Counting Unions of Schreier Sets
Abstract
A subset of positive integers F is a Schreier set if it is non-empty and |F|≤slant F (here |F| is the cardinality of F). For each positive integer k, we define kS as the collection of all the unions of at most k Schreier sets. Also, for each positive integer n, let (kS)n be the collection of all sets in kS with the maximum element equal to n. It is well-known that the sequence (|(1S)n|)n=1∞ is the Fibbonacci sequence. In particular, the sequence satisfies a linear recurrence. We generalize this statement, namely, we show that the sequence (|(kS)n|)n=1∞ satisfies a linear recurrence for every positive k.
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