Vectors of type II Hermite-Pad\'e approximations and a new linear independence criterion

Abstract

We propose a linear independence criterion, and outline an application of it. Down to its simplest case, it aims at solving this problem: given three real numbers, typically as special values of analytic functions, how to prove that the Q-vector space spanned by 1 and those three numbers has dimension at least 3, whenever we are unable to achieve full linear independence, by using simultaneous approximations, i.e. those usually arising from Hermite-Pad\'e approximations of type II and their suitable generalizations. It should be recalled that approximations of type I and II are related, at least in principle: when the numerical application consists in specializing actual functional constructions of the two types, they can be obtained, one from the other, as explained in a well-known paper by K.Mahler [34]. That relation is reflected in a relation between the asymptotic behavior of the approximations at the infinite place of Q. Rather interestingly, the two view-points split away regarding the asymptotic behaviors at finite places (i.e. primes) of Q, and this makes the use of type II more convenient for particular purposes. In addition, sometimes we know type II approximations to a given set of functions, for which type I approximations are not known explicitly. Our approach can be regarded as a dual version of the standard linear independence criterion, which goes back to Siegel.