@article {Losik:April 1997:0232-704X:141,
	author = "Losik M.V.",
	title = "The Cohomology of the Complex of G-Invariant Forms on G-Manifolds. II",
	journal = "Annals of Global Analysis and Geometry",
	volume = "15",
	year = "April 1997",
	abstract = "<P>The cohomology of G-manifolds of the type M=P \times_K(G/H), where G is a reductive Lie group, H and N are its closed subgroups, H is a normal subgroup of N, K=N/H, and P is a smooth principal K-bundle, are considered. In the case when the Lie algebras of H and N are reductive, the differential graded algebra C(M) introduced in the previous paper with the same title and having the same minimal model as one of the algebra of G-invariant forms on M is investigated. Moreover, the main theorem on the cohomology algebra of C(M) is proved under weaker conditions than those of the previous paper. </P>",
	pages = "141-152(12)",
	url = "http://www.ingentaconnect.com/content/klu/agag/1997/00000015/00000002/00121379"
}