B. Kimia, A. Tannenbaum, and S. Zucker. On optimal control methods in computer vision and image processing. In B. t.H. Romeny, editor, Geometry Driven Diffusion in Computer Vision, pages 307--338. Kluwer, 1994.  Home/Search   Document Details and Download   Summary   Related Articles   Check

....primitives exist, they also have drawbacks. In their recent work on adaptive particle sampling and control of implicit surfaces, Heckbert and Witkin [18] report that particle control of such surfaces is slippery and elusive. Recent growth in level set techniques [9, 12] and variational methods [7] have created new interest in understanding and manipulating complex surface models directly from the surface representation. Whitaker and Breen [17] have shown how level set techniques can be used to model and manipulate computer graphic shapes, effectively morphing from one to another. They ....

B. Kimia, A. Tannenbaum, and S. Zucker. On optimal control methods in computer vision and image processing. In B. t.H. Romeny, editor, Geometry Driven Diffusion in Computer Vision, pages 307--338. Kluwer, 1994.

....drawbacks. In their recent work on adaptive particle sampling and control of implicit surfaces, Heckbert and Witkin (1994) report that particle control of such surfaces is slippery and elusive. Recent growth in level set techniques (Osher and Sethian, 1988; Sethian, 1996) and variational methods (Kimia et al. 1994) have created new interest in understanding and manipulating complex surface models directly from the surface representation. Whitaker and Breen (1998) have shown how level set techniques can be used to model and manipulate computer graphic shapes, effectively morphing from one to another. They ....

B. Kimia, A. Tannenbaum, and S. Zucker. On optimal control methods in computer vision and image processing. In B. t.H. Romeny, editor, Geometry Driven Diffusion in Computer Vision, pages 307--338. Kluwer, 1994.

....examples. 1 Introduction Variational principles have emerged naturally from considerations of energy minimization in mechanics [27] We consider these in the context of the eikonal equation, which arises in geometrical optics and has become of great interest for problems in computer vision [10, 22]. It is the basis for continuous versions of mathematical morphology [9, 45, 64] as well as for Blum s grass re transform [5] and dynamic theories of shape representation [23, 61] It has also been used for applications in image processing and analysis [48, 11] shape fromshading [20, 44, 39, ....

B. B. Kimia, A. Tannenbaum, and S. W. Zucker. On optimal control methods in computer vision and image processing. In B. ter Haar Romeny, editor, Geometry-Driven Diusion In Computer Vision, pages 307-338. Kluwer, 1994. 33

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B. Kimia, A. Tannenbaum, and S. Zucker. On optimal control methods in computer vision and image processing. In B. t.H. Romeny, editor, Geometry Driven Diffusion in Computer Vision, pages 307--338. Kluwer, 1994.

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