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of topological spaces by inverting the suspension functor, yielding a ‘linear ’ approximation to the homotopy category of spaces. The isomorphism classes of objects in the stable homotop
Abstract. We study endonite objects in a compactly generated triangulated cat-egory in terms of idea...
We begin with the observation that a group G is just a category with one object where every morphism...
Krause H, Reichenbach U. Endofiniteness in stable homotopy theory. Transactions of the American Math...
AbstractStable homotopy theories, i.e. pointed theories for which the suspension is an equivalence, ...
AbstractWe show that the monoidal product on the stable homotopy category of spectra is essentially ...
Abstract. We show that the monoidal product on the stable homotopy category of spectra is essentiall...
The stable homotopy category has been extensively studied by algebraic topologists for a long time. ...
Schwede S. Stable homotopy of algebraic theories. Ergänzungsreihe / Universität Bielefeld, Sonderfor...
In this paper we advertise the category of Γ-spaces as a convenient framework for doing ‘algebra ’ o...
The beginning graduate student in homotopy theory is confronted with a vast literature on spectra th...
Abstract. In this paper, I will prove the Freudenthal suspension theorem, and use that to explain wh...
An abstract homotopy theory is a situation in which one has a category with a class of ``weak equiva...
An abstract homotopy theory is a situation in which one has a category with a class of ``weak equiva...
AbstractIf A is a complete and cocomplete abelian category, which we allow ourselves to conflate wit...
We begin with the observation that a group G is just a category with one object where every morphism...
Abstract. We study endonite objects in a compactly generated triangulated cat-egory in terms of idea...
We begin with the observation that a group G is just a category with one object where every morphism...
Krause H, Reichenbach U. Endofiniteness in stable homotopy theory. Transactions of the American Math...
AbstractStable homotopy theories, i.e. pointed theories for which the suspension is an equivalence, ...
AbstractWe show that the monoidal product on the stable homotopy category of spectra is essentially ...
Abstract. We show that the monoidal product on the stable homotopy category of spectra is essentiall...
The stable homotopy category has been extensively studied by algebraic topologists for a long time. ...
Schwede S. Stable homotopy of algebraic theories. Ergänzungsreihe / Universität Bielefeld, Sonderfor...
In this paper we advertise the category of Γ-spaces as a convenient framework for doing ‘algebra ’ o...
The beginning graduate student in homotopy theory is confronted with a vast literature on spectra th...
Abstract. In this paper, I will prove the Freudenthal suspension theorem, and use that to explain wh...
An abstract homotopy theory is a situation in which one has a category with a class of ``weak equiva...
An abstract homotopy theory is a situation in which one has a category with a class of ``weak equiva...
AbstractIf A is a complete and cocomplete abelian category, which we allow ourselves to conflate wit...
We begin with the observation that a group G is just a category with one object where every morphism...
Abstract. We study endonite objects in a compactly generated triangulated cat-egory in terms of idea...
We begin with the observation that a group G is just a category with one object where every morphism...
Krause H, Reichenbach U. Endofiniteness in stable homotopy theory. Transactions of the American Math...
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