On the self-similarity of rational power series with matrix coefficients

Abstract

Let p be a prime, let d ≥ 1 be an integer and A be the algebra of square matrices of size d over the field of order p. Let P, Q ∈ A[x1, … xn] be polynomials in n indeterminates with coefficients in A, such that Q is invertible in A[\![x1, …, xn]\!]. Let also M Zn A be the map associating to the n-tuple of integers (α1, …, αn) the coefficient of the monomial x1α1 … xnαn in the development of the rational fraction PQ-1 as a power series (the support of M is contained in Nn). Our main result ensures that the map M, viewed as a tiling of Rn by unit cubes with color set A, is self-similar. The self-similarity is expressed in terms of invariance under substitutions. By specializing to d=1, n=2, P=1 and Q =1-x1-x2, we recover the well-known self-similarity feature of the binomial coefficients modulo p.