Some qualitative and quantitative properties of weak solutions to mixed anisotropic and nonlocal quasilinear elliptic and doubly nonlinear parabolic equations

This article is twofold. In the first part of the article, we consider Brezis-Oswald problem involving the mixed anisotropic and nonlocal p-Laplace operator and establish existence, uniqueness, boundedness and strong maximum principle. Further, for some mixed anisotropic and nonlocal p-Laplace type equations, we obtain Sturmian comparison theorem, prove some comparsion results, nonexistence results, establish weighted Hardy type inequality and study a system of singular mixed anisotropic and nonlocal p-Laplace equations. One of the key ingredient is the combination of Picone identity already available in the separate local and nonlocal cases. In the second part of the article, we are mainly concerned with regularity estimates. To this end, in the elliptic setting, we establish weak Harnack inequality and semicontinuity results. Further, we consider a class of doubly nonlinear mixed anisotropic and nonlocal equations and prove semicontinuity results and pointwise behavior of solutions. These are based on suitable energy estimates and De Giorgi type lemmas and expansion of positivity. Finally, we establish various energy estimates which may be of independent interest.