Lund University Publications

Obstacle Problems for Green Potentials and for Parabolic Quasiminima

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Abstract

The thesis consists of two parts.



In the first part pure potential theoretic methods are employed to study the obstacle problem connected with a uniformly elliptic second-order differential operator in divergence form. Regular points of the obstacles are characterized by the classical Wiener criterion.



The second part deals with a class of functions satisfying a certain integral inequality. A prototype for this function class is



the class of subsolutions (or, more generally) the class of sub-quasiminima, associated to a degenerate nonlinear parabolic differential operator and to a couple of irregular obstacles. A sufficient condition on the obstacles for regularity of a point is... (More)

The thesis consists of two parts.



In the first part pure potential theoretic methods are employed to study the obstacle problem connected with a uniformly elliptic second-order differential operator in divergence form. Regular points of the obstacles are characterized by the classical Wiener criterion.



The second part deals with a class of functions satisfying a certain integral inequality. A prototype for this function class is



the class of subsolutions (or, more generally) the class of sub-quasiminima, associated to a degenerate nonlinear parabolic differential operator and to a couple of irregular obstacles. A sufficient condition on the obstacles for regularity of a point is given. (Less)

Abstract (Swedish)

Popular Abstract in Swedish

Avhandlingen består av två delar. I den första delen används rent potentialteoretiska metoder för att studera hinderproblemet hörande till en likformigt elliptisk andra ordningens differentialoperator på divergensform. Reguljära punkter till hindren karakteriseras med det klassiska Wiener-kriteriet.



Andra delen behandlar en klass av funktioner som uppfyller en viss integralolikhet. En prototyp för denna funktionsklass är klassen av sublösningar eller, allmännare, klassen av subkvasiminima, hörande till en degenererad ickelinjär parabolisk differentialoperator och till ett par irreguljära hinder. Ett tillräckligt villkor på hindren för att en punkt ska vara reguljär ges.