Uniform nonlinear Szemer\'edi theorem for corners in finite fields
Abstract
Let P(t),Q(t)∈ Q(t) be rational functions such that P(t),Q(t) and the constant function 1 are linearly independent over Q, we prove an asymptotic formula for the number of the corner configurations (x1,x2),(x1+P(y),x2),(x1,x2+Q(y)) in the subsets of Fp2.
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