On the k-resultant modulus set problem on varieties over finite fields
Abstract
Let V⊂ Fqd be a regular variety, k 3 is an integer and A⊂eq V. Covert, Koh, and Pi (2017) proved the following generalization of the Erdos-Falconer distance problem: If |A| qd-12+1k-1, then we have \[k(A)=\|x1+·s+xk| xi∈ A\⊃eq Fq*.\] In this paper, we provide improvements and extensions of their result.
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