Weighted Schreier-type Sets and the Fibonacci Sequence

Abstract

For a finite set A⊂N and k∈ N, let ωk(A) = Σi∈ A, i≠ k1. For each n∈ N, define ak, n\ =\ |\E⊂ N\,:\, E = or ωk(E) < E≤slant E≤slant n\|. First, we prove that ak,k+ \ =\ 2Fk+, for all ≥slant 0 and k≥slant +2, where Fn is the nth Fibonacci number. Second, we show that |\E⊂ N\,:\, E = n+1, E > ω2,3(E), and |E|≠ 2\|\ =\ Fn, where ω2,3(E) = Σi∈ E, i≠ 2, 31.

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