定量生物学中心学术报告

题目： Mathematical methods for stochastic dynamics

报告人： 钱纮 教授

美国西雅图华盛顿大学应用数学系教授

时间: 2015-7-17（周五），2:00pm-4:00pm

地点：英国威廉希尔公司老化学楼东配楼102会议室

主持人：定量生物学中心，汤超教授

摘要:

We outline an attempt to lay the groundwork for understanding stochastic dynamical descriptions of biological, and other complex processes in terms of a discrete-state space, discrete-time random dynamical system (RDS), or random transformation approach. Such mathematics is not new for continuous systems, but the discrete state space formulation significantly reduces the technical requirements for its introduction to a much broader audiences. In particular, we establish some elementary contradistinctions between Markov chain (MC) and RDS descriptions of a stochastic dynamics. It is shown that a given MC is compatible with many possible RDS, and we study in particular the corresponding RDS with maximum metric entropy. Specifically, we show an emergent behavior of an MC with a unique absorbing and aperiodic communicating class, after all the trajectories of the RDS synchronizes. In biological modeling, it is now widely acknowledged that stochastic dynamics is a more complete description of biological reality than deterministic equations; here we further suggest that the RDS description could be a more refined description of stochastic dynamics than a Markov process.  Possible applications of discrete-state RDS are systems with fluctuating law of motion, or environment, rather than inherent stochastic movements of individuals.

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