Gradient continuity for p-Laplacian obstacle problems under mean oscillation conditions
Abstract
We establish the C1-regularity of solutions to the obstacle problems associated with p-Laplacian type equations, where 1<p<∞. Specifically, we prove that the gradient of the solution is continuous under a Dini mean oscillation (DMO) type condition on the data, which includes the coefficient matrix, the source term, and the obstacle function. This result relaxes the classical Dini continuity assumption on the data to a more general mean oscillation condition.
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