Periodzing quasicrystals: Dynamics in quasiperiodic structures
主 题: Periodzing quasicrystals: Dynamics in quasiperiodic structures
We introduce a construction to "periodize" a quasiperiodic lattice of obstacles, i.e., embed it into a unit cell in a higher-dimensional space, reversing the projection method used to form quasilattices. with this construction we simulate dynamics, in quasiperiodic structures were we found a superdiffusion regimen for small obstacles and subdiffusive regime when obstacles overlap. Also we show the generic existence of channels, where particles travel without colliding, up to a critical obstacle radius, which we calculated previously for a Penrose tiling.
报告人: DR. Atahualpa Kraemer (National Autonomous University of Mexico)
时 间: 2014-05-08 16:00-17:00
地 点: 理科一号楼1303室（联系人：刘艳云）