Counting Additive Decompositions of Quadratic Residues in Finite Fields
Abstract
We say that a set S is additively decomposed into two sets A and B if S = \a+b : a∈ A, \ b ∈ B\. A. S\'ark\"ozy has recently conjectured that the set Q of quadratic residues modulo a prime p does not have nontrivial decompositions. Although various partial results towards this conjecture have been obtained, it is still open. Here we obtain a nontrivial upper bound on the number of such decompositions.
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