Graphics Reference
In-Depth Information
36. B.B. Choudhuri and N. Sarkar. Texture segmentation using fractal dimension.
IEEE Trans. Pattern Anal. Machine Intell.
, 17:72-77, 1995.
37. C.K. Chui.
An Introduction to Wavelets
. Academic Press, Inc., San Diego,
CA:, 1992.
38. R. Cipolla and A. Blake. The dynamic analysis of apparent contours. In
Proc.
3rd Int. Conf. on Computer Vision
, pages 616-623, 1990.
39. R. Cipolla and A. Blake. Surface orientation and time to contact from image
divergence and deformation. In
proc. 2nd European Conference on Computer
Vision-ECCV'92
, volume 588 of
Lecture Notes in Computer Science
, pages
187-202, Santa Margherita Ligure, Italy, 1992. Springer.
40. A. Cohen, I. Daubechies, and J.C. Feauveau. Biorthogonal bases of compactly
supported wavelets.
Commun. Pure Appl. Math.
, 45:485-560, 1992.
41. E. Cohen, T. Lyche, and R. Risenfeld. Discrete B-splines and subdivision tech-
niques in computer-aided geometric design and computer graphics.
Computer
Vision, Graphics and Image Processing
, 14:87-111, 1980.
42. E. Cohen and R.F. Risenfeld. General matrix representations for Bezier and
B-spline curves.
Comp. in Indus.
, 3:9-15, 1982.
43. L. Cohen. On active contour models and balloons.
Computer Vision, Graphics
and Image Processing: Image Understanding
, 53(2):211-218.
44. L.D. Cohen and I. Cohen. Finite-element methods for active contour models
and balloons for 2-D and 3-D images.
IEEE Trans. Pattern Anal. Machine
Intell.
, 15(11):1131-1147, 1993.
45. A.J. Cole. Compaction technique for raster scan graphics using space filling
curves.
Computer Journal
, 30:87-92, 1987.
46. M.G. Cox. The numerical evaluation with B-splines.
National Physical Labo-
ratory DNAC 4
, 1971.
47. M.G. Cox. The numerical evaluation of b-splines.
J. Inst. Math. Appl.
, 10:134-
149, 1972.
48. I. Daubechies. Orthonormal bases of compactly supported wavelets.
Commun.
Pure Appl. Math.
, XII:909-996, 1988.
49. I. Daubechies.
Ten Lectures on Wavelets
. SIAM, Philadelphia, PA, 1992.
50. I. Daubechies, A. Grossman, and Y. Mayer. Painless nonorthogonal expansions.
J. Math. Phys.
, 27:1271-1283, 1986.
51. C.A. Davatzikos and J.L. Prince. An active contour model for mapping the
cortex.
IEEE Trans. Medical Imaging
, 14(1):65-80.
52. G. Davis. A wavelet-based analysis of fractals image compression.
IEEE Trans.
Image Processing
, 7:141-154, 1998.
53. C. deBoor. On calculating with B-splines.
J. Approximation Theory
, 6:7-49,
1972.
54. C. deBoor. On calculation with B-splines.
J. Approx. Theory
, 6:50-62, 1972.
55. C. deBoor. Spline as linear combination of B-splines: a survey. In G.G. Lorenz,
C.K. Chui, and L.L. Schumaker, editors,
Approximation Theory
.Academic
Press, New York, 1976.
56. C. deBoor and G. Fix. Spline approximation by quasi-interpolants.
J. Approx-
imation Theory
, 7:19-45, 1973.
57. C. deBoor and A. Pinkus. Backward error analysis for totally positive linear
systems.
Numer. Math.
, 27:485-490, 1977.
58. F. Deravi and S.K. Pal. Graylevel thresholding using second-order statistics.
Pattern Recog. Lett.
, 1:417-422, 1983.
Search WWH ::
Custom Search