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N. Phillips, Larry Schweitzer (1994)
Representable -theory of smooth crossed products by andTransactions of the American Mathematical Society, 344
A. Helemskiĭ (1989)
The Homology of Banach and Topological Algebras
Larry Schweitzer (1992)
Dense m-convex Frechet Subalgebras of Operator Algebra Crossed Products by Lie GroupsInternational Journal of Mathematics, 04
A. Mallios (1986)
Topological algebras - selected topics, 124
Petr Kosenko (2017)
Homological dimensions of analytic Ore extensionsInternational Journal of Mathematics
Séminaire Bourbaki, A. Grothendieck, Séminaire Bourbaki, Décembre (1966)
Produits Tensoriels Topologiques Et Espaces Nucleaires
R. Meyer (2004)
Embeddings of derived categories of bornological modulesarXiv: Functional Analysis
J. Cuntz, D. Quillen (1995)
Algebra extensions and nonsingularityJournal of the American Mathematical Society, 8
S. Neshveyev (2013)
Smooth Crossed Products of Rieffel’s DeformationsLetters in Mathematical Physics, 104
A. Pirkovskii (2008)
Arens-Michael envelopes, homological epimorphisms, and relatively quasi-free algebrasTransactions of the Moscow Mathematical Society, 69
G. Folland (1984)
Real Analysis: Modern Techniques and Their Applications
Usacheva str. 6 E-mail address
N. Phillips, Larry Schweitzer (1992)
Representable K-theory of Smooth Crossed Products by R and ZarXiv: Functional Analysis
Olivier Gabriel, Martin Grensing (2011)
Six-term exact sequences for smooth generalized crossed productsJournal of Noncommutative Geometry, 7
O. Ogneva, A. Khelemskii (1984)
Homological dimensions of certain algebras of principal (test) functionsMathematical notes of the Academy of Sciences of the USSR, 35
R. Carroll (2000)
North-Holland Mathematics Studies 186
A. Pirkovskii (2012)
Homological dimensions and Van den Bergh isomorphisms for nuclear Fréchet algebrasIzvestiya: Mathematics, 76
In this paper we provide upper estimates for the global projective dimensions of smooth crossed products S(G,A;α)\documentclass[12pt]{minimal}\usepackage{amsmath}\usepackage{wasysym}\usepackage{amsfonts}\usepackage{amssymb}\usepackage{amsbsy}\usepackage{mathrsfs}\usepackage{upgreek}\setlength{\oddsidemargin}{-69pt}\begin{document}$$\mathscr {S}(G, A; \alpha )$$\end{document} for G=R\documentclass[12pt]{minimal}\usepackage{amsmath}\usepackage{wasysym}\usepackage{amsfonts}\usepackage{amssymb}\usepackage{amsbsy}\usepackage{mathrsfs}\usepackage{upgreek}\setlength{\oddsidemargin}{-69pt}\begin{document}$$G = \mathbb {R}$$\end{document} and G=T\documentclass[12pt]{minimal}\usepackage{amsmath}\usepackage{wasysym}\usepackage{amsfonts}\usepackage{amssymb}\usepackage{amsbsy}\usepackage{mathrsfs}\usepackage{upgreek}\setlength{\oddsidemargin}{-69pt}\begin{document}$$G = \mathbb {T}$$\end{document} and a self-induced Fréchet–Arens–Michael algebra A. To do this, we provide a powerful generalization of methods which are used in the works of Ogneva and Helemskii.
Annals of Functional Analysis – Springer Journals
Published: May 17, 2021
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