Refinable shift invariant spaces in R^d
Abstract
Let be a compactly supported function which satisfies a refinement equation of the form , where is a lattice, is a finite subset of , and is a dilation matrix. We prove, under the hypothesis of linear independence of the -translates of , that there exists a correspondence between the vectors of the Jordan basis of a finite submatrix of and a finite dimensional subspace in the shift invariant space generated by . We provide a basis of and show that its elements satisfy a property of homogeneity associated to the eigenvalues of . If the function has accuracy , this basis can be chosen to contain a basis for all the multivariate polynomials of degree less than . These latter functions are associated to eigenvalues that are powers of the eigenvalues of . Further we show that the dimension of coincides with the local dimension of , and hence, every function in the shift invariant space generated by can be written locally as a linear combination of translates of the homogeneous functions.
Cite
@article{arxiv.math/0511421,
title = {Refinable shift invariant spaces in R^d},
author = {Carlos Cabrelli and Sigrid Heineken and Ursula Molter},
journal= {arXiv preprint arXiv:math/0511421},
year = {2007}
}
Comments
21 pages, 3 figures