Add to ORKGWe give conditions for a map of spaces to induce maps of the homology decompositions of the spaces which are compatible with the homology sections and dual Postnikov invariants. Several applications of this result are obtained. We show how the homotopy type of the (n+1)st homology section depends on the homotopy type of the nth homology section and the (n+1)st homology group. We prove that all homology sections of a co-H-space are co-H-spaces, all n-equivalences of the homology decomposition are co-H-maps and, under certain restrictions, all dual Postnikov invariants are co-H-maps. We give a new proof of a result of Berstein and Hilton which gives conditions for a co-H-space to be a suspension
We have three somewhat independent sets of results. Our first results are a mixed blessing. We show ...
AbstractRecently the authors have defined a coherent prohomotopy category of topological spaces CPHT...
Given a connected space X, we consider the eect of Quillen's plus construction on the homotopy ...
AbstractIn this paper we consider the theory of higher order homotopy coalgebras as a collection of ...
AbstractIn this paper we consider the theory of higher order homotopy coalgebras as a collection of ...
Using obstruction theory tools to a pair of spaces two invariants are defined whose vanishing is a n...
The spaces considered throughout are H-spaces and the maps are usually H-maps, fibrations or cofibra...
This thesis studies the geometric properties related to certain transversality statements on singula...
Abstract. We present a constructive method to compute the cellularization with respect to BmZ/p for ...
The homotopy of chain maps on preabelian categories is investigated and the equality of standard hom...
In this project we will mainly be concerned with trying to understand cohomo-logical obstructions to...
We have three somewhat independent sets of results. Our first results are a mixed blessing. We show ...
The basic problem of homotopy theory is to classify spaces and maps between spaces, up to homotopy, ...
AbstractOne considers the category inv-Top of inverse systems of topological spaces and the related ...
Homotopy theory and C* algebras are central topics in contemporary mathematics. This book introduces...
We have three somewhat independent sets of results. Our first results are a mixed blessing. We show ...
AbstractRecently the authors have defined a coherent prohomotopy category of topological spaces CPHT...
Given a connected space X, we consider the eect of Quillen's plus construction on the homotopy ...
AbstractIn this paper we consider the theory of higher order homotopy coalgebras as a collection of ...
AbstractIn this paper we consider the theory of higher order homotopy coalgebras as a collection of ...
Using obstruction theory tools to a pair of spaces two invariants are defined whose vanishing is a n...
The spaces considered throughout are H-spaces and the maps are usually H-maps, fibrations or cofibra...
This thesis studies the geometric properties related to certain transversality statements on singula...
Abstract. We present a constructive method to compute the cellularization with respect to BmZ/p for ...
The homotopy of chain maps on preabelian categories is investigated and the equality of standard hom...
In this project we will mainly be concerned with trying to understand cohomo-logical obstructions to...
We have three somewhat independent sets of results. Our first results are a mixed blessing. We show ...
The basic problem of homotopy theory is to classify spaces and maps between spaces, up to homotopy, ...
AbstractOne considers the category inv-Top of inverse systems of topological spaces and the related ...
Homotopy theory and C* algebras are central topics in contemporary mathematics. This book introduces...
We have three somewhat independent sets of results. Our first results are a mixed blessing. We show ...
AbstractRecently the authors have defined a coherent prohomotopy category of topological spaces CPHT...
Given a connected space X, we consider the eect of Quillen's plus construction on the homotopy ...