Arithmetic Progressions with Restricted Digits

Abstract

For an integer b ≥slant 2 and a set S⊂ \0,·s,b-1\, we define the Kempner set K(S,b) to be the set of all non-negative integers whose base-b digital expansions contain only digits from S. These well-studied sparse sets provide a rich setting for additive number theory, and in this paper we study various questions relating to the appearance of arithmetic progressions in these sets. In particular, for all b we determine exactly the maximal length of an arithmetic progression that omits a base-b digit.