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 Partielle Differentialgleichungen der Geometrie und der Physik. English
 Sauvigny, Friedrich.
 Berlin : Springer, 2006.
 Description
 Book — xiv, 388 p. : ill.
 River Edge, N.J. : World Scientific, 2001.
 Description
 Book — 1 online resource (xiii, 458 pages) : illustrations Digital: data file.
 Summary

 Boundary value problems and initial value problems for partial differential equations applications of functionalanalytic and complex methods to mathematical physics partial complex differential equations in the plane complex methods in higher dimensions.
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 Alvarado, Ryan, author.
 Cham : Springer, [2015]
 Description
 Book — viii, 486 pages : illustrations (some color) ; 24 cm.
 Summary

 Introduction.  Geometry of QuasiMetric Spaces. Analysis on Spaces of Homogeneous Type. Maximal Theory of Hardy Spaces. Atomic Theory of Hardy Spaces. Molecular and Ionic Theory of Hardy Spaces. Further Results. Boundedness of Linear Operators Defined on Hp(X). Besov and TriebelLizorkin Spaces on AhlforsRegular QuasiMetric Spaces.
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Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Serials  Request 
Shelved by Series title V.2142  Unknown 
 AndreuVaillo, Fuensanta.
 Basel : Birkhäuser Basel : Imprint : Birkhäuser, 2004.
 Description
 Book — 1 online resource (xiv, 342 pages).
 Summary

 1 Total Variation Based Image Restoration. 1.1 Introduction. 1.2 Equivalence between Constrained and Unconstrained Restoration. 1.3 The Partial Differential Equation Satisfied by the Minimum of (1.17). 1.4 Algorithm and Numerical Experiments. 1.5 Review of Numerical Methods. 2 The Neumann Problem for the Total Variation Flow. 2.1 Introduction. 2.2 Strong Solutions in L2(?). 2.3 The Semigroup Solution in L1(?). 2.4 Existence and Uniqueness of Weak Solutions. 2.5 An LNL? Regularizing Effect. 2.6 Asymptotic Behaviour of Solutions. 2.7 Regularity of the Level Lines. 3 The Total Variation Flow in ?N. 3.1 Initial Conditions in L2(?N). 3.2 The Notion of Entropy Solution. 3.3 Uniqueness in Lo(?N). 3.4 Existence in Lloc1. 3.5 Initial Conditions in L2(?N). 3.6 Time Regularity. 3.7 An LNL? Regularizing Effect. 3.8 Measure Initial Conditions. 4 Asymptotic Behaviour and Qualitative Properties of Solutions. 4.1 Radially Symmetric Explicit Solutions. 4.2 Some Qualitative Properties. 4.3 Asymptotic Behaviour. 4.4 Evolution of Sets in ?2: The Connected Case. 4.5 Evolution of Sets in ?2: The Nonconnected Case. 4.6 Some Examples. 4.7 Explicit Solutions for the Denoising Problem. 5 The Dirichlet Problem for the Total Variation Flow. 5.1 Introduction. 5.2 Definitions and Preliminary Facts. 5.3 The Main Result. 5.4 The Semigroup Solution. 5.5 Strong Solutions for Data in L2(?). 5.6 Existence and Uniqueness for Data in L1(?). 5.7 Regularity for Positive Initial Data. 6 Parabolic Equations Minimizing Linear Growth Functionals: L2Theory. 6.1 Introduction. 6.2 Preliminaries. 6.3 The Existence and Uniqueness Result. 6.4 Strong Solution for Data in L2(?)). 6.5 Asymptotic Behaviour. 6.6 Proof of the Approximation Lemma. 7 Parabolic Equations Minimizing Linear Growth Functionals: L1Theory. 7.1 Introduction. 7.2 The Main Result. 7.3 The Semigroup Solution. 7.4 Existence and Uniqueness for Data in L1(?). 7.5 A Remark for Strictly Convex Lagrangians. 7.6 The Cauchy Problem. A Nonlinear Semigroups. A.1 Introduction. A.2 Abstract Cauchy Problem. A.3 Mild Solutions. A.4 Accretive Operators. A.5 Existence and Uniqueness Theorem. A.6 Regularity of Mild Solutions. A.7 Completely Accretive Operators. B Functions of Bounded Variation. B.2 Approximation by Smooth Functions. B.3 Traces and Extensions. B.4 Sets of Finite Perimeter and the Coarea Formula. B.5 Some Isoperimetric Inequalities. B.6 The Reduced Boundary. B.7 Connected Components of Sets of Finite Perimeter. C Pairings Between Measures and Bounded Functions. C.1 Trace of the Normal Component of Certain Vector Fields. Dankwoord/ Acknowledgements.
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25. Crack Theory and Edge Singularities [2003]
 Kapanadze, David.
 Dordrecht : Springer Netherlands, 2003.
 Description
 Book — 1 online resource (xxvii, 485 pages).
 Summary

