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The following pages link to On \(W^{1,\gamma(\cdot)}\)-regularity for nonlinear non-uniformly elliptic equations (Q1740384):

Displaying 16 items.

Global estimates for non-uniformly nonlinear elliptic equations in a convex domain (Q266475) (← links)
Regularity of a class of non-uniformly nonlinear elliptic equations (Q342997) (← links)
\(L^{p(\cdot), \lambda(\cdot)}\) regularity for fully nonlinear elliptic equations (Q346607) (← links)
On \(W^{1,q(\cdot)}\)-estimates for elliptic equations of \(p(x)\)-Laplacian type (Q726575) (← links)
Besov regularity for the gradients of solutions to non-uniformly elliptic obstacle problems (Q2050869) (← links)
\(W^{1, p(\cdot)}\)-regularity for a class of non-uniformly elliptic problems with Orlicz growth (Q2094549) (← links)
Weighted Lorentz estimates for nonlinear elliptic obstacle problems with partially regular nonlinearities (Q2126426) (← links)
Interior gradient estimate for steady flows of electrorheological fluids (Q2208744) (← links)
Calderón-Zygmund estimate for asymptotically regular non-uniformly elliptic equations (Q2287344) (← links)
Variable Lorentz estimate for conormal derivative problems of stationary Stokes system with partially BMO coefficients (Q2309729) (← links)
\({\mathcal{C}}^{1, \gamma }\) regularity for singular or degenerate fully nonlinear equations and applications (Q2330923) (← links)
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<i>W</i><sup>1,γ(·)</sup>-estimate to non-uniformly elliptic obstacle problems with borderline growth (Q6053063) (← links)
Gradient estimates for the double phase problems in the whole space (Q6153188) (← links)
Besov regularity for a class of elliptic obstacle problems with double-phase Orlicz growth (Q6191120) (← links)
Gradient estimates in the whole space for the double phase problems by the maximal function method (Q6589481) (← links)