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200 10$aAlternative pseudodifferential analysis $ewith an application to modular forms /$fAndre? Unterberger
205   $a1st ed. 2008.
210  1$aBerlin, Germany :$cSpringer,$d[2008]
210  4$dİ2008
215   $a1 online resource (IX, 118 p.) 
225 1 $aLecture Notes in Mathematics,$x0075-8434 ;$v1935
300   $aBibliographic Level Mode of Issuance: Monograph
311   $a3-540-77910-8 
320   $aIncludes bibliographical references and index.
327   $aPreface -- Introduction -- The Metaplectic and Anaplectic Representations -- The One-dimensional Alternative Pseudodifferential Analysis -- From Anaplectic Analysis to Usual Analysis -- Pseudodifferential Analysis and Modular Forms -- Index -- Bibliography.
330   $aThis volume introduces an entirely new pseudodifferential analysis on the line, the opposition of which to the usual (Weyl-type) analysis can be said to reflect that, in representation theory, between the representations from the discrete and from the (full, non-unitary) series, or that between modular forms of the holomorphic and substitute for the usual Moyal-type brackets. This pseudodifferential analysis relies on the one-dimensional case of the recently introduced anaplectic representation and analysis, a competitor of the metaplectic representation and usual analysis. Besides researchers and graduate students interested in pseudodifferential analysis and in modular forms, the book may also appeal to analysts and physicists, for its concepts making possible the transformation of creation-annihilation operators into automorphisms, simultaneously changing the usual scalar product into an indefinite but still non-degenerate one.
410  0$aLecture Notes in Mathematics,$x0075-8434 ;$v1935
606   $aPseudodifferential operators
606   $aForms, Modular
615  0$aPseudodifferential operators.
615  0$aForms, Modular.
676   $a515.7242
700   $aUnterberger$b Andre?$0351381
801  0$bMiAaPQ
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801  2$bMiAaPQ
906   $aBOOK
912   $a9910483664803321
996   $aAlternative pseudodifferential analysis$9258932
997   $aUNINA

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100   $a20030110h20032003  uy|            0
101 0 $aeng
135   $aur|n|---|||||
181   $ctxt
182   $cc
183   $acr
200 10$aBanach embedding properties of non-commutative L[superscript p]-spaces /$fU. Haagerup, H.P. Rosenthal, F.A. Sukochev
210  1$aProvidence, Rhode Island :$cAmerican Mathematical Society,$d[2003]
210  4$dİ2003
215   $a1 online resource (82 p.)
225 1 $aMemoirs of the American Mathematical Society,$x0065-9266 ;$vnumber 776
300   $a"Volume 163, number 776 (third of 5 numbers)."
311   $a0-8218-3271-9 
320   $aIncludes bibliographical references (pages 67-68).
327   $a""Contents""; ""Chapter 1. Introduction""; ""Chapter 2. The modulus of uniform integrability and weak compactness in L[sum(1)](N)""; ""Proof of the Main Theorem""; ""Chapter 3. Improvements to the Main Theorem""; ""Proof of Theorem 3.2""; ""Proof of Theorem 3.1""; ""Chapter 4. Complements on the Banach/operator space structure of L[sup(p)](N)-spaces""; ""Chapter 5. The Banach isomorphic classification of the spaces L[sup(p)](N) for N hyperfinite semi-finite""; ""Chapter 6. L[sup(P)](N)-isomorphism results for N a type III hyperfinite or a free group von Neumann algebra""; ""Bibliography""
410  0$aMemoirs of the American Mathematical Society ;$vno. 776.
606   $aLp spaces
606   $aNormed linear spaces
606   $aVon Neumann algebras
606   $aNoncommutative function spaces
615  0$aLp spaces.
615  0$aNormed linear spaces.
615  0$aVon Neumann algebras.
615  0$aNoncommutative function spaces.
676   $a510 s
676   $a515/.73
700   $aHaagerup$b U.$01565956
702   $aRosenthal$b Haskell P.
702   $aSukochev$b F. A.
801  0$bMiAaPQ
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996   $aBanach embedding properties of non-commutative L-spaces$93836110
997   $aUNINA