Split extension classifiers in the category of precrossed modules of commutative algebras | Zendy

Yaşar Boyacı | Zendy; T. S. Kuzpınarı | Zendy; E. Ö. Uslu | Zendy

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Split extension classifiers in the category of precrossed modules of commutative algebras

Author(s) -

Yaşar Boyacı,

T. S. Kuzpınarı,

E. Ö. Uslu

Publication year - 2015

Publication title -

turkish journal of mathematics

Language(s) - English

Resource type - Journals

eISSN - 1303-6149

pISSN - 1300-0098

DOI - 10.3906/mat-1503-78

Subject(s) - mathematics , commutative property , extension (predicate logic) , construct (python library) , equivalence (formal languages) , pure mathematics , algebra over a field , classifier (uml) , artificial intelligence , computer science , programming language

We construct an actor of a precat$^{1}$-algebra and then by using the natural equivalence between the categories of precat$^{1}$-algebras and that of precrossed modules, we construct the split extension classifier of the corresponding precrossed module, which gives rise to the representability of actions in the category of precrossed modules of commutative algebras under certain conditions.

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