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The Kellogg property under generalized growth conditions

We study minimizers of the Dirichlet phi-energy integral with generalized Orlicz growth. We prove the Kellogg property, the set of irregular points has zero capacity, and give characterizations of semiregular boundary points. The results are new ever for the special cases double phase and Orlicz growth.

preprint2020arXivOpen access

Petteri Harjulehto Jonne Juusti

math.AP

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Petteri Harjulehto Jonne Juusti

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