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Abstract:We introduce and study a natural class of Anderson t- modules, called triangular t-modules, characterized by having Drinfeld modules as their $\tau$-composition factors. They form a homologically meaningful generalization of Drinfeld modules and exhibit rich arithmetic structure.\smallskip
We establish criteria for purity, strict and almost strict, and develop a reduction procedure that lowers the degrees of the defining biderivations. As a consequence, every almost strictly pure triangular t-module becomes strictly pure after a finite base extension.
We then investigate morphisms and isogenies between triangular t-modules, provide a characterization of triangular isogenies, and describe the algebra of endomorphisms, including a criterion for commutativity. On the analytic side, we show that all triangular t- modules are uniformizable and establish finiteness and purity criteria with consequences for Taelman's conjecture.
Finally, we develop a duality theory for triangular t- modules and their biderivations, proving compatibility with $\tau$-composition series and establishing analogues of the Cartier-Nishi theorem and the Weil-Barsotti formula.

Submission history

From: Piotr Krasoń [view email]
[v1] Mon, 8 Dec 2025 14:55:58 UTC (49 KB)
[v2] Fri, 12 Jun 2026 09:10:00 UTC (49 KB)