Add to ORKGAbstract This paper is an exposition of some applications of Stochastic Processes to boundary behavior problems for harmonic functions. As an illustration, we give a proof of Fatou's theorem in simply connected plane domains which is probabilistic and does not use the Riemann mapping theorem. The paper closes with some remarks on further related work and open questions
AbstractGiven a Dirichlet form E(·, ·) on the unit sphere S in Rn (n ⩾ 2) associated to a continuous...
AbstractIn this paper we develop a theory for harmonic maps which is analogous to the classical theo...
Abstract. The aim of this paper is to relate the theory of harmonic-ity, in the sense of Korevaar-Sc...
AbstractRecently it was shown in [P. Kim, Fatou's theorem for censored stable processes, Stochastic ...
AbstractNonlinear versions of Bismut type formulas for the differential of a harmonic map between Ri...
Abstract Nonlinear versions of Bismut type formulas for the differential of a harmonic map between R...
We give a proof of Fatou's Theorem for censored [alpha]-stable processes in a bounded C1,1 open set ...
peer reviewedNonlinear versions of Bismut type formulas for the differential of a harmonic map betwe...
In this thesis, we study potential theoretic properties of harmonic functions and spectral problems ...
A Riemannian manifold has the Brownian coupling property if two Brownian motions can be constructed ...
In 1993, Da Prato and Zabczyk showed that if one considers the heat equation on the interval (0,1) w...
By using probabilistic approaches, Liouville theorems are proved for a class of Riemannian manifolds...
A conformal change of metric is used to construct a coupling of two time-changed Riemannian Brownian...
AbstractWe give a proof of Fatou's Theorem for censored α-stable processes in a bounded C1,1 open se...
AbstractA conformal change of metric is used to construct a coupling of two time-changed Riemannian ...
AbstractGiven a Dirichlet form E(·, ·) on the unit sphere S in Rn (n ⩾ 2) associated to a continuous...
AbstractIn this paper we develop a theory for harmonic maps which is analogous to the classical theo...
Abstract. The aim of this paper is to relate the theory of harmonic-ity, in the sense of Korevaar-Sc...
AbstractRecently it was shown in [P. Kim, Fatou's theorem for censored stable processes, Stochastic ...
AbstractNonlinear versions of Bismut type formulas for the differential of a harmonic map between Ri...
Abstract Nonlinear versions of Bismut type formulas for the differential of a harmonic map between R...
We give a proof of Fatou's Theorem for censored [alpha]-stable processes in a bounded C1,1 open set ...
peer reviewedNonlinear versions of Bismut type formulas for the differential of a harmonic map betwe...
In this thesis, we study potential theoretic properties of harmonic functions and spectral problems ...
A Riemannian manifold has the Brownian coupling property if two Brownian motions can be constructed ...
In 1993, Da Prato and Zabczyk showed that if one considers the heat equation on the interval (0,1) w...
By using probabilistic approaches, Liouville theorems are proved for a class of Riemannian manifolds...
A conformal change of metric is used to construct a coupling of two time-changed Riemannian Brownian...
AbstractWe give a proof of Fatou's Theorem for censored α-stable processes in a bounded C1,1 open se...
AbstractA conformal change of metric is used to construct a coupling of two time-changed Riemannian ...
AbstractGiven a Dirichlet form E(·, ·) on the unit sphere S in Rn (n ⩾ 2) associated to a continuous...
AbstractIn this paper we develop a theory for harmonic maps which is analogous to the classical theo...
Abstract. The aim of this paper is to relate the theory of harmonic-ity, in the sense of Korevaar-Sc...