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- Yoshihiro Abe
- Mathematical Institute, Tohoku University, Sendai, Japan
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- Marek Biskup
- University of California at Los Angeles, U.S.A
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- Sangchul Lee
- Korea Institute of Science and Technology, Seoul, South Korea
説明
Given a sequence of lattice approximations $D_N\subset\mathbb Z^2$ of a bounded continuum domain $D\subset\mathbb R^2$ with the vertices outside $D_N$ fused together into one boundary vertex $\varrho$, we consider discrete-time simple random walks in $D_N\cup\{\varrho\}$ run for a time proportional to the expected cover time and describe the scaling limit of the exceptional level sets of the thick, thin, light and avoided points. We show that these are distributed, up a spatially-dependent log-normal factor, as the zero-average Liouville Quantum Gravity measures in $D$. The limit law of the local time configuration at, and nearby, the exceptional points is determined as well. The results extend earlier work by the first two authors who analyzed the continuous-time problem in the parametrization by the local time at $\varrho$. A novel uniqueness result concerning divisible random measures and, in particular, Gaussian Multiplicative Chaos, is derived as part of the proofs.
56 pages, 2 figures, continuation of arXiv:1903.04045
収録刊行物
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- Electronic Journal of Probability
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Electronic Journal of Probability 28 (none), 2023-01-01
Institute of Mathematical Statistics
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詳細情報 詳細情報について
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- CRID
- 1360021390768594688
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- ISSN
- 10836489
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- 資料種別
- journal article
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- データソース種別
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- Crossref
- KAKEN
- OpenAIRE
