Characterizations of higher derivations and higher differential torsion theories in Eilenberg-Moore categories of monads

Abstract

Let T be a monad on a category C. In this paper, we introduce the notion of higher derivations on the monad T and characterize them in terms of ordinary derivations on T. We also define higher derivations on modules over the monad T in the Eilenberg-Moore category EMT and establish their characterization in a similar manner. We provide several examples that illustrate and support our results. Furthermore, we examine the conditions under which a torsion theory on EMT is higher differential, and show that this holds if and only if every higher derivation on a module M ∈ EMT extends uniquely to its module of quotients Qτ(M).