Add to ORKGThis paper arose from attempting to understand Bouseld localization func-tors in stable homotopy theory. All spectra will be p-local for a prime p throug-hout this paper. Recall that if E is a spectrum, a spectrum X is E-acyclic if E ^X is null. A spectrum is E-local if every map from an E-acyclic spectru
. We prove a modified version of Ravenel's telescope conjecture. It is shown that every smashin...
We begin by investigating analogues of the Ravenel conjectures in chromatic homotopy in the setting ...
AbstractWhen the stable homotopy category is localized with respect to ordinary topological K-theory...
We prove that stable $f$-localizations (where $f$ is any map of spectra) preserve ring spectrum stru...
The goal of this note is to present some of the relationship between some “old-fashioned ” construct...
Abstract. Let G be a nite group. We use the results of [5] to show that the Tate homology of E(n) lo...
In a paper that has attracted little notice, Priddy showed that the Brown-Peterson spectrum at a pri...
We introduce characteristics into chromatic homotopy theory. This parallels the prime characteristic...
Following a suggestion of Hovey and Strickland, we study the category of $K(k) \vee K(k+1) \vee \cdo...
We give sufficient conditions for homotopical localization functors to preserve algebras over colour...
This talk will be on several related properties of chromatic localizations of algebraic K-theory obt...
this paper turn out in fact to be homological Bousfield classes, and thus have localization functors...
This monograph on the homotopy theory of topologized diagrams of spaces and spectra gives an expert ...
Abstract. We dene and investigate a class of categories with formal proper-ties similar to those of ...
Let M n f be the localization of the ∞-category of spaces at the v n -periodic equivalences, the cas...
. We prove a modified version of Ravenel's telescope conjecture. It is shown that every smashin...
We begin by investigating analogues of the Ravenel conjectures in chromatic homotopy in the setting ...
AbstractWhen the stable homotopy category is localized with respect to ordinary topological K-theory...
We prove that stable $f$-localizations (where $f$ is any map of spectra) preserve ring spectrum stru...
The goal of this note is to present some of the relationship between some “old-fashioned ” construct...
Abstract. Let G be a nite group. We use the results of [5] to show that the Tate homology of E(n) lo...
In a paper that has attracted little notice, Priddy showed that the Brown-Peterson spectrum at a pri...
We introduce characteristics into chromatic homotopy theory. This parallels the prime characteristic...
Following a suggestion of Hovey and Strickland, we study the category of $K(k) \vee K(k+1) \vee \cdo...
We give sufficient conditions for homotopical localization functors to preserve algebras over colour...
This talk will be on several related properties of chromatic localizations of algebraic K-theory obt...
this paper turn out in fact to be homological Bousfield classes, and thus have localization functors...
This monograph on the homotopy theory of topologized diagrams of spaces and spectra gives an expert ...
Abstract. We dene and investigate a class of categories with formal proper-ties similar to those of ...
Let M n f be the localization of the ∞-category of spaces at the v n -periodic equivalences, the cas...
. We prove a modified version of Ravenel's telescope conjecture. It is shown that every smashin...
We begin by investigating analogues of the Ravenel conjectures in chromatic homotopy in the setting ...
AbstractWhen the stable homotopy category is localized with respect to ordinary topological K-theory...