Variations on the Erdos distinct-sums problem
Abstract
Let \a1, . . . , an\ be a set of positive integers with a1 < … < an such that all 2n subset sums are distinct. A famous conjecture by Erdos states that an>c· 2n for some constant c, while the best result known to date is of the form an>c· 2n/n. In this paper, we weaken the condition by requiring that only sums corresponding to subsets of size smaller than or equal to λ n be distinct. For this case, we derive lower and upper bounds on the smallest possible value of an.
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