 Preface. Introduction.
 1: Boundary value problems with the transmission property. 1.1. Symbolic calculus and pseudodifferential operators. 1.2. Parameterdependent boundary value problems. 1.3. General kernel cutoff constructions. 1.4. Notes and complementary remarks.
 2: Operators on manifolds with conical singularities. 2.1. Mellin operators and cone asymptotics. 2.2. The cone algebra. 2.3. Analytic functionals and asymptotics. 2.4. Notes and complementary remarks.
 3: Operators on manifolds with exits to infinity. 3.1. Scalar operators. 3.2. Calculus with operatorvalued symbols. 3.3. Boundary value problems on manifolds with exits to infinity. 3.4. Notes and complementary remarks.
 4: Boundary value problems on manifolds with edges. 4.1. Manifolds with edges and typical operators. 4.2. Weighted Sobolov spaces. 4.3. Operator conventions in the edge pseudodifferential calculus. 4.4. Operatorvalued edge symbols. 4.5. The algebra of edge boundary value problems. 4.6. Further material on edge operators. 4.7. Notes and complementary remarks.
 5: Crack theory. 5.1. Differential operators in crack configurations. 5.2. Parameterdependent calculus in the model cone. 5.3. Local crack theory. 5.4. The global calculus. 5.5. Notes and complementary remarks. Bibliography. List of Symbols. Index.
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 Rassias, Themistocles M.
 Dordrecht : Springer Netherlands, 2003.
 Description
 Book — 1 online resource (ix, 224 pages)
 Summary

 1 HyersUlam stability of a quadratic functional equation in Banach modules. 2 Cauchy and Pexider operators in some function spaces. 3 The median principle for inequalities and applications. 4 On the HyersUlamRassias stability of a Pexiderized quadratic equation II. 5 On the HyersUlamRassias stability of a functional equation. 6 A pair of functional inequalities of iterative type related to a Cauchy functional equation. 7 On approximate algebra homomorphisms. 8 Hadamard and DragomirAgarwal inequalities, the Euler formulae and convex functions. 9 On Ulam stability in the geometry of PDE's. 10 On certain functional equations and mean value theorems. 11 Some general approximation error and convergence rate estimates in statistical learning theory. 12 Functional equations on hypergroups. 13 The generalized Cauchy functional equation. 14 On the AleksandrovRassias problem for isometric mappings.
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 Lupo, Daniela.
 Basel : Birkhäuser Basel, 2003.
 Description
 Book — 1 online resource (VIII, 267 pages).
 Summary

