36, No. 3-4, 501-512 (2003).
8
Mathematical methods in computer vision. Papers presented at the IMA workshops: “Image processing and low level vision", October 16‒20, 2000, and “Image analysis and high level vision", November 13‒17, 2000, Minneapolis, MN, USA. (English)
The IMA Volumes in Mathematics and its Applications 133. New York, NY: Springer (ISBN 0-387-00497-1/hbk). xi, 153~p. EUR~84.95; \$~79.95; \sterling~65.50; sFr~141.00 (2003).
9
Moving frames ‒ in geometry, algebra, computer vision, and numerical analysis. (English)
DeVore, Ronald A. (ed.) et al., Foundations of computational mathematics. Conference, Oxford, GB, July 18-28, 1999. Cambridge: Cambridge University Press. Lond. Math. Soc. Lect. Note Ser. 284, 267-297 (2001).
10
Geometric foundations of numerical algorithms and symmetry. (English)
Appl. Algebra Eng. Commun. Comput. 11, No.5, 417-436 (2001).
11
Symmetries of polynomials. (English)
J. Symb. Comput. 29, No.4-5, 485-514 (2000).
12
Affine invariant detection: Edge maps, anisotropic diffusion, and active contours. (English)
Acta Appl. Math. 59, No.1, 45-77 (1999).
13
Moving coframes. II: Regularization and theoretical foundations. (English)
Acta Appl. Math. 55, No.2, 127-208 (1999).
14
Differential and numerically invariant signature curves applied to object recognition. (English)
Int. J. Comput. Vis. 26, No. 2, 107-135 (1998).
15
Moving coframes. I: A practical algorithm. (English)
Acta Appl. Math. 51, No.2, 165-213 (1998).
16
A geometric snake model for segmentation of medical imagery (English)
IEEE Trans. Med. Imaging 16, No. 2, 199-209 (1997).
17
Conformal curvature flows: from phase transitions to active vision. (English)
Arch. Ration. Mech. Anal. 134, No.3, 275-301 (1996).
18
Affine invariant gradient flows. (English)
Berger, Marie-Odile (ed.) et al., ICAOS ’96. 12th international conference on analysis and optimization of systems, images, wavelets and PDE’s, Paris, France, June 26-28, 1996. Proceedings. Berlin: Springer. Lect. Notes Control Inf. Sci. 219, 194-200 (1996).
19
Affine invariant detection: edges, active contours, and segments (English)
CVPR, 520-525 (1996).
20
Result 1 to 20 of 28 total
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