Multivariate Matrix Refinable Functions with Arbitrary Matrix Dilation

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Abstract

Characterizations of the stability and orthonormality of a multivariate matrix refinable function Φ with arbitrary matrix dilation M are provided in terms of the eigenvalue and 1-eigenvector properties of the restricted transition operator. Under mild conditions, it is shown that the approximation order of Φ is equivalent to the order of the vanishing moment conditions of the matrix refinement mask {Pα}. The restricted transition operator associated with the matrix refinement mask {Pα} is represented by a finite matrix (AMi−j )i,j , with Aj = |det(M)| −1 P κ Pκ−j ⊗ Pκ and Pκ−j ⊗ Pκ being the Kronecker product of matrices Pκ−j and Pκ. The spectral properties of the transition operator are studied. The Sobolev regularity estimate of a matrix refinable function Φ is given in terms of the spectral radius of the restricted transition operator to an invariant subspace. This estimate is analyzed in an example.
Original languageAmerican English
JournalTransactions of the American Mathematical Society
Volume351
StatePublished - Feb 1999

Disciplines

  • Physical Sciences and Mathematics

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