Abelian objects in categories with normal projections
Abstract
It is known that in (regular) unital and in subtractive categories, internal abelian groups are simply behaved; e.g., they are the same as internal algebras satisfying and , i.e., \emph{subtraction algebras}. Moreover, in these categorical settings, such internal abelian group structures are unique, and every morphism between the underlying objects of internal abelian groups is necessarily a morphism of internal abelian groups. It is also known that both (regular) unital and subtractive categories have normal projections, i.e., the isomorphism formula holds. In this paper, we show that all properties of simple behaviour of internal abelian groups in unital and subtractive categories lift to arbitrary categories having normal projections
Cite
@article{arxiv.2502.20474,
title = {Abelian objects in categories with normal projections},
author = {Michael Hoefnagel and Zurab Janelidze},
journal= {arXiv preprint arXiv:2502.20474},
year = {2025}
}
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5 pages