 A Riemann Mapping Type Theorem in Higher Dimensions, Part I: The Conformally Flat Case with Umbilic Boundary
 Computable Information Content and a Simple Application to the Study of DNA
 Bounded Positive Critical Points of Some Multiple Integrals of the Calculus of Variations
 Hilbert Type Numbers for Polynomial ODE's
 S2type Parametric Surfaces with Prescribed Mean Curvature and Minimal Energy
 Representations of Solutions of HamiltonJacobi Equations
 Nonexistence of Global Solutions of Higher Order Evolution Inequalities in?N
 Morse Index Computations for a Class of Functionals Defined in Banach Spaces
 A Global Compactness Result for Elliptic Problems with Critical Nonlinearity on Symmetric Domains
 Variational Methods for Functionals with Lack of Strict Convexity
 Some Remarks on the Semilinear Wave Equation
 Unique Continuation Principles for Some Equations of BenjaminOno Type
 Wellposedness Results for the Modified ZakharovKuznetsov Equation
 A Class of Isoinertial One Parameter Families of Selfadjoint Operators
 Traveling Waves in Nonlinearly Supported Beams and Plates
 Solitary Waves Solutions of a Nonlinear Schrödinger Equation
 Nontrivial Solutions of a Class of Quasilinear Elliptic Problems Involving Critical Exponents
 Solutions of Semilinear Problems in Symmetric Planar Domains
 ODE Behavior and Uniqueness of Branches
 Solutions of an AllenCahn Model Equation
 Some Equations of Nongeometrical Optics
 Speakers.
 Albeverio, Sergio.
 Basel : Birkhäuser Basel : Imprint : Birkhäuser, 2003.
 Description
 Book — 1 online resource (VII, 437 pages).
 Summary

 Contributions: Nonlinear PDE. Singularities, Propagation, Applications (P.R. Popivanov)
 From Wave to KleinGordon Type Decay Rates (F. Hirosawa and M. Reissig)
 Local Solutions to Quasilinear Qeakly Hyperbolic Differential Equations (M. Dreher)
 S(M, g)pseudodifferential Calculus of Manifolds (F. Baldus)
 Domain Perturbations and Capacity in General Hilbert Spaces and Applications to Spectral Theory (A. Noll)
 An Interpolation Family between Gabor and Wavelet Transformations (B. Nazaret and M. Holschneider)
 Formes de Torsion Analytique et Fibrations Singulires (Xiaonan Ma)
 Regularisation of Secondary Characteristic Classes and Unusual Index Formulas for OperatorValued Symbols (G. Rozenblum).
 Maso, Gianni.
 Basel : Birkhäuser Basel : Imprint : Birkhäuser, 2002.
 Description
 Book — 1 online resource (x, 185 pages).
 Summary

 A Model for Mixtures of Micromagnetic Materials allowing Existence and Regularity
 Variational Properties of a Model for Image Segmentation with Overlapping Regions
 Variational Theory of Weak Geometric Structures
 Optimal Transportation Problems with Free Dirichlet Regions
 Local Minimizers for a Free Gradient Discontinuity Problem in Image Segmentation
 Irrigation
 Symmetrization and Functionals Defined on BV
 Interface Energies and Structured Deformations in Plasticity
 Higher Order Variational Problems and Phase Transitions in Nonlinear Elasticity
 Unstable Crystalline Wulff Shapes in 3D
 Dimension Reduction in Continuum Mechanics
 ReactionDiffusion Equations and Learning
 Contributors
 List of Participants.
 Roitberg, Yakov.
 Dordrecht : Springer Netherlands, 1996.
 Description
 Book — 1 online resource (xi, 420 pages).
 Summary

 Preface.
 0. Introduction.
 1. Functional Spaces.
 2. Space Hs, p, (r)(Omega)
 3. Elliptic BoundaryValue Problem.
 4. Theorem on Complete Collection of Isomorphisms.
 5. Elliptic Problems with Normal Boundary Conditions.
 6. Traces of Generalized Solutions of Elliptic Equations on the Boundary of the Domain.
 7. Local Increase in the Smoothness of Generalized Solutions of Elliptic BoundaryValue Problems, Green's Functions.
 8. Elliptic Problems with Power Singularities on the RightHand Sides. Degenerate Elliptic Problems.
 9. Elliptic BoundaryValue Problems with a Parameter.
 10. Elliptic BoundaryValue Problems for Systems of Equations. Bibliographical Notes. References. Subject Index. Notation.
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 Grubb, Gerd.
 Second edition.  Boston, MA : Birkhäuser Boston : Imprint : Birkhäuser, 1996.
 Description
 Book — 1 online resource (ix, 526 pages).
 Summary

