首页 | 本学科首页   官方微博 | 高级检索  
     


Asymptotics of the transition probabilities of the simple random walk on self-similar graphs
Authors:Bernhard Krö  n   Elmar Teufl
Affiliation:Erwin Schrödinger Institute (ESI) Vienna, Boltzmanngasse 9, 1090 Wien, Austria ; Department of Mathematics C, Graz University of Technology, Steyrergasse 30, 8010 Graz, Austria
Abstract:It is shown explicitly how self-similar graphs can be obtained as `blow-up' constructions of finite cell graphs $hat C$. This yields a larger family of graphs than the graphs obtained by discretising continuous self-similar fractals.

For a class of symmetrically self-similar graphs we study the simple random walk on a cell graph $hat C$, starting at a vertex $v$ of the boundary of $hat C$. It is proved that the expected number of returns to $v$before hitting another vertex in the boundary coincides with the resistance scaling factor.

Using techniques from complex rational iteration and singularity analysis for Green functions, we compute the asymptotic behaviour of the $n$-step transition probabilities of the simple random walk on the whole graph. The results of Grabner and Woess for the Sierpinski graph are generalised to the class of symmetrically self-similar graphs, and at the same time the error term of the asymptotic expression is improved. Finally, we present a criterion for the occurrence of oscillating phenomena of the $n$-step transition probabilities.

Keywords:Self-similar graphs   simple random walk   transition probability
点击此处可从《Transactions of the American Mathematical Society》浏览原始摘要信息
点击此处可从《Transactions of the American Mathematical Society》下载全文
设为首页 | 免责声明 | 关于勤云 | 加入收藏

Copyright©北京勤云科技发展有限公司  京ICP备09084417号