The geometry of brownian surfaces

Rémi Léandre

Journal ArticleOPEN ACCESS

The geometry of brownian surfaces

Léandre R

Probability Surveys (2006) 3(1) 37-88

DOI: 10.1214/154957806000000032

5Citations

11Readers

Abstract

Motivated by Segal's axiom of conformal field theory, we do a survey on geometrical random fields. We do a history of continuous ran-dom fields in order to arrive at a field theoretical analog of Klauder's quan-tization in Hamiltonian quantum mechanic by using infinite dimensional Airault-Malliavin Brownian motion.

Cite

CITATION STYLE

APA

Léandre, R. (2006). The geometry of brownian surfaces. Probability Surveys, 3(1), 37–88. https://doi.org/10.1214/154957806000000032

Readers' Seniority

PhD / Post grad / Masters / Doc 3

38%

Professor / Associate Prof. 2

25%

Researcher 2

25%

Lecturer / Post doc 1

13%

Readers' Discipline

Mathematics 5

63%

Physics and Astronomy 2

25%

Computer Science 1

13%

The geometry of brownian surfaces

Abstract

Author supplied keywords

References Powered by Scopus

Strings on orbifolds

Supersymmetry and the Atiyah-Singer index theorem

A Cameron-Martin type quasi-invariance theorem for Brownian motion on a compact Riemannian manifold

Cited by Powered by Scopus

Stochastic analysis for a non-Markovian generator: an introduction

Quasi-sure existence of Brownian rough paths and a construction of Brownian pants

Long Time Behaviour on a Path Group of the Heat Semi-group Associated to a Bilaplacian

Register to see more suggestions

Cite

Readers' Seniority

Readers' Discipline