İbrahim İlker Akça scite author profile

Emir

Martins

2016

We address the homotopy theory of 2-crossed modules of commutative algebras, which are equivalent to simplicial commutative algebras with Moore complex of length two. In particular, we construct for maps of 2-crossed modules a homotopy relation, and prove that it yields an equivalence relation in very unrestricted cases (freeness up to order one of the domain 2-crossed module). This latter condition strictly includes the case when the domain is cofibrant. Furthermore, we prove that this notion of homotopy yields a groupoid with objects being the 2-crossed module maps between two fixed 2-crossed modules (with free up to order one domain), the morphisms being the homotopies between 2-crossed module maps.Keywords: Simplicial commutative algebra, crossed module of commutative algebras, 2-crossed module of commutative algebras, quadratic derivation.

Simplicial and crossed Lie algebras

Arvasi

2002

In this paper a definition of a category of modules over the ring of differential operators on a smooth variety of finite type in positive characteristics is given. It has some of the good properties of holonomic D-modules in zero characteristic. We prove that it is a Serre category and that it is closed under the usual D-module functors, as defined by Haastert. The relation to the similar concept of F-finite modules, introduced by Lyubeznik, is elucidated, and several examples, such as etale algebras, are given.

Coproduct of Crossed A-Modules of R-Algebroids

Avcıoğlu

2017

Abstract:In this study we construct, in the category XAlg(R) /A of crossed A-modules of R-algebroids, the coproduct of given two crossed A-modules M = (µ : M −→ A) and N = (η : N −→ A) of R-algebroids in two di erent ways: Firstly we construct the coproduct M • * N by using the free product M * N of pre-R-algebroids M and N, and then we construct the coproduct M • N by using the semidirect product M N of M and N via µ. Finally we construct an isomorphism between M • * N and M • N.

Fibrations of 2‐crossed modules

Arslan

Math Methods in App Sciences

Irmak³

et al. 2018

Categorification of Algebras: 2-Algebras

Arslan²

2023