Equidistribution of Solutions of Ternary Quadratic Congruences Modulo Prime Powers

Abstract

Let p be a fixed odd prime and Q(x,y,z)=ax2+bxy+cy2+dxz+eyz+fz2 be a fixed quadratic form in Z[x,y,z] which is non-degenerate in Fp[x,y,z] and (a(4ac-b2),p)=1. Let (x0,y0,z0) be a fixed point in Z3. We study the behavior of solutions (x,y,z) of congruences of the form Q(x,y,z)0q with q=pn, where max\|x-x0|,|y-y0|,|z-z0|\≤ N and (z,p)=1. In fact, we consider a smooth version of this problem and establish an asymptotic formula (thus the existence of such solutions) when n→∞, under the condition N≥ q12+.