On k-regularity of sequences of valuations and last nonzero digits

Abstract

Let b ≥ 2 be an integer base with prime factors p1, …, ps. In this paper we study sequences of "b-adic valuations" and last nonzero digits in b-adic expansions of the values f(n) = (f1(n), …, fs(n)), where each fi is a pi-adic analytic function. We give a complete classification concerning k-regularity of these sequences, which generalizes a result for b prime obtained by Shu and Yao. As an application, we strengthen a theorem by Murru and Sanna on b-adic valuations of Lucas sequences of the first kind. Moreover, we derive a method to determine precisely which terms of these sequences can be represented by certain ternary quadratic forms.