 1. Standard pseudodifferential boundary problems and their realizations.
 2. The calculus of parameterdependent operators.
 3. Parametrix and resolvent constructions.
 4. Some applications. Appendix. Various prerequisites.
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 Křížek, Michal.
 Dordrecht : Springer Netherlands, 1996.
 Description
 Book — 1 online resource (xiii, 300 pages).
 Summary

 Glossary of Symbols. Foreword.
 1. Introduction.
 2. Mathematical Modelling of Physical Phenomena.
 3. Mathematical Background.
 4. Finite Elements.
 5. Conjugate Gradients.
 6. Magnetic Potential of Transformer Window.
 7. Calculation of Nonlinear Stationary Magnetic Fields.
 8. SteadyState Radiation Heat Transfer Problem.
 9. Nonlinear Anisotropic Heat Conduction in a Transformer Magnetic Core.
 10. Stationary Semiconductor Equations.
 11. Nonstationary Heat Conduction in a Stator.
 12. The TimeHarmonic Maxwell Equations.
 13. Approximation of the Maxwell Equations in Anisotropic Inhomogeneous Media.
 14. Methods for Optimal Shape Design of Electrical Devices. References. Author index. Subject index.
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 Cea, Jean.
 Boston, MA : Birkhäuser Boston, 1996.
 Description
 Book — 1 online resource.
 Summary

 Problèmes aux limites dans des domaines avec points de rebroussement
 Elliptic Problems in Domains with Edges: Anisotropic Regularity and Anisotropic Finite Element Meshes
 Unique Continuation of Harmonic Functions at Boundary Points and Applications to Problems in Complex Analysis
 The Wave Shaping Problem
 Modélisation mathématique des coques linéairement élastiques
 Fully Nonlinear Equations by Linearization and Maximal Regularity and Applications
 Strongly Elliptic Problems near Cuspidal Points and Edges
 Star produit associé à un crochet de Poisson de rang constant
 La méthode des lâchées de tourbillons pour le calcul des efforts aérodynamiques
 Sum of Operators' Method in Abstract Equations
 Constructive Methods for Abstract Differential Equations and Applications
 On Asymptotics of Solutions of Nonlinear Second Order Elliptic Equations in Cylindrical Domains
 Singularities to Solutions in Mathematical Physics Problems in NonSmooth Domains
 Problèmes sensitifs et coques élastiques minces
 Contrôlabilite exacte frontière de l'équation des ondes en présence de singularités
 Interpolation and Extrapolation Spaces in Evolution Equations
 Localisation des singularités sur la frontière et partitions de l'unité
34. Banach Space Complexes [1995]
 Ambrozie, CǎlinGrigore.
 Dordrecht : Springer Netherlands : Imprint : Springer, 1995.
 Description
 Book — 1 online resource (212 pages).
 Summary

 I Preliminaries
 II SemiFredholm complexes
 III Related topics
 Notations.
 Szmydt, Zofia.
 Dordrecht : Springer Netherlands, 1992.
 Description
 Book — 1 online resource (xiv, 222 pages).
 Summary

