Mixed Lp(L2) norms of the lattice point discrepancy

Abstract

We estimate some mixed Lp( L2) norms of the discrepancy between the volume and the number of integer points in r-x, a dilated by a factor r and translated by a vector x of a convex body in Rd, \ ∫Td( 1H ∫RR+H Σk∈Zd r-x(k)-rd 2dr)p/2dx\ 1/p. We obtain estimates for fixed values of H and R∞, and also asymptotic estimates when H∞.