Manifold constrained non-uniformly elliptic problems

Global higher integrability for minimisers of convex obstacle problems with (p,q)-growth, On double-phase problems without any growth and Ambrosetti–Rabinowitz conditions, Measure data elliptic problems with generalized Orlicz growth, Existence of solutions for singular double phase problems via the Nehari manifold method, Fully nonlinear free transmission problems with nonhomogeneous degeneracies, Quasiconvexity and partial regularity via nonlinear potentials, Nonlocal Harnack inequalities in the Heisenberg group, Symmetry and monotonicity of singular solutions of double phase problems, Optimal gradient estimates for multi-phase integrals, Existence of solutions for double-phase problems by topological degree, Fractional operators and their commutators on generalized Orlicz spaces, Quasilinear double phase problems in the whole space via perturbation methods, Gradient estimates for multi-phase problems in Campanato spaces, Regularity for multi-phase variational problems, Fully nonlinear singularly perturbed models with non-homogeneous degeneracy, Sobolev's inequality in Musielak–Orlicz–Morrey spaces of an integral form, New embedding results for double phase problems with variable exponents and a priori bounds for corresponding generalized double phase problems, Hölder continuity and boundedness estimates for nonlinear fractional equations in the Heisenberg group, Regularity for double phase problems at nearly linear growth, Renormalized non-negative solutions for the double phase Dirichlet problems with L1 data, Absence and presence of Lavrentiev's phenomenon for double phase functionals upon every choice of exponents, Global well-posedness of solutions to a class of double phase parabolic equation with variable exponents, Partial regularity of minimizers for double phase functionals with variable exponents, Gradient higher integrability for double phase problems on metric measure spaces, Gradient continuity for \(p(x)\)-Laplacian systems under minimal conditions on the exponent, Gradient regularity in mixed local and nonlocal problems, Multiple nontrivial solutions for superlinear double phase problems via Morse theory, The Lavrentiev phenomenon in calculus of variations with differential forms, Nonlocal Double Phase Implicit Obstacle Problems with Multivalued Boundary Conditions, The Nehari manifold for double‐phase problems with convex and concave nonlinearities, Sobolev's inequality for Musielak-Orlicz-Sobolev functions, Geometric gradient estimates for fully nonlinear models with non-homogeneous degeneracy and applications, Singular multiple integrals and nonlinear potentials, Partial regularity for manifold constrained \(p(x)\)-harmonic maps, On renormalized solutions to elliptic inclusions with nonstandard growth, Continuity of generalized Riesz potentials for double phase functionals, On the regularity of minima of non-autonomous functionals, Existence of solution for double-phase problem with singular weights, Unnamed Item, Gradient estimates for multi-phase problems, Removable sets in elliptic equations with Musielak-Orlicz growth, Global Lorentz estimates for nonuniformly nonlinear elliptic equations via fractional maximal operators, Multiplicity of positive solutions for a fractional \(p\& q\)-Laplacian problem in \(\mathbb{R}^N\), Regularity for minimizers of double phase functionals with mild transition and regular coefficients, Recent developments in problems with nonstandard growth and nonuniform ellipticity, Existence and nonexistence of solutions for the double phase problem, Regularity for solutions of fully nonlinear elliptic equations with nonhomogeneous degeneracy, Removable sets in non-uniformly elliptic problems, Lipschitz bounds and nonautonomous integrals, Regularity for minimizers for functionals of double phase with variable exponents, On a double phase problem with sublinear and superlinear nonlinearities, Regularity results for a class of obstacle problems with p, q−growth conditions, Calderón-Zygmund estimates for generalized double phase problems, Modular density of smooth functions in inhomogeneous and fully anisotropic Musielak-Orlicz-Sobolev spaces, Regularity for quasi-linear parabolic equations with nonhomogeneous degeneracy or singularity, \(W^{1, p(\cdot)}\)-regularity for a class of non-uniformly elliptic problems with Orlicz growth, Gradient estimates for non-uniformly elliptic problems with BMO nonlinearity, Boundary regularity for manifold constrained p(x)‐harmonic maps, Continuity of generalized Riesz potentials for double phase functionals with variable exponents

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• Boundary regularity of minimizers of \(p(x)\)-energy functionals
• Gradient estimates for elliptic equations with \(L^{p(\cdot )}\log L\) growth
• Partial regularity for holonomic minimisers of quasiconvex functionals
• The \(\varphi\)-harmonic approximation and the regularity of \(\varphi\)-harmonic maps
• Bounded minimisers of double phase variational integrals
• Hölder regularity of quasiminimizers under generalized growth conditions
• Global gradient estimates for non-uniformly elliptic equations
• Regularity of \(\omega \)-minimizers for a class of functionals with non-standard growth
• Lebesgue and Sobolev spaces with variable exponents
• p-harmonic obstacle problems. I: Partial regularity theory
• p-harmonic obstacle problems. III: Boundary regularity
• Boundary regularity and the Dirichlet problem for harmonic maps
• Everywhere regularity of functionals with \(\varphi \)-growth
• The singular set of Lipschitzian minima of multiple integrals
• The maximal operator on generalized Orlicz spaces
• Calderón-Zygmund estimates and non-uniformly elliptic operators
• Regularity of minima: an invitation to the dark side of the calculus of variations.
• A regularity theory for harmonic maps
• Stable defects of minimizers of constrained variational principles
• Regularity of minimizers of integrals of the calculus of variations with non-standard growth conditions
• Capacity methods in the theory of partial differential equations
• Regularity for a class of nonlinear elliptic systems
• On Lavrentiev's phenomenon
• On some variational problems
• Nonlinear potential theory and weighted Sobolev spaces
• Regularity results for electrorheological fluids: The stationary case
• Capacities in generalized Orlicz spaces
• Double phase problems with variable growth
• Partial regularity for manifold constrained \(p(x)\)-harmonic maps
• Hölder regularity for nonlocal double phase equations
• Regularity for general functionals with double phase
• Sharp regularity for functionals with (\(p\),\(q\)) growth
• Scalar minimizers with fractal singular sets
• The \(p\)-harmonic approximation and the regularity of \(p\)-harmonic maps
• Double-phase problems with reaction of arbitrary growth
• Regularity for double phase variational problems
• On the regularity of the \(\omega\)-minima of \(\varphi\)-functionals
• Higher integrability for constrained minimizers of integral functionals with \((p, q)\)-growth in low dimension
• Regularity for multi-phase variational problems
• The singular set of minima of integral functionals
• Stochastic homogenization of nonconvex unbounded integral functionals with convex growth
• Regularity and existence of solutions of elliptic equations with p,q- growth conditions
• Theory of capacities
• Non-autonomous functionals, borderline cases and related function classes
• Partial regularity of 𝑝(𝑥)-harmonic maps
• Mappings minimizing theLp norm of the gradient
• A borderline case of Calderón–Zygmund estimates for nonuniformly elliptic problems
• Partial Differential Equations with Variable Exponents
• Harmonic Mappings of Riemannian Manifolds
• Sobolev Spaces