TY - THES
A1 - Manzyuk, Oleksandr
T1 - A-infinity-bimodules and Serre A-infinity-functors
N2 - This dissertation is intended to transport the theory of Serre functors into the context of A-infinity-categories. We begin with an introduction to multicategories and closed multicategories, which form a framework in which the theory of A-infinity-categories is developed. We prove that (unital) A-infinity-categories constitute a closed symmetric multicategory. We define the notion of A-infinity-bimodule similarly to Tradler and show that it is equivalent to an A-infinity-functor of two arguments which takes values in the differential graded category of complexes of k-modules, where k is a commutative ground ring. Serre A-infinity-functors are defined via A-infinity-bimodules following ideas of Kontsevich and Soibelman. We prove that a unital closed under shifts A-infinity-category over a field admits a Serre A-infinity-functor if and only if its homotopy category admits an ordinary Serre functor. The proof uses categories and Serre functors enriched in the homotopy category of complexes of k-modules. Another important ingredient is an A-infinity-version of the Yoneda Lemma.
N2 - A-unendlich-Bimoduln und Serresche A-unendlich-Funktoren
KW - Kategorientheorie
KW - Homologische Algebra
KW - A-infinity-category
KW - A-infinity-functor
KW - A-infinity-bimodule
KW - Serre functor
KW - multicategory
Y1 - 2007
UR - https://kluedo.ub.uni-kl.de/frontdoor/index/index/docId/1910
UR - https://nbn-resolving.org/urn:nbn:de:hbz:386-kluedo-21410
ER -