Pages that link to "Item:Q5903279"
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The following pages link to Optimal regularity theorems for variational problems with obstacles (Q5903279):
Displaying 20 items.
- On partial Hölder continuity and a Caccioppoli inequality for minimizers of asymptotically convex functionals between Riemannian manifolds (Q325927) (← links)
- Estimate of the singular set of the solution to variational problem with a nonconvex obstacle that goes out to the boundary (Q354803) (← links)
- The existence of a heat flow for problems with nonconvex obstacles outgoing to the boundary (Q690795) (← links)
- p-harmonic obstacle problems. I: Partial regularity theory (Q752452) (← links)
- p-harmonic obstacle problems. II: Extensions of maps and applications (Q752453) (← links)
- p-harmonic obstacle problems. III: Boundary regularity (Q752454) (← links)
- Variational problem with an obstacle in \(\mathbb R^N\) for a class of quadratic functionals (Q1037176) (← links)
- A note on removable singularities for minima of certain vector-valued obstacle problems (Q1086492) (← links)
- An elementary partial regularity proof for vector-valued obstacle problems (Q1086740) (← links)
- The regularity of minima of variational problems with graph obstacles (Q1102522) (← links)
- Stable defects of minimizers of constrained variational principles (Q1110804) (← links)
- Partial regularities of minimizers of certain quadratic functionals with unbounded obstacles (Q1199799) (← links)
- Second derivatives of solutions of some variational inequalities connected with elliptic nondiagonal systems (Q1207881) (← links)
- The variable coefficient thin obstacle problem: higher regularity (Q1674266) (← links)
- Heat flows for a nonconvex Signorini type problem in \(\mathbb R^N\) (Q2016960) (← links)
- Equilibrium points of a singular cooperative system with free boundary (Q2346055) (← links)
- A problem with an obstacle that goes out to the boundary of the domain for a class of quadratic functionals on $\mathbb{R}^{N}$ (Q3104486) (← links)
- An Approach to the Thin Obstacle Problem foŕ Variational Functionals Depending on Vector Valued Functions (Q3477280) (← links)
- Higher differentiability results in the scale of Besov Spaces to a class of double-phase obstacle problems (Q5097296) (← links)
- Constraint maps with free boundaries: the obstacle case (Q6615231) (← links)
