Construction of recurrent bivariate fractal interpolation surfaces and computation of their box-counting dimension

Bouboulis P; Dalla L; Drakopoulos V

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Construction of recurrent bivariate fractal interpolation surfaces and computation of their box-counting dimension

机译：递归二元分形插值曲面的构造及其盒数尺寸的计算

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Recurrent bivariate fractal interpolation surfaces (RBFISs) generalise the notion of affine fractal interpolation surfaces (FISs) in that the iterated system of transformations used to construct such a surface is non-affine. The resulting limit surface is therefore no longer self-affine nor self-similar. Exact values for the box-counting dimension of the RBFISs are obtained. Finally, a methodology to approximate any natural surface using RBFISs is outlined. (c) 2006 Elsevier Inc. All rights reserved.

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《Journal of Approximation Theory》 |2006年第2期|共19页
作者
Bouboulis P; Dalla L; Drakopoulos V;
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正文语种 eng
中图分类数理逻辑、数学基础;
关键词
fractal interpolation functions; IFS; RIFS; fractals; bivariate fractal interpolation surfaces; box-counting dimension; Minkowski dimension; ITERATED FUNCTION SYSTEMS; DISCRETE SEQUENCES; CHARACTER;

机译：分形插值函数;IFS;RIFS;分形;二元分形插值曲面;盒计数维;Minkowski维;迭代函数系统;离散序列;字符;

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1. Construction of recurrent bivariate fractal interpolation surfaces and computation of their box-counting dimension [J] . Bouboulis P, Dalla L, Drakopoulos V Journal of Approximation Theory . 2006,第2期

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2. Box-counting dimensions of fractal interpolation surfaces derived from fractal interpolation functions [J] . Zhigang Feng, Xiuqing Sun Journal of Mathematical Analysis and Applications . 2014,第1期

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7. Construction of recurrent bivariate fractal interpolation surfaces and computation of their box-counting dimension [O] . Bouboulis P., Dalla Leoni, Drakopoulos V. 2006

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Construction of recurrent bivariate fractal interpolation surfaces and computation of their box-counting dimension

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