Refined Estimates on Conjectures of Woods and Minkowski

Abstract

Let be a lattice in Rn reduced in the sense of Korkine and Zolotareff having a basis of the form (A1,0,0,…,0),(a2,1,A2,0,…,0), …,(an,1,an,2,…,an,n-1,An) where A1, A2,…,An are all positive. A well known conjecture of Woods in Geometry of Numbers asserts that if A1A2·s An=1 and Ai≤slant A1 for each i then any closed sphere in Rn of radius n/2 contains a point of . Woods' Conjecture is known to be true for n≤ 9. In this paper we give estimates on the Conjecture of Woods for 10≤ n≤33, improving the earlier best known results of Hans-Gill et al. These lead to an improvement, for these values of n, to the estimates on the long standing classical conjecture of Minkowski on the product of n non-homogeneous linear forms.