Counting integers representable as images of polynomials modulo n
Abstract
Given a polynomial f(x1,x2,…, xt) in t variables with integer coefficients and a positive integer n, let α(n) be the number of integers 0≤ a<n such that the polynomial congruence f(x1, x2, …, xt) a\ (mod\ n) is solvable. We describe a method that allows to determine the function α associated to polynomials of the form c1x1k+c2x2k+·s+ctxtk. Then we apply this method to polynomials that involve sums and differences of squares, mainly to the polynomials x2+y2, x2-y2 and x2+y2+z2.
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