Pages that link to "Item:Q2033265"

The following pages link to Global Lorentz estimates for nonuniformly nonlinear elliptic equations via fractional maximal operators (Q2033265):

Displaying 11 items.

• Growth conditions and regularity for weak solutions to nonlinear elliptic pdes (Q2033272) (← links)
• Regularity for minimizers of double phase functionals with mild transition and regular coefficients (Q2033277) (← links)
• Recent developments in problems with nonstandard growth and nonuniform ellipticity (Q2033279) (← links)
• Besov regularity for the gradients of solutions to non-uniformly elliptic obstacle problems (Q2050869) (← links)
• Lorentz improving estimates for the \(p\)-Laplace equations with mixed data (Q2201732) (← links)
• Global gradient estimates for very singular quasilinear elliptic equations with non-divergence data (Q2238814) (← links)
• A regularity result via fractional maximal operators for <i>p</i>-Laplace equations in weighted Lorentz spaces (Q5085416) (← links)
• Weighted Lorentz estimates for non-uniformly elliptic problems with variable exponents (Q6050206) (← links)
• Global bound on the gradient of solutions to p-Laplace type equations with mixed data (Q6499119) (← links)
• Gradient bounds for non-uniformly quasilinear elliptic two-sided obstacle problems with variable exponents (Q6542806) (← links)
• Calderón-Zygmund type results for a class of quasilinear elliptic equations involving the \(p(x)\)-Laplacian (Q6672020) (← links)