Title of article
The higher derived functors of the primitive element functor of quasitoric manifolds
Author/Authors
Allen، نويسنده , , David and La Luz، نويسنده , , Jose، نويسنده ,
Issue Information
دوماهنامه با شماره پیاپی سال 2011
Pages
8
From page
2103
To page
2110
Abstract
Let P be an n-dimensional, q ⩾ 1 neighborly simple convex polytope and let M 2 n ( λ ) be the corresponding quasitoric manifold. The manifold depends on a particular map of lattices λ : Z m → Z n where m is the number of facets of P. In this note we use ESP-sequences in the sense of Larry Smith to show that the higher derived functors of the primitive element functor are independent of λ. Coupling this with results that appear in Bousfield (1970) [3] we are able to enrich the library of nice homology coalgebras by showing that certain families of quasitoric manifolds are nice, at least rationally, from Bousfieldʼs perspective.
Keywords
Quasitoric manifolds , Toric topology , Higher homotopy groups , Unstable homotopy theory , Toric spaces , Torus actions , Higher derived functors of the primitive element functor , Nice homology coalgebras , Cosimplicial objects
Journal title
Topology and its Applications
Serial Year
2011
Journal title
Topology and its Applications
Record number
1583047
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