Substitutions for tilings \p,q\

Abstract

In this paper we consider tiling \p, q \ of the Euclidean space and of the hyperbolic space, and its dual graph q, p from a combinatorial point of view. A substitution σq, p on an appropriate finite alphabet is constructed. The homogeneity of graph q, p and its generation function are the basic tools for the construction. The tree associated with substitution σq, p is a spanning tree of graph q, p. Let un be the number of tiles of tiling \p, q \ of generation n. The characteristic polynomial of the transition matrix of substitution σq, p is a characteristic polynomial of a linear recurrence. The sequence (un)n ≥ 0 is a solution of this recurrence. The growth of sequence (un)n ≥ 0 is given by the dominant root of the characteristic polynomial.

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