New bounds in the discrete analogue of Minkowski's second theorem
Abstract
We adapt an argument of Tao and Vu to show that if λ1·sλd are the successive minima of an origin-symmetric convex body K with respect to some lattice <Rd, and if we set k=\j:λj1\, then K contains at most 2k(1+λk2)k/λ1·sλk lattice points. This provides improved bounds in a conjecture of Betke, Henk and Wills (1993), and verifies that conjecture asymptotically as λk0. We also obtain a similar result without the symmetry assumption.
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