Poissonian correlations of αnd mod 1

Abstract

Let x(n):=αnd 1 for integer d >1 and non-zero real α. We show that \x(n)\n>0 has Poissonian -point correlations for almost all choices of α when d is large (depending on ). This falls in line with the expected behavior from the Berry--Tabor conjecture. Further, in the spirit of a conjecture of Rudnick--Sarnak, we show Poissonian -point correlations for a set of badly approximable α of full Hausdorff dimension by a Fourier analytic transference principle. The proof makes use of an application of the determinant method to count points on a diagonal hypersurface of degree d in such a way as to capture the contribution of points belonging to lower dimensional varieties. As d grows, these `special solutions' dominate the count and non-special solutions become increasingly rare. This stratified counting statement allows us to control the number of points on average very effectively.