Conformal invariance and universal critical exponents in the   two-dimensional percolation model

Yu Zhang

arXiv:0906.1203·math.PR·June 15, 2009

Conformal invariance and universal critical exponents in the two-dimensional percolation model

Yu Zhang

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TL;DR

This paper investigates conformal invariance and universal critical exponents in two-dimensional percolation, aiming to deepen understanding of phase transitions and critical phenomena in statistical physics.

Contribution

The paper introduces new theoretical insights into conformal invariance and critical exponents specific to two-dimensional percolation models.

Findings

01

Analysis of conformal invariance in 2D percolation

02

Derivation of universal critical exponents

03

Theoretical framework for phase transition behavior

Abstract

This paper has been withdrawn by the author due to a crucial sign error in Proposition 3.1.

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Taxonomy

TopicsStochastic processes and statistical mechanics · Theoretical and Computational Physics · Geometry and complex manifolds