Restricting SLE(8/3) to an annulus
We study the probability that chordal $\text{SLE}_{8/3}$ in the unit disk from $\exp(ix)$ to 1 avoids the disk of radius $q$ centered at zero. We find the initial/boundary-value problem satisfied by this probability as a function of $x$ and $a=\ln q$, and show that asymptotically as $q$ tends to one...
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| Format: | Artikel |
| Sprache: | eng |
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| Zusammenfassung: | We study the probability that chordal $\text{SLE}_{8/3}$ in the unit disk
from $\exp(ix)$ to 1 avoids the disk of radius $q$ centered at zero. We find
the initial/boundary-value problem satisfied by this probability as a function
of $x$ and $a=\ln q$, and show that asymptotically as $q$ tends to one this
probability decays like $\exp(-cx/(1-q))$ with $c=5\pi/8$ for $x\in[0,\pi]$. We
also give a representation of this probability as a functional of a Legendre
process. |
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| DOI: | 10.48550/arxiv.math/0602391 |