Some Properties In The Homology Theory Through L_∞-Algebra

Hawazin Daif Allah Alzahrani

Some Properties In The Homology Theory Through L_∞-Algebra

Authors

Hawazin Daif Allah Alzahrani

Keywords:

Simplicial homology, Hochschild homology, L∞-algebras.

Abstract

In this paper we investigate the homological structures in L∞-algebras and their behavior under various conditions, with a focus on the excision theorem, simplicial homology, and bar homology. We introduce the key concepts of excision in the context of L∞-algebras and establish how these structures preserve homological relations under certain inclusions. The relationship between simplicial and bar homologies is explored, and we define the homological equivalences between these different structures. We provide results on the equivalence of homological relations and the necessary conditions for maintaining quasi-isomorphisms between the algebras involved. Furthermore, we analyze the conditions under which H-unit and other homological properties hold, offering a comprehensive understanding of the interplay between algebraic and homological structures.

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Published

2026-04-12

How to Cite

Alzahrani, Hawazin Daif Allah. 2026. “Some Properties In The Homology Theory Through L_∞-Algebra”. Metallurgical and Materials Engineering, April, 77-86. https://www.metall-mater-eng.com/index.php/home/article/view/1971.

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Issue

Vol. 32 No. 2 (2026)

Section

Research

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