Add to ORKGIn this abstract we present an explicit formula for a cycle representing the top class of certain elliptic spaces, including the homogeneous spaces. For thet, we shall rely on the connection between Sullivan's theory of minimal models and Rational homotopy theory for which [3], [6] and [10] are standard references
Abstract. An elliptic space is one whose rational homotopy and rational cohomol-ogy are both finite ...
This paper provides explicit closed formulas in terms of tautological classes for the cycle classes ...
AbstractFor any torus G=S1×⋯×S1, the author has introduced [2] a category A(G) and together with Shi...
In this abstract we present an explicit formula for a cycle representing the top class of certain el...
AbstractWe give an explicit formula for a cycle representing a basis for the cohomology class of hig...
AbstractLet (ΛV,d) be the Sullivan model of a pure elliptic space S. We give an algorithm, based on ...
67 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2006.We use the language of homotop...
67 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2006.We use the language of homotop...
AbstractExplicit formulae for rational Lusternik–Schnirelman (L–S) category (cat0) are rare, but som...
RésuméLet E(X) be the H-space of homotopy self-equivalences which are homotopic to the identity of a...
Let E(X) be the H-space of homotopy self-equivalences which are homotopic to the identity of a homog...
AbstractLet (ΛV,d) be the Sullivan model of a pure elliptic space S. We give an algorithm, based on ...
AbstractLet (ΛV,d) be the Sullivan model of an elliptic space S and (ΛV,dσ) be the associated pure m...
AbstractExplicit formulae for rational Lusternik–Schnirelman (L–S) category (cat0) are rare, but som...
Let X be a finite type simply connected rationally elliptic CW-complex with Sullivan minimal model (...
Abstract. An elliptic space is one whose rational homotopy and rational cohomol-ogy are both finite ...
This paper provides explicit closed formulas in terms of tautological classes for the cycle classes ...
AbstractFor any torus G=S1×⋯×S1, the author has introduced [2] a category A(G) and together with Shi...
In this abstract we present an explicit formula for a cycle representing the top class of certain el...
AbstractWe give an explicit formula for a cycle representing a basis for the cohomology class of hig...
AbstractLet (ΛV,d) be the Sullivan model of a pure elliptic space S. We give an algorithm, based on ...
67 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2006.We use the language of homotop...
67 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2006.We use the language of homotop...
AbstractExplicit formulae for rational Lusternik–Schnirelman (L–S) category (cat0) are rare, but som...
RésuméLet E(X) be the H-space of homotopy self-equivalences which are homotopic to the identity of a...
Let E(X) be the H-space of homotopy self-equivalences which are homotopic to the identity of a homog...
AbstractLet (ΛV,d) be the Sullivan model of a pure elliptic space S. We give an algorithm, based on ...
AbstractLet (ΛV,d) be the Sullivan model of an elliptic space S and (ΛV,dσ) be the associated pure m...
AbstractExplicit formulae for rational Lusternik–Schnirelman (L–S) category (cat0) are rare, but som...
Let X be a finite type simply connected rationally elliptic CW-complex with Sullivan minimal model (...
Abstract. An elliptic space is one whose rational homotopy and rational cohomol-ogy are both finite ...
This paper provides explicit closed formulas in terms of tautological classes for the cycle classes ...
AbstractFor any torus G=S1×⋯×S1, the author has introduced [2] a category A(G) and together with Shi...