 I. Introduction.
 1. Terminology and notation.
 2. Elementary facts on complex topological vector spaces.
 1. Multinormed complex vector spaces and their duals.
 2. Inductive and projective limits.
 3. Subspaces. The HahnBanach theorem. Exercise.
 3. A review of basic facts in the theory of distributions.
 1. Spaces DK and (DK)1.
 2. Spaces D(A) and D'(A).
 3. Spaces S and S1.
 4. Spaces E and E1.
 5. Substitution in distributions. Homogeneous distributions.
 6. Classical order of a distribution and extendibility theorems for distributions.
 7. Convolution of distributions.
 8. Tensor product of distributions. Exercises. II. Mellin distributions and the Mellin transformation.
 4. The Fourier and the FourierMellin transformations.
 1. The Fourier transformation in S1.
 2. The FourierMellin transformation in the space of Mellin distributions with support in % MathType!MTEF!2!1!+ % feaagCart1ev2aaatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn % hiov2DGi1BTfMBaeXatLxBI9gBaerbd9wDYLwzYbItLDharqqtubsr % 4rNCHbGeaGqiVu0Je9sqqrpepC0xbbL8F4rqqrFfpeea0xe9LqJc9 % vqaqpepm0xbba9pwe9Q8fs0yqaqpepae9pg0FirpepeKkFr0xfrx % frxb9adbaqaaeaaciGaaiaabeqaamaabaabaaGcbaWexLMBb50ujb % qegWuDJLgzHbIrHHhaiuqacqWFsbGufaqabeGabaaabaqcLbqacGao % 4pOBaaGcbaqcLbqacWaGaI7q8VHRaWkaaaaaa!450D!$$ R\begin{array}{*{20}{c}} n \\ + \end{array} $$. Exercises.
 5. The spaces of Mellin distributions with support in a polyinterval.
 1. Spaces Ma, ((0, t]) and M1a ((0, t]).
 2. Spaces M(?) ((0, t]) and M1(?) ((0, t]). Exercises.
 6. Operations of multiplication and differentiation in the space of Mellin distributions.
 1. Multiplication and differentiation in Ma, M(?) and their duals.
 2. Mellin multipliers. Exercises.
 7. The Mellin transformation in the space of Mellin distributions.
 1. The Mellin transformation in the space of Mellin distributions and its relations with the FourierLaplace transformation.
 2. Examples of Mellin transforms of some functions.
 3. Mellin transforms of certain cutoff functions. 3.1. Onedimensional smooth cutoff functions. 3.2. nDimensional smooth cutoff functions with a parameter. Exercises.
 8. The structure of Mellin distributions.
 1. Characterizations of Mellin distributions.
 2. Substitution in a Mellin distribution.
 3. Mellin order of a Mellin distribution. Exercises.
 9. PaleyWiener type theorems for the Mellin transformation. Exercises.
 10. Mellin transforms of cutoff functions (continued).
 1. Conical cutoff functions.
 2. The Kinequalities.
 3. The "tangent cones" ?K and related cutoff functions.
 4. Further investigation of the Mellin transform of a conical cutoff function. Exercises.
 11. Important subspaces of Mellin distributions.
 1. Subspaces % MathType!MTEF!2!1!+ % feaagCart1ev2aaatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn % hiov2DGi1BTfMBaeXatLxBI9gBaerbd9wDYLwzYbItLDharqqtubsr % 4rNCHbGeaGqiVu0Je9sqqrpepC0xbbL8F4rqqrFfpeea0xe9LqJc9 % vqaqpepm0xbba9pwe9Q8fs0yqaqpepae9pg0FirpepeKkFr0xfrx % frxb9adbaqaaeGaciGaaiaabeqaamaabaabaaGcbaGaamiuaiaacI % cacaWG4bWaaSaaaeaacaWGKbaabaGaamizaiaadIhaaaGaaiykaiaa % dwhacqGH9aqpcaWGMbaaaa!3EE9!$$ P(x\frac{d}{{dx}})u = f $$.
