Endomorphisms of regular rooted trees induced by the action of polynomials on the ring Zd of d-adic integers

Abstract

We show that every polynomial in Z[x] defines an endomorphism of the d-ary rooted tree induced by its action on the ring Zd of d-adic integers. The sections of this endomorphism also turn out to be induced by polynomials in Z[x] of the same degree. In the case of permutational polynomials acting on Zd by bijections the induced endomorphisms are automorphisms of the tree. In the case of Z2 such polynomials were completely characterized by Rivest. As our main application we utilize the result of Rivest to derive the condition on the coefficients of a permutational polynomial f(x)∈ Z[x] that is necessary and sufficient for f to induce a level transitive automorphism of the binary tree, which is equivalent to the ergodicity of the action of f(x) on Z2 with respect to the normalized Haar measure.