On the Density of Integer Points on Generalised Markoff-Hurwitz and Dwork Hypersurfaces

Abstract

We use bounds of mixed character sums modulo a square-free integer q of a special structure to estimate the density of integer points on the hypersurface f1(x1) + … + fn(xn) =a x1k1 … xnkn for some polynomials fi ∈ Z[X] and nonzero integers a and ki, i=1, …, n. In the case of f1(X) = … = fn(X) = X2 and k1 = … = kn =1 the above hypersurface is known as the Markoff-Hurwitz hypersurface, while for f1(X) = … = fn(X) = Xn and k1 = … = kn =1 it is known as the Dwork hypersurface. Our results are substantially stronger than those known for general hypersurfaces.