 2. Subspaces SPr(s, s1 ) of Mellin distributions.
 3. Spaces M(? ?) and Zd(? ?) of distributions with continuous radial asymptotics. Exercises.
 12. The modified Cauchy transformation.
 1. Modified Cauchy and Hilbert transformations in dimension 1.
 2. The case with parameters. Exercises. III. Fuchsian type singular operators.
 13. Fuchsian type ordinary differential operators.
 1. Asymptotic expansions.
 2. The equation % MathType!MTEF!2!1!+ % feaagCart1ev2aaatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn % hiov2DGi1BTfMBaeXatLxBI9gBaerbd9wDYLwzYbItLDharqqtubsr % 4rNCHbGeaGqiVu0Je9sqqrpepC0xbbL8F4rqqrFfpeea0xe9LqJc9 % vqaqpepm0xbba9pwe9Q8fs0yqaqpepae9pg0FirpepeKkFr0xfrx % frxb9adbaqaaeGacaGaaiaabeqaamaabaabaaGcbaGaamytamXvP5 % wqonvsaeHbmv3yPrwyGmvyUnhaiuGajugOaiadaciaaW3Leajjad % acigaa3nhaZPWaiaiG47p6VbaaSqaiaiG47p6ladaciCd9H % caOeXafv3ySLgzGmvETj2BSbacgmGamaiGW9p07xYdCNamaiGW9p0 % xkaKcabKaGaIVOpaaaa!6A3A!$$ MI{s_{(\omega )}} $$ and definition of ordinary Fuchsian type differential operators.
 3. Case of smooth coefficients.
 4. Case of analytic coefficients.
 5. Special functions as generalized analytic functions. Exercises.
 14. Elliptic Fuchsian type partial differential equations in spaces % MathType!MTEF!2!1!+ % feaagCart1ev2aaatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn % hiov2DGi1BTfMBaeXatLxBI9gBaerbd9wDYLwzYbItLDharqqtubsr % 4rNCHbGeaGqiVu0Je9sqqrpepC0xbbL8F4rqqrFfpeea0xe9LqJc9 % vqaqpepm0xbba9pwe9Q8fs0yqaqpepae9pg0FirpepeKkFr0xfrx % frxb9adbaqaaeGaciGaaiaabeqaamaabaabaaGcbaGaamiuaiaacI % cacaWG4bWaaSaaaeaacaWGKbaabaGaamizaiaadIhaaaGaaiykaiaa % dwhacqGH9aqpcaWGMbaaaa!3EE9!$$ P(x\frac{d}{{dx}})u = f $$.
 1. Existence and regularity of solutions on tangent cones ?K.
 2. Case of a proper cone. Exercise.
 15. Fuchsian type partial differential equations in spaces with continuous radial asymptotics.
 1. The radial characteristic set Charg % MathType!MTEF!2!1!+ % feaagCart1ev2aaatCvAUfeBSjuyZL2yd9gzLbvyNv2CaerbuLwBLn % hiov2DGi1BTfMBaeXatLxBI9gBaerbd9wDYLwzYbItLDharqqtubsr % 4rNCHbGeaGqiVu0Je9sqqrpepC0xbbL8F4rqqrFfpeea0xe9LqJc9 % vqaqpepm0xbba9pwe9Q8fs0yqaqpepae9pg0FirpepeKkFr0xfrx % frxb9adbaqaaeGaciGaaiaabeqaamaabaabaaGcbaGamaiJeg7aHj % acacied9cQcacGaGasWmaWGqbaaaa!4027!$$ alpha *P $$.
 2. Regularity of solutions in spaces M(? ?) and Zd(? ?). Appendix. Generalized smooth functions and theory of resurgent functions of Jean Ecalle.
 1. Introduction.
 2. Generalized Taylor expansions.
 3. Algebra of resurgent functions of Jean Ecalle.
 4. Applications. List of Symbols.
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 Huijsmans, C. B.
 Dordrecht : Springer Netherlands, 1992.
 Description
 Book — 1 online resource (vii, 152 pages)
 Summary

