Values of Special Indefinite Quadratic Forms
Abstract
For special d-dimensional hyperbolic shells E with d≥ 5 we show that the number of lattice points in E intersected with a d-dimensional cube Cr of edge length r, can be approximated by the volume of E Cr, as r tends to infinity, up to an error of order O(rd-2). We generalize results and techniques, used by F. G\"otze (2004), to a large class of indefinite quadratic forms and we provide explicit bounds for the errors in terms of certain Minkowski minima related to these quadratic forms. Furthermore, we obtain, as in the positive definite case, a result for multivariate diophantine approximation and for the maximal gap between values of such indefinite forms.
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