Unique representations of integers by linear forms
Abstract
Let k 2 be an integer and let A be a set of nonnegative integers. For a k-tuple of positive integers λ = (λ1, … ,λk) with 1 λ1 < λ2 < … < λk, we define the additive representation function RA,λ(n) = |\(a1, … ,ak)∈ Ak: λ1a1 + … + λkak = n\|. For k = 2, Moser constructed a set A of nonnegative integers such that RA,λ(n) = 1 holds for every nonnegative integer n. In this paper we characterize all the k-tuples λ and the sets A of nonnegative integers with RA,λ(n) = 1 for every integer n 0.
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