The sum of multidimensional divisor function over values of quadratic polynomial

Abstract

Let F( x)= xtQm x+bt x+c∈Z[ x] be a quadratic polynomial in ( 3 ) variables x =(x1,...,x), where F( x) is positive when x∈R 1, Qm∈ M(Z) is an × matrix and its discriminant (Qmt+Qm)≠ 0. It gives explicit asymptotic formulas for the following sum \[ Tk,F(X)=Σ x∈ [1,X]^τk(F( x)) \] with the help of the circle method. Here τk(n)=\#\(x1,x2,...,xk)∈Nk: n=x1x2...xk\ with k∈Z 2 is the multidimensional divisor function.