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東京確率論セミナー
過去の記録 ~03/19|次回の予定|今後の予定 03/20~
| 開催情報 | 月曜日 16:00~17:30 数理科学研究科棟(駒場) 126号室 |
|---|---|
| 担当者 | 佐々田槙子、中島秀太(明治大学) |
| セミナーURL | https://sites.google.com/view/tokyo-probability-seminar23/2024年度 |
2024年10月28日(月)
16:00-17:30 数理科学研究科棟(駒場) 126号室
15:15〜 2階のコモンルームでTea timeを行います。ぜひこちらにもご参加ください。
阪本皓貴 氏 (東京大学)
Harmonic measures in invariant random graphs on Gromov-hyperbolic spaces (日本語)
15:15〜 2階のコモンルームでTea timeを行います。ぜひこちらにもご参加ください。
阪本皓貴 氏 (東京大学)
Harmonic measures in invariant random graphs on Gromov-hyperbolic spaces (日本語)
[ 講演概要 ]
In discrete group theory, a Cayley graph is a fundamental concept to view a finitely generated group as a geometric object itself. For example, the planar lattice is constructed from the free abelian group Z^2, and the 4-regular tree is constructed from the free group F_2. A group acts naturally on its Cayley graph as translations, so Bernoulli percolations on the graph can be viewed as a random graph whose distribution is invariant under the group action. In this talk, after reviewing previous works on such group-invariant random graphs, I will present my result concerning random walks on group-invariant random graphs over Gromov-hyperbolic groups. If time permits, I would also like to talk about the analogue in continuous spaces, such as Lie groups or symmetric spaces.
In discrete group theory, a Cayley graph is a fundamental concept to view a finitely generated group as a geometric object itself. For example, the planar lattice is constructed from the free abelian group Z^2, and the 4-regular tree is constructed from the free group F_2. A group acts naturally on its Cayley graph as translations, so Bernoulli percolations on the graph can be viewed as a random graph whose distribution is invariant under the group action. In this talk, after reviewing previous works on such group-invariant random graphs, I will present my result concerning random walks on group-invariant random graphs over Gromov-hyperbolic groups. If time permits, I would also like to talk about the analogue in continuous spaces, such as Lie groups or symmetric spaces.
