Sidon sequences and nonpositive curvarture
Abstract
A sequence a0<a1<…<an of nonnegative integers is called a Sidon sequence if the sums of pairs ai+aj are all different. In this paper we construct CAT(0) groups and spaces from Sidon sequences. The arithmetic condition of Sidon is shown to be equivalent to nonpositive curvature, and the number of ways to represent an integer as an alternating sum of triples ai-aj+ak of integers from the Sidon sequence, is shown to determine the structure of the space of embedded flat planes in the associated CAT(0) complex.
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