On integrability and exact solvability in deterministic and stochastic Laplacian growth

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Lyons, T.J
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AbstractThis paper consists of three parts. In Part I, we obtain results on the integrability of fun...

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We study certain aspects of several nonequilibrium growth models, (1) the three-dimensional diffusio...

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January 2019

Integrable models have a fascinating history with many important discoveries that dates back to the ...

Fractal geometry and stochastics IV

Bandt, Christoph

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Over the years fractal geometry has established itself as a substantial mathematical theory in its o...

Integrability of Functionals of Dirichlet Processes, Probabilistic Representations of Semigroups, and Estimates of Heat Kernels

Lunt, John
Lyons, T.J
Zhang, T.S

March 1998

AbstractThis paper consists of three parts. In Part I, we obtain results on the integrability of fun...

On integrability and exact solvability in deterministic and stochastic Laplacian growth

Igor Loutsenko
Oksana Yermolayeva

February 2020

We review applications of theory of classical and quantum integrable systems to the free-boundary pr...

Classical and stochastic Laplacian growth

Gustafsson, Björn
Teodorescu, Razvan
Vasil’ev, Alexander

January 2014

This monograph covers a multitude of concepts, results, and research topics originating from a class...

THE DYNAMIC FOUNDATION OF FRACTAL OPERATORS Mauro Bologna

January 2003

The fractal operators discussed in this dissertation are introduced in the form originally proposed ...

Studies Of Nonequilibrium Growth Models.

Cheng, Zheming

January 1987

We study certain aspects of several nonequilibrium growth models, (1) the three-dimensional diffusio...

The Coefficient Problem and Multifractality of Whole-Plane SLE & LLE

Duplantier, Bertrand
Nguyen, Chi
Nguyen, Nga
Zinsmeister, Michel

August 2014

International audienceKarl Löwner (later known as Charles Loewner) introduced his famous differentia...

Stochastic Schramm-Loewner Evolution (SLE) from Statistical Conformal Field Theory (CFT): An Introduction for (and by) Amateurs

Bernard, Denis

January 2012

Lecture NotesThe lectures will be devoted to a somewhat detailed presentation of Stochastic Schramm-...

Random matrices, random processes and integrable systems

Harnad, John

January 2011

This book explores the remarkable connections between two domains that, a priori, seem unrelated: Ra...

On the integrable dynamical systems in statistical mechanics

Zheng, Yu

October 2019

Mathematical details of stochastic process are reviewed, before one-dimensional Ising model is intro...

Expansion of the random boundary excitations for the fractional Laplacian

Sabelfeld, Karl

January 2008

A new stochastic fractal model based on a fractional Laplace equation is developed. Exact representa...

Stochastic embedding of dynamical systems

Cresson, Jacky
Darses, Sébastien

September 2005

112 pagesMost physical systems are modelled by an ordinary or a partial differential equation, like ...

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July 2018

In the first two chapters, a concise introduction to stochastic integration in Hilbert spaces is gi...

Stochastic analysis and stochastic PDEs on fractals

Yang, W

January 2018

Stochastic analysis on fractals is, as one might expect, a subfield of analysis on fractals. An intu...

Elements of classical and quantum integrable systems

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January 2019

Integrable models have a fascinating history with many important discoveries that dates back to the ...

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January 2010

Over the years fractal geometry has established itself as a substantial mathematical theory in its o...

Integrability of Functionals of Dirichlet Processes, Probabilistic Representations of Semigroups, and Estimates of Heat Kernels

Lunt, John
Lyons, T.J
Zhang, T.S

March 1998

AbstractThis paper consists of three parts. In Part I, we obtain results on the integrability of fun...

On integrability and exact solvability in deterministic and stochastic Laplacian growth

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On integrability and exact solvability in deterministic and stochastic Laplacian growth

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