Bounds for Greedy Bh-sets

Abstract

A set A of nonnegative integers is called a Bh-set if every solution to a1+…+ah = b1+…+bh, where ai,bi ∈ A, has \a1,…,ah\=\b1,…,bh\ (as multisets). Let γk(h) be the k-th positive element of the greedy Bh-set. We give a nontrivial lower bound on γ5(h), and a nontrivial upper bound on γk(h) for k 5. Specifically, 18 h4 +12 h3 γ5(h) 0.467214 h4+O(h3), although we conjecture that γ5(h)=13 h4 +O(h3). We show that γk(h) 1k! hk-1 + O(hk-2) for k 1 and γk(h) αk hk-1+O(hk-2), where α6 := 0.382978, α7 := 0.269877, and for k 7, αk+1 := 12k k! Σj=0k-1 k-1j kj 2j. This work begins with a thorough introduction and concludes with a section of open problems.

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