主题:Discrete probability models under viewpoints of quasi-isometry and universality:Starting from concrete examples
主讲人:向开南教授(湘潭大学)
主持人:柳向东教授(88858cc永利官网)
会议时间:2023年2月25日(周六)10:00—11:00
会议地点:88858cc永利官网102室
★摘要★
Vladas Sidoravicius, Longmin Wang, Kainan Xiang (2023, Comm. Pure Appl. Math.) proved the universality that for branching random walks on non-elementary hyperbolic groups, critical exponents for their volume growths and Hausdorff dimensions of their boundaries are 1/2 (made a breakthrough of a related conjecture in S. Lalley ICM2006; and conjectured the dimension formula in the critical case is still true, which was confirmed in 2022 as a corollary by a remarkable paper of M. Dussaule, Longmin Wang and Wenyuan Yang (arXiv:2211.07213)). Kainan Xiang, Lang Zou (2022. Stat. Probab. Lett. 184, 109378, 6pp.) proved that surviving end number in Bernoulli percolation on graphs has a certain quasi-isometry invariance. Starting from these, we illustrate universality and rigidity of discrete probability models.
Recall a central prediction of renormalization group theory that critical behaviors of statistical physics models on polynomial growth groups (finite dimensional graphs) depend only dimensions rather than choices of lattices and large-scale geometries. Do critical behaviors of statistical physics models on infinite dimensional graphs (for example, nonamenable graphs) depend only on some large-scale geometry (for instance, hyperbolicity)? These are universalities of statistical physics models on groups and graphs. From a viewpoint of quasi-isometry, it is believed that to a certain degree, some properties of some fundamental stochastic processes (random walk, Bernoulli percolation, uniform spanning forest and minimal spanning forest etc.) on groups and graphs are quasi-isometric invariant, which are rigidities of discrete probability models.
★主讲人简介★
向开南,1993年6月本科毕业于湘潭大学数学系,1993.9-1996.6在北京师范大学数学系读硕士,1996.9-1999.6在中国科学院应用数学研究所读博士;1999.7-2001.6在北京大学数学科学学院做博士后;2001年6月博士后出站后进入湖南师范大学工作,2007年3月调往南开大学,2019年3月回湘潭大学工作;对群和图上的概率与几何(随机游走、随机图、渗流、几何群论、无穷图论等)感兴趣。