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130307s2013 gw a ob 001 0 eng d |
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0 |
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|a 515.73
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|a UAMI
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245 |
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|a Function spaces.
|n Volume 1 /
|c Luboš Pick [and others].
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250 |
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|a 2nd rev. and extended ed.
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260 |
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|a Berlin :
|b De Gruyter,
|c 2013.
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300 |
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|a 1 online resource (xv, 479 pages) :
|b illustrations
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336 |
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|a text
|b txt
|2 rdacontent
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|a computer
|b c
|2 rdamedia
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|a online resource
|b cr
|2 rdacarrier
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|a De Gruyter series in nonlinear analysis and applications,
|x 0941-813X ;
|v 14
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504 |
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|a Includes bibliographical references and index.
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|a Preface; 1 Preliminaries; 1.1 Vector space; 1.2 Topological spaces; 1.3 Metric, metric space; 1.4 Norm, normed linear space; 1.5 Modular spaces; 1.6 Inner product, inner product space; 1.7 Convergence, Cauchy sequences; 1.8 Density, separability; 1.9 Completeness; 1.10 Subspaces; 1.11 Products of spaces; 1.12 Schauder bases; 1.13 Compactness; 1.14 Operators (mappings); 1.15 Isomorphism, embeddings; 1.16 Continuous linear functionals; 1.17 Dual space, weak convergence; 1.18 The principle of uniform boundedness; 1.19 Reflexivity; 1.20 Measure spaces: general extension theory.
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|a 1.21 The Lebesgue measure and integral1.22 Modes of convergence; 1.23 Systems of seminorms, Hahn-Saks theorem; 2 Spaces of smooth functions; 2.1 Multiindices and derivatives; 2.2 Classes of continuous and smooth functions; 2.3 Completeness; 2.4 Separability, bases; 2.5 Compactness; 2.6 Continuous linear functionals; 2.7 Extension of functions; 3 Lebesgue spaces; 3.1 Lp-classes; 3.2 Lebesgue spaces; 3.3 Mean continuity; 3.4 Mollifiers; 3.5 Density of smooth functions; 3.6 Separability; 3.7 Completeness; 3.8 The dual space; 3.9 Reflexivity; 3.10 The space L8; 3.11 Hardy inequalities.
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|a 6.4 Reflexivity of Banach function spaces6.5 Separability in Banach function spaces; 7 Rearrangement-invariant spaces; 7.1 Nonincreasing rearrangements; 7.2 Hardy-Littlewood inequality; 7.3 Resonant measure spaces; 7.4 Maximal nonincreasing rearrangement; 7.5 Hardy lemma; 7.6 Rearrangement-invariant spaces; 7.7 Hardy-Littlewood-Pólya principle; 7.8 Luxemburg representation theorem; 7.9 Fundamental function; 7.10 Endpoint spaces; 7.11 Almost-compact embeddings; 7.12 Gould space; 8 Lorentz spaces; 8.1 Definition and basic properties; 8.2 Embeddings between Lorentz spaces.
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|a This is the first part of the second revised and extended edition of a well established monograph. It is an introduction to function spaces defined in terms of differentiability and integrability classes. It provides a catalogue of various spaces and benefits as a handbook for those who use function spaces to study other topics such as partial differential equations. Volume 1 deals with Banach function spaces, Volume 2 with Sobolev-type spaces.
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546 |
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|a English.
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590 |
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|a eBooks on EBSCOhost
|b EBSCO eBook Subscription Academic Collection - Worldwide
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590 |
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|a ProQuest Ebook Central
|b Ebook Central Academic Complete
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650 |
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0 |
|a Ideal spaces.
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650 |
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|a Sobolev spaces.
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650 |
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|a Function spaces.
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650 |
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4 |
|a Function spaces
|v Congresses.
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650 |
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4 |
|a Functional analysis.
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650 |
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4 |
|a Mathematics.
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650 |
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6 |
|a Espaces parfaits.
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650 |
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6 |
|a Espaces de Sobolev.
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650 |
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6 |
|a Espaces fonctionnels.
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650 |
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7 |
|a MATHEMATICS
|x Transformations.
|2 bisacsh
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650 |
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7 |
|a Function spaces
|2 fast
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650 |
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7 |
|a Ideal spaces
|2 fast
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650 |
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|a Sobolev spaces
|2 fast
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700 |
1 |
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|a Pick, Luboš.
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758 |
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|i has work:
|a Volume 1 Function spaces (Text)
|1 https://id.oclc.org/worldcat/entity/E39PCG6Qq4HhwJrYH4fxqrhMpq
|4 https://id.oclc.org/worldcat/ontology/hasWork
|
776 |
0 |
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|i Print version:
|a Kufner, Alois.
|t Function Spaces, Volume 1.
|d Berlin : De Gruyter, ©2012
|z 9783110250411
|
830 |
|
0 |
|a De Gruyter series in nonlinear analysis and applications ;
|v 14.
|x 0941-813X
|
856 |
4 |
0 |
|u https://ebookcentral.uam.elogim.com/lib/uam-ebooks/detail.action?docID=894068
|z Texto completo
|
880 |
8 |
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|6 505-00/(S
|a 3.12 Sequence spaces 3.13 Modes of convergence; 3.14 Compact subsets; 3.15 Weak convergence; 3.16 Isomorphism of Lp(O) and Lp(0, μ(O)); 3.17 Schauder bases; 3.18 Weak Lebesgue spaces; 3.19 Remarks; 4 Orlicz spaces; 4.1 Introduction; 4.2 Young function, Jensen inequality; 4.3 Complementary functions; 4.4 The Δ2-condition; 4.5 Comparison of Orlicz classes; 4.6 Orlicz spaces; 4.7 Hölder inequality in Orlicz spaces; 4.8 The Luxemburg norm; 4.9 Completeness of Orlicz spaces; 4.10 Convergence in Orlicz spaces; 4.11 Separability; 4.12 The space EΦ(Ω); 4.13 Continuous linear functionals.
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|6 505-00/(S
|a 4.14 Compact subsets of Orlicz spaces 4.15 Further properties of Orlicz spaces; 4.16 Isomorphism properties, Schauder bases; 4.17 Comparison of Orlicz spaces; 5 Morrey and Campanato spaces; 5.1 Introduction; 5.2 Marcinkiewicz spaces; 5.3 Morrey and Campanato spaces; 5.4 Completeness; 5.5 Relations to Lebesgue spaces; 5.6 Some lemmas; 5.7 Embeddings; 5.8 The John-Nirenberg space; 5.9 Another definition of the space JN(Q); 5.10 Spaces Np; λ(Q); 5.11 Miscellaneous remarks; 6 Banach function spaces; 6.1 Banach function spaces; 6.2 Associate space; 6.3 Absolute continuity of the norm.
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