AbstractA.A. Kirillov has given a parametrization of the space U∞ of univalent functions on the closed unit disk, which are C∞ up to the boundary, by Diff(S1)/S1 where Diff(S1) denotes the group of orientation preserving diffeomorphisms of the circle S1. In the same spirit, the space J∞ of C∞ Jordan curves in the complex plane can be parametrized by the double quotient SU(1,1)\Diff(S1)/SU(1,1). As a consequence, J∞ carries a canonical Riemannian metric. We construct a canonical Brownian motion on U∞. Classical technologies of the theory of univalent functions, like Beurling–Ahlfors extension, Loewner equation, Beltrami equation, developed in the context of Kunita's stochastic flows, are the tools for obtaining this result which should be se...
Abstract. The aim of this paper is to relate the theory of harmonic-ity, in the sense of Korevaar-Sc...
We consider a natural class of $\mathbf{R}^d$-valued one-dimensional stochastic PDEs driven by space...
In this research we are looking at Kakutani’s classical result on the connec-tion between Brownian m...
AbstractIn this paper existence of the Brownian measure on Jordan curves with respect to the Weil–Pe...
In this paper existence of the Brownian measure on Jordan curves with respect to the Weil-Petersson ...
Euler equations can be studied as an evolution of volume preserving diffeomorphisms. Brownian motion...
Thesis (Ph.D.)--University of Washington, 2021Consider a Jordan domain $\Omega$ in the plane with $3...
First, we revisit basic theory of functional It\uf4/path-dependent calculus, using the formulation o...
This work is a study of the relationship between Brownian motion and elementary, linear partial diff...
Introduction The most celebrated and useful random process surely is the standard Brownian motion i...
Brosamler’s formula gives a probabilistic representation of the solution of the Neumann problem for ...
AbstractFor infinitesimal data given on the group of diffeomorphism of the circle with respect to th...
AbstractA geometric Brownian motion performs a continuous time infinitesimal perturbation of the sta...
AbstractWe consider the critical Sobolev isotropic Brownian flow in Rd(d≥2). On the basis of the wor...
Summary. We study a class of diffusions, conjugate Brownian motion, related to Brownian motion in Ri...
Abstract. The aim of this paper is to relate the theory of harmonic-ity, in the sense of Korevaar-Sc...
We consider a natural class of $\mathbf{R}^d$-valued one-dimensional stochastic PDEs driven by space...
In this research we are looking at Kakutani’s classical result on the connec-tion between Brownian m...
AbstractIn this paper existence of the Brownian measure on Jordan curves with respect to the Weil–Pe...
In this paper existence of the Brownian measure on Jordan curves with respect to the Weil-Petersson ...
Euler equations can be studied as an evolution of volume preserving diffeomorphisms. Brownian motion...
Thesis (Ph.D.)--University of Washington, 2021Consider a Jordan domain $\Omega$ in the plane with $3...
First, we revisit basic theory of functional It\uf4/path-dependent calculus, using the formulation o...
This work is a study of the relationship between Brownian motion and elementary, linear partial diff...
Introduction The most celebrated and useful random process surely is the standard Brownian motion i...
Brosamler’s formula gives a probabilistic representation of the solution of the Neumann problem for ...
AbstractFor infinitesimal data given on the group of diffeomorphism of the circle with respect to th...
AbstractA geometric Brownian motion performs a continuous time infinitesimal perturbation of the sta...
AbstractWe consider the critical Sobolev isotropic Brownian flow in Rd(d≥2). On the basis of the wor...
Summary. We study a class of diffusions, conjugate Brownian motion, related to Brownian motion in Ri...
Abstract. The aim of this paper is to relate the theory of harmonic-ity, in the sense of Korevaar-Sc...
We consider a natural class of $\mathbf{R}^d$-valued one-dimensional stochastic PDEs driven by space...
In this research we are looking at Kakutani’s classical result on the connec-tion between Brownian m...