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arxiv: 1904.08732 · v3 · pith:4E37VX6W · submitted 2019-04-18 · math.CO

Partial associativity and rough approximate groups

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classification math.CO
keywords circgroupmultiplicationmusttableagreesassociativepart
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Suppose that a binary operation $\circ$ on a finite set $X$ is injective in each variable separately and also associative. It is easy to prove that $(X,\circ)$ must be a group. In this paper we examine what happens if one knows only that a positive proportion of the triples $(x,y,z)\in X^3$ satisfy the equation $x\circ(y\circ z)=(x\circ y)\circ z$. Other results in additive combinatorics would lead one to expect that there must be an underlying "group-like" structure that is responsible for the large number of associative triples. We prove that this is indeed the case: there must be a proportional-sized subset of the multiplication table that approximately agrees with part of the multiplication table of a metric group. We also present an example that suggests that our result cannot be strengthened to yield a dense subset that agrees with part of the multiplication table of a group.

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