We study chain complexes of field configurations and observables for Abelian gauge theory on contractible manifolds, and show that they can be extended to non-contractible manifolds using techniques from homotopy theory. The extension prescription yields functors from a category of manifolds to suitable categories of chain complexes. The extended functors properly describe the global field and observable content of Abelian gauge theory, while the original gauge field configurations and observables on contractible manifolds are recovered up to a natural weak equivalence.
Homotopy Colimits and Global Observables in Abelian Gauge Theory / Benini, Marco; Schenkel, Alexander; Szabo, Richard J.. - In: LETTERS IN MATHEMATICAL PHYSICS. - ISSN 0377-9017. - 105:9(2015), pp. 1193-1222. [10.1007/s11005-015-0765-y]
Homotopy Colimits and Global Observables in Abelian Gauge Theory
Schenkel, Alexander
;
2015-01-01
Abstract
We study chain complexes of field configurations and observables for Abelian gauge theory on contractible manifolds, and show that they can be extended to non-contractible manifolds using techniques from homotopy theory. The extension prescription yields functors from a category of manifolds to suitable categories of chain complexes. The extended functors properly describe the global field and observable content of Abelian gauge theory, while the original gauge field configurations and observables on contractible manifolds are recovered up to a natural weak equivalence.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione
