Add to ORKGAbstract: We prove regularity up to the boundary of the solution of an unusual variational problem arising in mathematical finance. This paper is dedicated to Victor Yudovich on his 70th birthday
Derivatives and integrals of fractional order have recently gained more attention due to their succe...
We prove existence and partial regularity of minimizers of certain functionals in the calculus of va...
We consider quasi-variational problems (variational problems having constraint sets depending on the...
Available from STL Prague, CZ / NTK - National Technical LibrarySIGLECZCzech Republi
We review the long-standing issue of regularity of solutions to the basic prob-lem in the calculus o...
We first study the minimizers, in the class of convex functions, of an elliptic functional with nonh...
In this thesis we provide regularity results for convex and semiconvex variational problems which ar...
We study value functions which are viscosity solutions of certain Kolmogorov equations. Using PDE te...
We prove that,if u:Ω ⊂ ℝn → ℝN is a solution to the Dirichlet variational problem involving a regula...
We study a new non-classical class of variational problems that is motivated by some recent researc...
The regularity of solutions to variational inequalities involving local operators has been studied e...
In this note, we propose an elementary method to study the existence and uniqueness of solutions to ...
In this paper, a variational problem is considered with differential equality constraints over a var...
We consider regularity at the boundary for minimizers of variational integrals whose integrands have...
Abstract. We establish higher-order weighted Sobolev and Hölder regularity for solutions to variati...
Derivatives and integrals of fractional order have recently gained more attention due to their succe...
We prove existence and partial regularity of minimizers of certain functionals in the calculus of va...
We consider quasi-variational problems (variational problems having constraint sets depending on the...
Available from STL Prague, CZ / NTK - National Technical LibrarySIGLECZCzech Republi
We review the long-standing issue of regularity of solutions to the basic prob-lem in the calculus o...
We first study the minimizers, in the class of convex functions, of an elliptic functional with nonh...
In this thesis we provide regularity results for convex and semiconvex variational problems which ar...
We study value functions which are viscosity solutions of certain Kolmogorov equations. Using PDE te...
We prove that,if u:Ω ⊂ ℝn → ℝN is a solution to the Dirichlet variational problem involving a regula...
We study a new non-classical class of variational problems that is motivated by some recent researc...
The regularity of solutions to variational inequalities involving local operators has been studied e...
In this note, we propose an elementary method to study the existence and uniqueness of solutions to ...
In this paper, a variational problem is considered with differential equality constraints over a var...
We consider regularity at the boundary for minimizers of variational integrals whose integrands have...
Abstract. We establish higher-order weighted Sobolev and Hölder regularity for solutions to variati...
Derivatives and integrals of fractional order have recently gained more attention due to their succe...
We prove existence and partial regularity of minimizers of certain functionals in the calculus of va...
We consider quasi-variational problems (variational problems having constraint sets depending on the...