On multiplicative recurrence along linear patterns

Abstract

In a recent article, Donoso, Le, Moreira and Sun studied sets of recurrence for actions of the multiplicative semigroup (N, ×) and provided some sufficient conditions for sets of the form S=\(an+b)/(cn+d) n ∈ N \ to be sets of recurrence for such actions. A necessary condition for S to be a set of multiplicative recurrence is that for every completely multiplicative function f taking values on the unit circle, we have that n ∞ |f(an+b)-f(cn+d)|=0. In this article, we fully characterize the integer quadruples (a,b,c,d) which satisfy the latter property. Our result generalizes a result of Klurman and Mangerel concerning the pair (n,n+1), as well as some results of Donoso, Le, Moreira and Sun. In addition, we prove that, under the same conditions on (a,b,c,d), the set S is a set of recurrence for finitely generated actions of (N, ×).

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