Schreier Multisets and the s-step Fibonacci Sequences

Abstract

Inspired by the surprising relationship (due to A. Bird) between Schreier sets and the Fibonacci sequence, we introduce Schreier multisets and connect these multisets with the s-step Fibonacci sequences, defined, for each s≥slant 2, as: F(s)2-s = ·s = F(s)0 = 0, F(s)1 = 1, and F(s)n = F(s)n-1 + ·s + F(s)n-s, for n≥slant 2. Next, we use Schreier-type conditions on multisets to retrieve a family of sequences which satisfy a recurrence of the form a(n) = a(n-1) + a(n-u), with a(n) = 1 for n = 1,…, u. Finally, we study nonlinear Schreier conditions and show that these conditions are related to integer decompositions, each part of which is greater than the number of parts raised to some power.