Add to ORKGLoewner introduced his famous differential equation in 1923 in order to solve Bieberbach conjecture for n=3. His method has been revived in 1999 by Ode Schramm who introduced Stochastic Loewner processes which happened to open many doors in statistical mechanics. The aim of this paper is to revisit Bieberbach conjecture in the framework of SLE and more generally Lévy processes. This has lead to astonishing results and conjectures
In this paper, we shall study the convergence of Taylor approximations for the backward Loewner diff...
In this paper, we study the convergence of Taylor approximations for the backward SLE maps near the ...
International audienceLet γ be the curve generating a Schramm–Loewner Evolution (SLE) process, with ...
Loewner introduced his famous differential equation in 1923 in order to solve Bieberbach conjecture ...
International audienceKarl Löwner (later known as Charles Loewner) introduced his famous differentia...
The starting point of this thesis is Bieberbach’s conjecture: its proof, given by De Branges, uses t...
Le point de départ de cette thèse est la conjecture de Bieberbach : sa démonstration par De Branges ...
44 pages, 17 figuresWe consider the whole-plane SLE conformal map f from the unit disk to the slit p...
In 2000, O. Schramm [4] introduced a one-parameter family of random growth processes in two dimen-si...
This thesis is not available on this repository until the author agrees to make it public. If you ar...
Schramm-Loewner evolution (SLE(kappa)) is an important contemporary tool for identifying critical sc...
Stochastic Loewner evolutions (SLE) with a multiple √κB of Brownian motion B as driving process are ...
Schramm-Loewner evolution ( SLEκ ) is classically studied via Loewner evolution with half-plane capa...
This thesis focuses on three topics related to the SLE(k) processes. The first part is about the dip...
SLE¿È is a random growth process based on Loewner¿fs equation with driving parameter a one-dimension...
In this paper, we shall study the convergence of Taylor approximations for the backward Loewner diff...
In this paper, we study the convergence of Taylor approximations for the backward SLE maps near the ...
International audienceLet γ be the curve generating a Schramm–Loewner Evolution (SLE) process, with ...
Loewner introduced his famous differential equation in 1923 in order to solve Bieberbach conjecture ...
International audienceKarl Löwner (later known as Charles Loewner) introduced his famous differentia...
The starting point of this thesis is Bieberbach’s conjecture: its proof, given by De Branges, uses t...
Le point de départ de cette thèse est la conjecture de Bieberbach : sa démonstration par De Branges ...
44 pages, 17 figuresWe consider the whole-plane SLE conformal map f from the unit disk to the slit p...
In 2000, O. Schramm [4] introduced a one-parameter family of random growth processes in two dimen-si...
This thesis is not available on this repository until the author agrees to make it public. If you ar...
Schramm-Loewner evolution (SLE(kappa)) is an important contemporary tool for identifying critical sc...
Stochastic Loewner evolutions (SLE) with a multiple √κB of Brownian motion B as driving process are ...
Schramm-Loewner evolution ( SLEκ ) is classically studied via Loewner evolution with half-plane capa...
This thesis focuses on three topics related to the SLE(k) processes. The first part is about the dip...
SLE¿È is a random growth process based on Loewner¿fs equation with driving parameter a one-dimension...
In this paper, we shall study the convergence of Taylor approximations for the backward Loewner diff...
In this paper, we study the convergence of Taylor approximations for the backward SLE maps near the ...
International audienceLet γ be the curve generating a Schramm–Loewner Evolution (SLE) process, with ...