At this point it must now be clear that there are needed some homology calculations of the isometry groups for the 3 geometries and related Lie groups considered as discrete groups. This subject was first considered in connection with the theory of characteristic classes for foliations (see e.g...
Real homology of Lie group homomorphisms. 来自 ResearchGate 喜欢 0 阅读量: 17 作者: RF Brown 摘要: Let h: G1→G2 be a homomorphism of compact, connected Lie groups and let h*: H*(G1)→H*(G2) be the homomorphism of homology with real coefficients induced by h. The investigation ...
II. H2;H3; and relations with scissors congruences - Dupont, Parry - 1988 () Citation Context ...nnections with algebraic K{theory and homology of the lie group SL(2;C) considered as a discrete group. It collates results of of Bloch, Bökstedt, Brun, Dupont, Parry and Sah and...
homotopy Lie algebrasA description of a ring of functions on the base of a universal formal deformation for several moduli problems is given. The answer is given in terms of a homology group of a certain dg Lie algebra canonically (up to an essentially unique quasi-isomorphism) associated with...
fundamental group and the Milnor conjecture (I 57:07 Eric Pichon-Pharabod - Periods of hypersurfaces via effective homology 44:18 Yipeng Wang - On Gromov’s rigidity theorem for polytopes with acute angles 58:33 Thomas Nikolaus - Algebraic K-Theory in Geometric Topology 1:10:56 Philippe Di Fr...
fundamental group and the Milnor conjecture (I 57:07 Eric Pichon-Pharabod - Periods of hypersurfaces via effective homology 44:18 Yipeng Wang - On Gromov’s rigidity theorem for polytopes with acute angles 58:33 Thomas Nikolaus - Algebraic K-Theory in Geometric Topology 1:10:56 Philippe Di Fr...
... ) simple Lie groups 单纯李群 ) homology group of simplicial complex 单纯复形的同调群 ) left simple groupoid 左单广群 ... www.dictall.com|基于3个网页 例句 释义: 全部,单纯复形的同调群 更多例句筛选 1. Homology group of simplicial complex 单纯复形的同调群 hk.netsh.com ©...
Etale groupoids arise naturally as models for leaf spaces of foliations, for orbifolds, and for orbit spaces of discrete group actions. In this paper we introduce a sheaf homology theory for etale groupoids. We prove its invariance under Morita equivalence, as well as Verdier duality between ...
Recall that cyclic homology is naturally isomorphic to the additive K-theory which is the analogue of K-theory obtained by replacing the general linear group GL(A) by the Lie algebra gl(A). In order to write Leibniz homology of Lie algebras as functor homology, two objects have to be ...
For motivation, it is useful to think of the case where the ring R is or . Then GL ( n , R )is a Lie group, and the space BGL ( n , R ) + giving rise to the higher K -groups is by its construction an H-space whose homology agrees with the homology of this Lie group (...