 Positive Operators on Krein Spaces. A Remark on the Representation of Vector Lattices as Spaces of Continuous RealValued Functions. Domination of Uniformly Continuous Semigroups. Sums and Extensions of Vector Lattice Homomorphisms. Baillon's Theorem on Maximal Regularity. FractionDense Algebras and Spaces. An Alternative Proof of a RadonNikodym Theorem for Lattice Homomorphisms. Some Remarks on Disjointness Preserving Operators. Weakly Compact Operators and Interpolation. Aspects of Local Spectral Theory for Positive Operators. A WienerYoung Type Theorem for Dual Semigroups. Krivine's Theorem and Indices of a Banach Lattice. Representations of Archimedean Riesz Spaces by Continuous Functions. Some Aspects of the Spectral Theory of Positive Operators. Problem Section.
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 Cioranescu, Ioana.
 Dordrecht : Springer Netherlands, 1990.
 Description
 Book — 1 online resource (280 pages).
 Summary

 I. Subdifferentiability and Duality Mappings.
 1. Generalities on convex functions.
 2. The subdifferential and the conjugate of a convex function.
 3. Smooth Banach spaces.
 4. Duality mappings on Banach spaces.
 5. Positive duality mappings. Exercises. Bibliographical comments. II Characterizations of Some Classes of Banach Spaces by Duality Mappings.
 1. Strictly convex Banach spaces.
 2. Uniformly convex Banach spaces.
 3. Duality mappings in reflexive Banach spaces.
 4. Duality mappings in LPspaces.
 5. Duality mappings in Banach spaces with the property (h) and (?)1. Exercises. Bibliographical comments. III Renorming of Banach Spaces.
 1. Classical renorming results.
 2. Lindenstrauss' and Trojanski's Theorems. Exercises. Bibliographical comments. IV On the Topological Degree in Finite and Infinite Dimensions.
 1. Brouwer's degree.
 2. BrowderPetryshyn's degree for Aproper mappings.
 3. Pcompact mappings. Exercises. Bibliographical comments. V Nonlinear Monotone Mappings.
 1. Demicontinuity and hemicontinuity for monotone operators.
 2. Monotone and maximal monotone mappings.
 3. The role of the duality mapping in surjectivity and maximality problems.
 4. Again on subdifferentials of convex functions. Exercises. Bibliographical comments. VI Accretive Mappings and Semigroups of Nonlinear Contractions.
 1. General properties of maximal accretive mappings.
 2. Semigroups of nonlinear contractions in uniformly convex Banach spaces.
 3. The exponential formula of CrandallLiggett.
 4. The abstract Cauchy problem for accretive mappings.
 5. Semigroups of nonlinear contractions in Hilbert spaces.
 6. The inhomogeneous case. Exercises. Bibliographical comments. References.
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38. Partial differential equations [1978]
 Different͡sial'nye uravnenii͡a v chastnykh proizvodnykh. English.
 Mikhaĭlov, V. P. (Valentin Petrovich).
 Moscow : Mir Publishers, c1978.
 Description
 Book — 396 p. : ill. ; 22 cm.
 Online

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QA374 .M6273 1978  Available 
 Buis, Gabe R.
 [Washington, National Aeronautics and Space Administration]; for sale by the Clearinghouse for Federal Scientific and Technical Information, Springfield, Va. [1968]
 Description
 Book — vii, 122 p. 27 cm.
 Summary

 pt.
 1. Lyapunov stability theory and the stability of solutions to partial differential equations, by G. R. Buis.pt.
 2. Contraction groups and equivalent norms, by W. G. Vogt, M. M. Eisen, and G. R. Buis.
 Online

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NASA CR 1100  Available 
40. Derivatives of inner functions [2013]
 Mashreghi, Javad.
 New York : Springer, 2013.
 Description
 Book — 1 online resource (x, 169 pages) : illustrations.
 Summary

 Inner Functions
 The Exceptional Set of an Inner Function
 The Derivative of Finite Blaschke Products
 Angular Derivative
 HpMeans of S'
 BpMeans of S'
 The Derivative of a Blaschke Product
 HpMeans of B'
 BpMeans of B'
 The Growth of Integral Means of B'.
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