# $h^1$, $h_1$ of Anderson t-motives, systems of affine equations and   non-commutative determinants

**Authors:** A. Grishkov, D. Logachev

arXiv: 2302.13480 · 2023-12-05

## TL;DR

This paper introduces two affine equation systems for Anderson t-motives to compute cohomology groups, develops a non-commutative determinant concept, and provides explicit calculations for specific motives, advancing the algebraic understanding of t-motives.

## Contribution

It defines new systems of affine equations for Anderson t-motives, introduces a non-commutative determinant, and performs explicit calculations for certain classes of motives.

## Key findings

- Defined systems of affine equations for cohomology calculation.
- Introduced a non-commutative determinant in the Anderson ring.
- Calculated determinants for Drinfeld modules and t-motives of specific dimensions.

## Abstract

The authors defined in "$h^1\ne h_1$ 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 $H^1(M)$ and $H_1(M)$. 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 $det_{i,c}(M)$ which belongs to the Anderson ring $\Bbb C_\infty[T,\tau]$ of non-commutative polynomials. Finally, we calculate $det_{i,c}(M)$ 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.

## Full text

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Source: https://tomesphere.com/paper/2302.13480