论文信息 - Stochastic models for DIV-CURL optical flow methods

Stochastic models for DIV-CURL optical flow methods

We consider Suter's (see Proc. CVPR94, Seattle, p.939-948, 1994) DIV-CURL optical flow methods, wherein the problem of computing a velocity field from an image sequence is regularized using smoothness conditions based on the divergence and curl of the field. In particular, we develop stochastic formulations of DIV-CURL splines using the linear smoothing theory of Adams, Willsky, and Levy. Our models are shown to be well posed and thus can be used in both simulating and estimating velocity fields having known stochastic properties. As a special case, our stochastic model reduces to that developed by Rougee, Levy, and Willsky (1984) for the classical Horn and Schunck's (1981) optical flow.

Jerry L Prince | Sandeep N. Gupta

[1] P. Morse,et al. Methods of theoretical physics , 1955 .

[2] Berthold K. P. Horn,et al. Determining Optical Flow , 1981, Other Conferences.

[3] Berthold K. P. Horn,et al. Determining Optical Flow , 1981, Other Conferences.

[4] A. Willsky,et al. Linear estimation of boundary value stochastic processes-- Part I: The role and construction of complementary models , 1984 .

[5] A. Willsky,et al. Optic flow estimation inside a bounded domain , 1986 .

[6] L. Amodei,et al. A vector spline approximation , 1991 .

[7] David Suter,et al. Motion estimation and vector splines , 1994, 1994 Proceedings of IEEE Conference on Computer Vision and Pattern Recognition.

[8] Jerry L. Prince,et al. Optimal brightness functions for optical flow estimation of deformable motion , 1994, IEEE Trans. Image Process..

[9] Jerry L. Prince,et al. A frequency domain performance analysis of Horn and Schunck's optical flow algorithm for deformable motion , 1995, IEEE Trans. Image Process..