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Geometry and Applications
March 13-16, 2000
Sobolev Institute of Mathematics of the Siberian Branch of the Russian Academy of Sciences and Novosibirsk State University
Novosibirsk, Russia

Organizers
Yu.G. Rushetnyak (Chair of Program Committee; Russia), V.V. Vershinin (Chair of Organizing Committee; Russia), A.A. Borisenko (Ukraine), Yu.D. Burago (Russia), V.M. Gol'dshtein (Israel), M.L. Gromov (France), I.G. Nikolaev (USA/Russia), S.P. Novikov (USA/Russia), A.V. Pogorelov (Ukraine), I.Kh. Sabitov (Russia)

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Fractal interpolation surfaces
by
Robert Malysz
Depatrment of Mathematics and Information Science, Warsaw University of Technology

We consider fractal interpolation surfaces (FIS) of the form z=f(x, y) which are continuous and interpolate given data (i/n, j/n, zi, j), i, j=0, 1, ...  n such that f:D --> R where D=[0, 1]2. FIS have been introduced by Geronimo, Hardin and Massopust. They constructed self-affine FIS using the triangulation of the region D. Our FIS is an attractor of the iterated function system ([0, 1]2×R, w) where w=(Li, j, Fi, j) and Li, j:[0, 1]2 --> [(i-1)/n, i/n]×[(j-1)/n, j/n] , Fi, j(x, y, z)=dz+ai, jx+bi, jy+ci, jxy+fi, j. The Minkowski dimension of FIS generated by this new class is of the form dimM Gr f=3+log| d| / logn (if 1 > | d| > 1/n ). Such surfaces can be applied in data analysis and computer landscapes.

Date received: February 18, 2000

Copyright © 2000 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # cadw-28.