SLE(κ,ρ)的可逆轨迹

Reversibility of SLE(κ,ρ)Traces

随机洛纳发展(简称SLE)是由O.Schramm引入用来描述格子模型的尺度极限,其尺度极限满足共形不变性和马尔可夫性质,当κ∈(0,4),ρ≥κ-4/2时,起始于(0;b_(0))(b_(0)>0)的通弦SLE(κ,ρ)轨迹满足可逆性。文章在其基础之上,给出了带有力点0-,1/c_(0)的退化中间SLE(κ,ρ)轨迹以及当κ>4时,起始于(0;0+,0-)的通弦SLE(κ′,ρ′)的轨迹特性。

The stochastic Loewner evolution(SLE)introuduced by Oded Schramm is introduced to describe the scale limit of lattice models,which satisfies conformal invariance and Markov properties.Where,the trace of chordal has been proved reversible.Based on this,this article provides the reversibility of degenerate intermediate trace with force points when the property of trace started from.