Add to ORKGWe give an upper bound for the genus of a rational fibration of which the fibre is a product of even Eilenberg-Maclane spaces.Keywords: rational homotopy, sectional category, genusQuaestiones Mathematicae 29(2006), 85–9
If X is a simply connected space of finite type, then the rational homotopy groups of the based loop...
We study the problem of counting the number of varieties in families which have a rational point. We...
Which spaces occur as a classifying space for fibrations with a given fibre? We address this questio...
AbstractWe study rational fibrations where the fibre is an r-dimensional torus and the base is a for...
We give simple upper bounds for rational sectional category and use them to compute invariants of th...
Which spaces occur as a classifying space for fibrations with a given fibre? We address this questio...
that catE • cat F+cat B(cat F+1), where cat S denotes the Lusternik-Schnirelmann category of S. We g...
AbstractIf F→E→B is a fibration, a classical result of Varadarajan asserts that catE⩽catF+catB(catF+...
Adapting a result of Félix–Halperin–Lemaire concerning the Lusternik–Schnirelmann category of produc...
This proceedings volume centers on new developments in rational homotopy and on their influence on a...
Félix, Halperin, and Lemaire have shown that the rational module category Mcat and the rational Toom...
The sectional category of a continuous map between topological spaces is a numerical invariant of th...
We calculate the size of the rationalization of the function space Map(X, E) for E being the total s...
AbstractGiven F↪E→B a fibration we consider the group E♯(E,B) of self fibre homotopy equivalences wh...
Félix, Halperin, and Lemaire have shown that the rational module category Mcat and the rational Toom...
If X is a simply connected space of finite type, then the rational homotopy groups of the based loop...
We study the problem of counting the number of varieties in families which have a rational point. We...
Which spaces occur as a classifying space for fibrations with a given fibre? We address this questio...
AbstractWe study rational fibrations where the fibre is an r-dimensional torus and the base is a for...
We give simple upper bounds for rational sectional category and use them to compute invariants of th...
Which spaces occur as a classifying space for fibrations with a given fibre? We address this questio...
that catE • cat F+cat B(cat F+1), where cat S denotes the Lusternik-Schnirelmann category of S. We g...
AbstractIf F→E→B is a fibration, a classical result of Varadarajan asserts that catE⩽catF+catB(catF+...
Adapting a result of Félix–Halperin–Lemaire concerning the Lusternik–Schnirelmann category of produc...
This proceedings volume centers on new developments in rational homotopy and on their influence on a...
Félix, Halperin, and Lemaire have shown that the rational module category Mcat and the rational Toom...
The sectional category of a continuous map between topological spaces is a numerical invariant of th...
We calculate the size of the rationalization of the function space Map(X, E) for E being the total s...
AbstractGiven F↪E→B a fibration we consider the group E♯(E,B) of self fibre homotopy equivalences wh...
Félix, Halperin, and Lemaire have shown that the rational module category Mcat and the rational Toom...
If X is a simply connected space of finite type, then the rational homotopy groups of the based loop...
We study the problem of counting the number of varieties in families which have a rational point. We...
Which spaces occur as a classifying space for fibrations with a given fibre? We address this questio...