We deal with general quasilinear divergence-form coercive operators whose prototype is the m-Laplacean operator. The nonlinear terms are given by Carathéodory functions and satisfy controlled growth structure conditions with data belonging to suitable Morrey spaces. The fairly non-regular boundary of the underlying domain is supposed to satisfy a capacity density condition which allows domains with exterior corkscrew property. We prove global boundedness and Hölder continuity up to the boundary for the weak solutions of such equations, generalizing this way the classical L^p-result of Ladyzhenskaya and Ural’tseva to the settings of the Morrey spaces.
Global Hoelder continuity of solutions to quasilinear equations with Morrey data / Palagachev, Dian Kostadinov; Byun, S. S.; Shin, P.. - In: COMMUNICATIONS IN CONTEMPORARY MATHEMATICS. - ISSN 0219-1997. - STAMPA. - 24:8(2022), pp. 2150062.1-2150062.41. [10.1142/S0219199721500620]
Global Hoelder continuity of solutions to quasilinear equations with Morrey data
Palagachev, Dian Kostadinov;
2022-01-01
Abstract
We deal with general quasilinear divergence-form coercive operators whose prototype is the m-Laplacean operator. The nonlinear terms are given by Carathéodory functions and satisfy controlled growth structure conditions with data belonging to suitable Morrey spaces. The fairly non-regular boundary of the underlying domain is supposed to satisfy a capacity density condition which allows domains with exterior corkscrew property. We prove global boundedness and Hölder continuity up to the boundary for the weak solutions of such equations, generalizing this way the classical L^p-result of Ladyzhenskaya and Ural’tseva to the settings of the Morrey spaces.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
