AbstractThe homology of a homotopy inverse limit can be studied by a spectral sequence which has as the E2 term the derived functor of limit in the category of coalgebras. These derived functors can be computed using the theory of Dieudonné modules if one has a diagram of connected abelian Hopf algebras
Abstract. In homotopy theory, exact sequences and spectral sequences consist of groups and pointed s...
AbstractFor a coaugmented functor J on spaces, we consider J-modules and finite J-limits. The former...
AbstractIn this paper, we consider for any free presentation G=F/R of a group G the coinvariance H0(...
Abstract: The homology of a homotopy inverse limit can be studied by a spectral sequence with has E2...
AbstractThe homology of a homotopy inverse limit can be studied by a spectral sequence which has as ...
AbstractA number of spectral sequences arising in homotopy theory have the derived functors of a gra...
This is the first part of a paper on spectral sequences in an abelian category scr K. Here the autho...
Given an oriented link diagram we construct a spectrum whose homotopy type is a link invariant and w...
The origin of these investigations was the successful attempt by myself and coauthors to generalize ...
AbstractIn this note we give a model category theoretic interpretation of the homotopy colimit of th...
AbstractWe develop the homological algebra of coefficient systems on a group, in particular from the...
AbstractFor any projective system of bounded below (cochain) complexes {Ci∗}, there exists two conve...
AbstractWe show in this paper how to represent intrinsically Čech homology of compacta, in terms of ...
This paper is concerned with a study of the structure of infinite dimensional manifolds, giving info...
We develop the homological algebra of coefficient systems on a group, in particular from the point o...
Abstract. In homotopy theory, exact sequences and spectral sequences consist of groups and pointed s...
AbstractFor a coaugmented functor J on spaces, we consider J-modules and finite J-limits. The former...
AbstractIn this paper, we consider for any free presentation G=F/R of a group G the coinvariance H0(...
Abstract: The homology of a homotopy inverse limit can be studied by a spectral sequence with has E2...
AbstractThe homology of a homotopy inverse limit can be studied by a spectral sequence which has as ...
AbstractA number of spectral sequences arising in homotopy theory have the derived functors of a gra...
This is the first part of a paper on spectral sequences in an abelian category scr K. Here the autho...
Given an oriented link diagram we construct a spectrum whose homotopy type is a link invariant and w...
The origin of these investigations was the successful attempt by myself and coauthors to generalize ...
AbstractIn this note we give a model category theoretic interpretation of the homotopy colimit of th...
AbstractWe develop the homological algebra of coefficient systems on a group, in particular from the...
AbstractFor any projective system of bounded below (cochain) complexes {Ci∗}, there exists two conve...
AbstractWe show in this paper how to represent intrinsically Čech homology of compacta, in terms of ...
This paper is concerned with a study of the structure of infinite dimensional manifolds, giving info...
We develop the homological algebra of coefficient systems on a group, in particular from the point o...
Abstract. In homotopy theory, exact sequences and spectral sequences consist of groups and pointed s...
AbstractFor a coaugmented functor J on spaces, we consider J-modules and finite J-limits. The former...
AbstractIn this paper, we consider for any free presentation G=F/R of a group G the coinvariance H0(...
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