05506nam 2200685 450 991014123580332120170809153947.01-118-03272-11-118-03097-4(CKB)2670000000128101(EBL)694708(OCoLC)773828472(SSID)ssj0000597325(PQKBManifestationID)11369713(PQKBTitleCode)TC0000597325(PQKBWorkID)10577693(PQKB)10487775(MiAaPQ)EBC694708(PPN)169656292(EXLCZ)99267000000012810120160816h20002000 uy 0engur|n|---|||||txtccrApplied functional analysis /Jean-Pierre Aubin ; exercises by Bernard Cornet and Jean-Michel Lasry ; translated by Carole Labrousse2nd ed.New York, New York :John Wiley & Sons, Inc.,2000.©20001 online resource (520 p.)Pure and Applied Mathematics: A Wiley-Interscience Series of Texts, Monographs and Tracts"A Wiley-Interscience Publication."0-471-17976-0 Includes bibliographical references and index.APPLIED FUNCTIONAL ANALYSIS; CONTENTS; Preface; Introduction: A Guide to the Reader; 1. The Projection Theorem; 1.1. Definition of a Hilbert Space; 1.2. Review of Continuous Linear and Bilinear Operators; 1.3. Extension of Continuous Linear and Bilinear Operators by Density; 1.4. The Best Approximation Theorem; 1.5. Orthogonal Projectors; 1.6. Closed Subspaces, Quotient Spaces, and Finite Products of Hilbert Spaces; *1.7. Orthogonal Bases for a Separable Hilbert Space; 2. Theorems on Extension and Separation; 2.1. Extension of Continuous Linear and Bilinear Operators; 2.2. A Density Criterion2.3. Separation Theorems2.4. A Separation Theorem in Finite Dimensional Spaces; 2.5. Support Functions; *2.6. The Duality Theorem in Convex Optimization; *2.7. Von Neumann's Minimax Theorem; *2.8. Characterization of Pareto Optima; 3. Dual Spaces and Transposed Operators; 3.1. The Dual of a Hilbert Space; 3.2. Realization of the Dual of a Hilbert Space; 3.3. Transposition of Operators; 3.4. Transposition of Injective Operators; 3.5. Duals of Finite Products, Quotient Spaces, and Closed or Dense Subspaces; 3.6. The Theorem of Lax-Milgram; *3.7. Variational Inequalities*3.8. Noncooperative Equilibria in n-Person Quadratic Games4. The Banach Theorem and the Banach-Steinhaus Theorem; 4.1. Properties of Bounded Sets of Operators 7; 4.2. The Mean Ergodic Theorem; 4.3. The Banach Theorem; 4.4. The Closed Range Theorem; 4.5. Characterization of Left Invertible Operators; 4.6. Characterization of Right Invertible Operators; *4.7. Quadratic Programming with Linear Constraints; 5. Construction of Hilbert Spaces; 5.1. The Initial Scalar Product; 5.2. The Final Scalar Product; 5.3. Normal Subspaces of a Pivot Space5.4. Minimal and Maximal Domains of a Closed Family of Operators*5.5. Unbounded Operators and Their Adjoints; *5.6. Completion of a Pre-Hilbert Space Contained in a Hilbert Space; *5.7. Hausdorff Completion; *5.8. The Hilbert Sum of Hilbert Spaces; *5.9. Reproducing Kernels of a Hilbert Space of Functions 1; 6. L2 Spaces and Convolution Operators; 6.1. The Space L2(Ω) of Square Integrable Functions; 6.2. The Spaces L2(Ω, a) with Weights; 6.3. The Space Hs; 6.4. The Convolution Product for Functions of L0( Rn) and of L1(Rn); 6.5. Convolution Operators; 6.6. Approximation by Convolution*6.7. Example. Convolution Power for Characteristic Functions*6.8. Example. Convolution Product for Polynomials: Appell Polynomials; 7. Sobolev Spaces of Functions of One Variable; 7.1. The Space H0m(Ω) and Its Dual H-m(Ω); 7.2. Definition of Distributions; 7.3. Differentiation of Distributions; 7.4. Relations Between H0m(Ω) and H0m(R); 7.5. The Sobolev Space Hm(Ω); 7.6. Relations Between Hm(Ω) and Hm(R); *7.7. Characterization of the Dual of Hm(Ω); 7.8. Trace Theorems; 7.9. Convolution of Distributions; 8. Some Approximation Procedures in Spaces of Functions8.1. Approximation by Orthogonal PolynomialsA novel, practical introduction to functional analysisIn the twenty years since the first edition of Applied Functional Analysis was published, there has been an explosion in the number of books on functional analysis. Yet none of these offers the unique perspective of this new edition. Jean-Pierre Aubin updates his popular reference on functional analysis with new insights and recent discoveries-adding three new chapters on set-valued analysis and convex analysis, viability kernels and capture basins, and first-order partial differential equations. He presents, for the first time at aPure and Applied Mathematics: A Wiley Series of Texts, Monographs and TractsFunctional analysisHilbert spaceFunctional analysis.Hilbert space.515.7515/.7Aubin Jean Pierre54013Cornet B.Lasry J. M.Labrousse CaroleMiAaPQMiAaPQMiAaPQBOOK9910141235803321Applied functional analysis32464UNINA