Linear Recurrences from Counting Schreier-Type Multisets

Abstract

A nonempty set F is Schreier if F |F|. Bird observed that counting Schreier sets in a certain way produces the Fibonacci sequence. Since then, various connections between variants of Schreier sets and well-known sequences have been discovered. Building on these works, we prove a linear recurrence for the sequence that counts multisets F with F p|F|. In particular, if we let A(s)p, n\ :=\ \F⊂ \1, …, 1s, …, n-1, …, n-1s, n\\,:\,n∈ F and F p|F|\, then |A(s)p, n| = Σi=0s|A(s)p, n-1-ip|. If we color s copies of the same integer by different colors from 1 to s, i.e., B(s)p, n:= \F⊂ \11, …, 1s, …, (n-1)1, …, (n-1)s, n\\,:\,n∈ F and F p|F|\, then |B(s)p, n| = Σi=0s si| B(s)p, n-1-ip|. Lastly, we count Schreier sets that do not admit multiples of a given integer u 2 and witness linear recurrences whose coefficients are drawn from the uth row of the Pascal triangle and have alternating signs, except possibly the last one.