Proof of W.M.Schmidt's conjecture concerning successive minima of a lattice

Abstract

For a real N 1 and a vector =(1,1,...,n) define a matrix A (, N) = (arrayccccc N-1 & 0& 0& ... &0 N1n 1 & -N1n & 0&... & 0 N1n 2 &0& -N1n & ... & 0 ... &... &... &... N1n n &0&0&... &- N1n array) and a lattice (, N) = A (, N)Zn+1. Consider a convex 0-symmetric body W = \z= (x,y1,...,yn)∈ Rn+1: (|x|, |y|) 1 \ >. For a natural l, 1 l n+1 let μl (, N) be the l-th successive minimum of W with respect to (, N). We prove that there exist real numbers 1,...,n linearly independent together with 1 over Z, such that μk (, N) 0 as N ∞ and μk+2 (, N) ∞ as N ∞.