Triviality criteria for unbounded complexes

Pub Date : 2024-10-11 DOI:10.1016/j.jalgebra.2024.09.028
Ioannis Emmanouil, Olympia Talelli
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Abstract

We study properties of modules that appear as syzygies of acyclic complexes of projective, injective, flat or flat-cotorsion modules and obtain criteria for these complexes to be contractible or totally acyclic. Our results illustrate the importance of strongly fp-injective modules in the study of these properties. We examine implications of the existence of complete resolutions (in a certain weak sense) and the finiteness of the Gorenstein projective dimension of pure-projective modules. We also use the orthogonality in the homotopy category between complexes of flat modules and pure acyclic complexes of cotorsion modules, in order to study the syzygies of acyclic complexes of flat modules. Finally, we present some applications of our results to group rings, regarding complete resolutions and cohomological periodicity.
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无界复合物的三性标准
我们研究了作为投影模块、注入模块、平模块或平扭转模块的无环复数的协同作用出现的模块的性质,并获得了这些复数可收缩或完全无环的标准。我们的结果说明了强 fp 注入模块在这些性质研究中的重要性。我们研究了完全解析(在某种弱意义上)的存在和纯投影模块的戈伦斯坦投影维度的有限性的意义。我们还利用平模块复数和纯投影模块无环复数之间同调范畴的正交性,来研究平模块无环复数的协同性。最后,我们介绍了我们的结果在群环上的一些应用,涉及完全解析和同调周期性。
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