Inclusion of poset homology into Lie algebra homology

Cohomologies of Lie algebras are usually calculated using the Chevalley-Eilenberg cochain complex of skew-symmetric forms . We consider two cochain complexes consisting of forms with some symmetric propert ies. First. cocha ins C' (L) are symmetric in the last 2 argument s, skew-symmetric in the oth

We consider the homology of ÿnite-dimensional-graded Lie algebras with coe cients in a ÿnite-dimensional-graded module. By a combinatorial approach we give a lower bound for their total homology. Our result extends a result of Deninger and Singhof for the case of trivial coe cients. Applications for

Let (L; @) be a di erential graded Lie algebra over the prime ÿeld Fp. There exists an isomorphism of Hopf algebras H \* (UL) ∼ = UE, where E is a graded Lie algebra (J. Pure. Appl. Algebra 83 (1992) 237-282). Suppose that L is q-reduced for some q ¿ 1. We prove a generalization of a classical theor

## Abstract The second homology of Lie superalgebras over a field of characteristic 0 extended over a supercommutative superalgebra __A__ and their twisted version are obtained. (© 2005 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)

In this paper we use Quillen-Barr-Beck's theory of (co-) homology of algebras in order to deÿne (co-) homology for the category RLie of restricted Lie algebras over a ÿeld k of characteristic p = 0. In contrast with the cases of groups, associative algebras and Lie algebras we do not obtain Hochschi