On Schreier-type Sets, Partitions, and Compositions
Abstract
A nonempty set A⊂N is -strong Schreier if A≥slant |A|-+1. We define a set of positive integers to be sparse if either the set has at most two numbers or the differences between consecutive numbers in increasing order are non-decreasing. This note establishes a connection between sparse Schreier-type sets and (restricted) partition numbers. One of our results states that if Gn, consists of partitions of n that contain no parts in \2, …, \, and equation* An, \ :=\ \A⊂ \1, …, n\\,:\, n∈ A, A is sparse and -strong Schreier\, equation* then |An,|\ =\ |Gn-1,|, n, ∈ N. The special case Gn-1, 1 consists of all partitions of n-1. Besides partitions, integer compositions are also investigated.
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