Applications of Siegel's Lemma to a system of linear forms and its minimal points

Abstract

Consider a real matrix consisting of rows (θi,1,…,θi,n), for 1≤ i≤ m. The problem of making the system linear forms x1θi,1+·s+xnθi,n-yi for integers xj,yi small naturally induces an ordinary and a uniform exponent of approximation, denoted by w() and w() respectively. For m=1, a sharp lower bound for the ratio w()/w() was recently established by Marnat and Moshchevitin. We give a short, new proof of this result upon a hypothesis on the best approximation integer vectors associated to . Our conditional result extends to general m>1 (but may not be optimal in this case). Moreover, our hypothesis is always satisfied in particular for m=1, n=2 and thereby unconditionally confirms a previous observation of Jarn\'ik. We formulate our results in the more general context of approximation of subspaces of Euclidean spaces by lattices. We further establish criteria upon which a given number of consecutive best approximation vectors are linearly independent. Our method is based on Siegel's Lemma.