Title :
Pyramidal implementation of deformable kernels
Author :
Manduchi, Roberto ; Perona, Pietro
Author_Institution :
California Inst. of Technol., Pasadena, CA, USA
Abstract :
In computer vision and increasingly, in rendering and image processing, it is useful to filter images with continuous rotated and scaled families of filters. For practical implementations, one can think of using a discrete family of filters, and then to interpolate from their outputs to produce the desired filtered version of the image. We propose a multirate implementation of deformable kernels, capable to further reduce the computational weight. The “basis” filters are applied to the different levels of a pyramidal decomposition. The new system is not shift-invariant-it suffers from “aliasing”. We introduce a new quadratic error criterion which keeps into account the inherent system aliasing. By using hypermatrix and Kronecker algebra, we are able to cast the global optimization task into a multilinear problem. An iterative procedure (“pseudo-SVD”) is used to minimize the overall quadratic approximation error
Keywords :
computer vision; filtering theory; image processing; iterative methods; matrix algebra; rendering (computer graphics); singular value decomposition; Kronecker algebra; aliasing; basis filters; computer vision; deformable kernels; global optimization; hypermatrix algebra; image filtering; image processing; iterative procedure; multilinear problem; multirate implementation; pseudo-SVD; pyramidal decomposition; quadratic approximation error minimisation; quadratic error criterion; rendering; steerable-scalable decomposition; Algebra; Approximation error; Finite impulse response filter; Image motion analysis; Image processing; Image texture analysis; Kernel; Nonlinear filters; Prototypes; Rendering (computer graphics);
Conference_Titel :
Image Processing, 1995. Proceedings., International Conference on
Conference_Location :
Washington, DC
Print_ISBN :
0-8186-7310-9
DOI :
10.1109/ICIP.1995.529725
