Tiling of polyhedral sets
pith:UYY3LS6Dopen to challenge →
classification
math.MG
math.FA
keywords
polyhedralsetsaffinelycompactself-affinetilingadmitaffine
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A self-affine tiling of a compact set G of positive Lebesgue measure is its partition to parallel shifts of a compact set which is affinely similar to G. We find all polyhedral sets (unions of finitely many convex polyhedra) that admit self-affine tilings. It is shown that in R^d there exist an infinite family of such polyhedral sets, not affinely equivalent to each other. A special attention is paid to an important particular case when the matrix of affine similarity and the translation vectors are integer. Applications to the approximation theory and to the functional analysis are discussed.
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