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ЖУРНАЛЫ // Современная математика и ее приложения // Архив

Совр. матем. и ее приложения, 2015, том 99, страницы 3–153 (Mi cma484)

Эта публикация цитируется в 9 статьях

Categorical, homological, and homotopical properties of algebraic objects

T. Datuashvili

Andrea Razmadze Mathematical Institute of I. Javakhishvili Tbilisi State University

Аннотация: This monograph is based on the doctoral dissertation of the author defended in the Iv. Javakhishvili Tbilisi State University in 2006. It begins by developing internal category and internal category cohomology theories (equivalently, for crossed modules) in categories of groups with operations. Further, the author presents properties of actions in categories of interest, in particular, the existence of an actor in specific algebraic categories. Moreover, the reader will be introduced to a new type of algebras called noncommutative Leibniz–Poisson algebras, with their properties and cohomology theory and the relationship of new cohomologies with well-known cohomologies of underlying associative and Leibniz algebras. The author defines and studies the category of groups with an action on itself and solves two problems of J.-L. Loday. Homotopical and categorical properties of chain functors category are also examined.

УДК: 512.66; 512.58; 515.14

Язык публикации: английский


 Англоязычная версия: Journal of Mathematical Sciences, 2017, 225:3, 383–533


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