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2016

Novel structures in Stanley sequences

8 years 8 months ago
Novel structures in Stanley sequences
Given a set of integers with no three in arithmetic progression, we construct a Stanley sequence by adding integers greedily so that no arithmetic progression is formed. This paper offers two main contributions to the theory of Stanley sequences. First, we characterize well-structured Stanley sequences as solutions to constraints in modular arithmetic, defining the modular Stanley sequences. Second, we introduce the basic Stanley sequences, where elements arise as the sums of subsets of a basis sequence, which in the simplest case is the powers of 3. Applications of our results include the construction of Stanley sequences with arbitrarily large gaps between terms, answering a weak version of a problem by Erd˝os et al. Finally, we generalize many results about Stanley sequences to p-free sequences, where p is any odd prime.
Richard A. Moy, David Rolnick
Added 01 Apr 2016
Updated 01 Apr 2016
Type Journal
Year 2016
Where DM
Authors Richard A. Moy, David Rolnick
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