A multi-linear geometric estimate
Abstract
We give a generalization of the geometric estimate used by Hart and the second author in their 2008 work on sums and products in finite fields. Their result concerned level sets of non-degenerate bilinear forms over finite fields, while in this work we prove that if E⊂Fqd is sufficiently large and is a non-degenerate multi-linear form then will attain all possible nonzero values as its arguments vary over E, under a certain quantitative assumption on the extent to which E is projective. We show that our bound is nontrivial in the case that n=3 and d=2 and construct examples of sets to which this applies. In particular, we give conditions under which every member of Fq* belongs to A· A· A+A· A· A· A· A· A where A is a union of cosets of a subgroup of Fq*.
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