h1, h1 of Anderson t-motives, systems of affine equations and non-commutative determinants

Abstract

The authors defined in "h1 h1 for Anderson t-motives" the notion of an affine equation associated to a t-motive M. Here we define two systems of affine equations associated to a t-motive M, used for calculation of H1(M) and H1(M). We describe the process of elimination of unknowns in these systems. This is an analog of the corresponding theory of systems of linear differential equations. It gives us a notion of a non-commutative determinant deti,c(M) which belongs to the Anderson ring C∞[T,τ] of non-commutative polynomials. Finally, we calculate deti,c(M) for M= a Drinfeld module or its 1-dual. Also, some explicit calculations are made for Anderson t-motives of dimension n, rank 2n. Some problems of future research are formulated.