Classical and Modern Potential Theory and Applications by K. GowriSankaranClassical and Modern Potential Theory and Applications by K. GowriSankaran

Classical and Modern Potential Theory and Applications

byK. GowriSankaranEditorJ. Bliedtner, D. Feyel

Paperback | November 26, 2012

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A NATO Advanced Research Workshop on Classical and Modern Potential The­ ory and Applications was held at the Chateau de Bonas, France, during the last week of July 1993. The workshop was organized by the Co-Directors M. Goldstein (Ari­ zona) and K. GowriSankaran (Montreal). The other members of the organizing committee were J. Bliedtner (Frankfurt), D. Feyel (Paris), W. K. Hayman (York, England) and I. Netuka (Praha). The objective of the workshop was to bring to­ gether the researchers at the forefront of the aspects of the Potential Theory for a meaningful dialogue and for positive interaction amongst the mathematicians prac­ tising different aspects of the theory and its applications. Fifty one mathematicians participated in the workshop. The workshop covered a fair representation of the classical aspects of the theory covering topics such as approximations, radial be­ haviour, value distributions of meromorphic functions and the modern Potential theory including axiomatic developments, probabilistic theories, studies on infinite dimensional Wiener spaces, solutions of powers of Laplacian and other second order partial differential equations. There were keynote addresses delivered by D. Armitage (Belfast), N. Bouleau (Paris), A. Eremenko (Purdue), S. J. Gardiner (Dublin), W. Hansen (Bielefeld), W. Hengartner (Laval U. , Quebec), K. Janssen (Dusseldorf), T. Murai (Nagoya), A. de la Pradelle (Paris) and J. M. Wu (Urbana). There were thirty six other invited talks of one half hour duration each.
Title:Classical and Modern Potential Theory and ApplicationsFormat:PaperbackDimensions:470 pages, 24 × 16 × 0.01 inPublished:November 26, 2012Publisher:Springer-Verlag/Sci-Tech/TradeLanguage:English

The following ISBNs are associated with this title:

ISBN - 10:9401044988

ISBN - 13:9789401044981


Table of Contents

Preface. Nonlinear PDE and the Wiener Test; D.R. Adams. k-Superharmonic Functions and L. Kelvin's Theorem; Ö. Akin. On the Invariance of the Solutions of the Weinstein Equation under Möbius Transformations; Ö. Akin, H. Leutwiler. Radial Limiting Behaviour of Harmonic and Superharmonic Functions; D.H. Armitage. Multiparameter Processes Associated with Ornstein-Uhlenbeck Semi-Groups; J. Bauer. On the Problem of Hypoellipticity on the Infinite Dimensional Torus; A.D. Bendikov. L'équation de Monge-Ampère dans un espace de Banach; E.M.J. Bertin. Excessive Functions and Excessive Measures. Hunt's Theorem on Balayages, Quasi-Continuity; L. Beznea, N. Boboc. The Wiener Test for Poincaré-Dirichlet Forms; M. Biroli. The Best Approach for Boundary Limits; J. Bliedtner, P.A. Loeb. Fine Behaviour of Balayages in Potential Theory; N. Boboc. Some Results about Sequential Integration on Wiener Space; N. Bouleau. Schwarz Lemma Type Inequalities for Harmonic Functions in the Ball; B. Burgeth. Duality of H-Cones; S.-L. Eriksson-Bique. Régularité et intégrabilité des fonctionnelles de Wiener; D. Feyel. Poincaré Inequalities in L1-Norm for the Sphere and a Strong Isoperimetric Inequality in Rn; B. Fuglede. Uniform and Tangential Harmonic Approximation; S.J. Gardiner. Inversion and Reflecting Brownian Motion; J. Glover, M. Rao. Tau-Potentials; J. Glover, M. Rao, H. Sikic, R. Song. Fatou-Doob Limits and the Best Filters; K. Gowri-Sankaran. Gaussian Upper Bounds for the Heat Kernel and its Derivatives on a Riemannian Manifold; A. Grigor'yan. Integrals of Analytic Functions along 2 Curves; R.R. Hall, W.K. Hayman. On the Restricted Mean Value Propertyfor Measurable Functions; W. Hansen, N. Nadirashvili. A Constructive Method for Univalent Logharmonic Mappings; W. Hengartner, J. Rostand. Choquet-Type Integral Representation of Polyexcessive Functions; K. Janssen, H.-H. Müller. Refining the Local Uniform Convergence Topology; P.A. Loeb, H. Osswald. Daily Rheological Phenomena; T. Murai. Convergence Property and Superharmonic Functions on Bayalage Spaces; T. Murazawa. Mean Value Property of Harmonic Functions; I. Netuka, J. Veselý. Farrell and Mergelyan Sets for the Space of Bounded Harmonic Functions; F. Perez-Gonzalez, R. Trujillo-Gonzalez. Méthodes analytiques en dimension infinie; A. de la Pradelle. Construction d'un processus à deux paramètres à partir d'un semi-groupe à un paramètre; S. Song. Capacities and Harmonic Measures for Uniformly Elliptic Operators of Non-Divergence Form; J.-M. Wu. Problems.