The number of arcs in Fq2 of a given cardinality
Abstract
A subset of Fq2 is called an arc if it does not contain three collinear points. We show that there are at most (1 + o(1))qm arcs of size m q1/2 ( q)3/2, nearly matching a trivial lower bound qm. This was previously known to hold for m q2/3 ( q)3, due to Bhowmick and Roche-Newton. The lower bound on m is best possible up to a logarithmic factor.
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