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Calderón-Zygmund estimates for elliptic double phase problems with variable exponents -
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Optimal regularity estimates are established for the gradient of solutions to non-uniformly
elliptic equations of Orlicz double phase with variable exponents type in divergence form …

An irregular obstacle problem with a non-uniformly elliptic operator in divergence form of (G,
H)-growth is studied. We provide local Calderón-Zygmund type estimates for an Orlicz …

An elliptic double phase problem with irregular double obstacles is investigated to establish
a Calderón-Zygmund type estimate in the setting of Lebesgue spaces and weighted …

We establish a new Campanato-type estimate for the weak solutions of a class of multi-
phase problems. The problem under consideration is characterized by the fact that both …

In this paper, we use the finite difference argument to prove a higher fractional
differentiability in the scale of Besov spaces for the gradients of solutions of the double …

We investigate the different notions of solutions to the double-phase equation-div⁡(| D⁢ u| p-
2⁢ D⁢ u+ a⁢(x)⁢| D⁢ u| q-2⁢ D⁢ u)= 0, which is characterized by the fact that both ellipticity …

Renormalized non-negative solutions for the double phase Dirichlet problems with L1 data |
Journal of Mathematical Physics | AIP Publishing Skip to Main Content Umbrella Alt Text …

We study an irregular double obstacle problem with Orlicz growth over a nonsmooth
bounded domain. We establish a global Calderón–Zygmund estimate by proving that the …