Sets preserved by a large subgroup of the special linear group
Abstract
Let E be a subset of the affine plane over a finite field Fq. We bound the size of the subgroup of SL2(Fq) that preserves E. As a consequence, we show that if E has size qα and is preserved by qβ elements of SL2(Fq) with β≥ 3α/2, then E is contained in a line. This result is sharp in general, and will be proved by using combinatorial arguments and applying a point-line incidence bound in Fq3 due to Mockenhaupt and Tao (2004).
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