Add to ORKG44 pages, 17 figuresWe consider the whole-plane SLE conformal map f from the unit disk to the slit plane, and show that its mixed moments, involving a power p of the derivative modulus |f'| and a power q of the map |f| itself, have closed forms along some integrability curves in the (p,q) moment plane, which depend continuously on the SLE parameter kappa. The generalization of this integrability property to the m-fold transform of f is also given. We define a generalized integral means spectrum corresponding to the singular behavior of the mixed moments above. The average generalized spectrum of whole-plane SLE takes four possible forms, separated by five phase transition lines in the moment plane, whereas the average generalized spectrum o...
Abstract: In this paper we study the multifractal structure of Schramm’s SLE curves. We derive the v...
The spectral Schwarz lemma revisited An algebroid function K(z) is the set-valued function obtained ...
The forward BFKL equation is discretised in virtuality space and it is shown that the diffusion into...
44 pages, 17 figuresWe consider the whole-plane SLE conformal map f from the unit disk to the slit p...
Let f an instance of the whole-plane SLE_κ conformal map from the unit disk D to the slit plane: We ...
International audienceKarl Löwner (later known as Charles Loewner) introduced his famous differentia...
Le point de départ de cette thèse est la conjecture de Bieberbach : sa démonstration par De Branges ...
The starting point of this thesis is Bieberbach’s conjecture: its proof, given by De Branges, uses t...
Loewner introduced his famous differential equation in 1923 in order to solve Bieberbach conjecture ...
We complete the mathematical analysis of the fine structure of harmonic measure on SLE curves that w...
(Joint work with B.Duplantier, H.Ho and B.Le).\\ If $f$ is a holomorphic and injective map from the...
Whole-plane SLE$_\kappa$ is a random fractal curve between two points on the Riemann sphere. Zhan es...
First we introduce the two tau-functions which appeared either as the τ -function of the integrable...
AbstractWe prove several related results concerning the genericity (in the sense of Baire's categori...
Abstract: In this paper we study the multifractal structure of Schramm’s SLE curves. We derive the v...
The spectral Schwarz lemma revisited An algebroid function K(z) is the set-valued function obtained ...
The forward BFKL equation is discretised in virtuality space and it is shown that the diffusion into...
44 pages, 17 figuresWe consider the whole-plane SLE conformal map f from the unit disk to the slit p...
Let f an instance of the whole-plane SLE_κ conformal map from the unit disk D to the slit plane: We ...
International audienceKarl Löwner (later known as Charles Loewner) introduced his famous differentia...
Le point de départ de cette thèse est la conjecture de Bieberbach : sa démonstration par De Branges ...
The starting point of this thesis is Bieberbach’s conjecture: its proof, given by De Branges, uses t...
Loewner introduced his famous differential equation in 1923 in order to solve Bieberbach conjecture ...
We complete the mathematical analysis of the fine structure of harmonic measure on SLE curves that w...
(Joint work with B.Duplantier, H.Ho and B.Le).\\ If $f$ is a holomorphic and injective map from the...
Whole-plane SLE$_\kappa$ is a random fractal curve between two points on the Riemann sphere. Zhan es...
First we introduce the two tau-functions which appeared either as the τ -function of the integrable...
AbstractWe prove several related results concerning the genericity (in the sense of Baire's categori...
Abstract: In this paper we study the multifractal structure of Schramm’s SLE curves. We derive the v...
The spectral Schwarz lemma revisited An algebroid function K(z) is the set-valued function obtained ...
The forward BFKL equation is discretised in virtuality space and it is shown that the diffusion into...