Regularity theory for mixed local and nonlocal parabolic p-Laplace equations
Abstract
We investigate the mixed local and nonlocal parabolic p-Laplace equation align* ∂t u(x,t)-p u(x,t)+Lu(x,t)=0, align* where p is the local p-Laplace operator and L is the nonlocal p-Laplace operator. Based on the combination of suitable Caccioppoli-type inequality and Logarithmic Lemma with a De Giorgi-Nash-Moser iteration, we establish the local boundedness and H\"older continuity of weak solutions for such equations.
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