Bigraded differential operators in poisson geometry

dc.contributor	VOROBEV, YURY; 20047
dc.creator	VELASCO BARRERAS, EDUARDO; 488286
dc.creator	VELASCO BARRERAS, EDUARDO
dc.date	2014-10
dc.date.accessioned	2023-07-17T23:15:10Z
dc.date.available	2023-07-17T23:15:10Z
dc.identifier	1504140
dc.identifier	http://www.repositorioinstitucional.uson.mx/handle/unison/4447
dc.identifier.uri	https://repositorioslatinoamericanos.uchile.cl/handle/2250/7549747
dc.description	Tesis de maestría en ciencias especialidad matemáticas
dc.description	In this thesis we develop bigraded calculus for differential operators with applications to some problems in Poisson geometry, related to singular foliations. The goal of this work is to give a unified approach to the Schouten - Frölicher-Nijenhuis-Ehresmann calculus on fibred and foliated manifolds and apply this approach to the study of infinitesimal automorphisms and first cohomology of Poisson manifolds with singular symplectic foliations. Some results on computing Poisson cohomology in the regular case can be found, for example, in [38, 39, 31, 32, 8]. In some special singular cases, Poisson cohomology has been studied in [5, 22, 23, 24, 25].
dc.description	Universidad de Sonora. División de Ciencias Exactas y Naturales. Departamento de Matemáticas, 2014.
dc.format	PDF
dc.publisher	VELASCO BARRERAS, EDUARDO
dc.subject	ALGEBRA DE LIE
dc.subject	QA614.3 .V44
dc.subject	Variedades diferenciables
dc.title	Bigraded differential operators in poisson geometry