Path integral, functional method, and stochastic dynamical systems

A stochastic path-integral (SPI) technique for chemical reaction dynamics is explored. It is shown that this technique enables the direct computation of the transition amplitude with a finite space-time range, by generating a set of classical paths subject to simultaneous stochastic differential equ

The purpose of this study is to develop a stochastic Newmark integration principle based on an implicit stochastic Taylor (Ito}Taylor or Stratonovich}Taylor) expansion of the vector "eld. As in the deterministic case, implicitness in stochastic Taylor expansions for the displacement and velocity vec

We consider a routing policy that forms a dynamic shortest path in a network with independent, positive and discrete random arc costs. When visiting a node in the network, the costs for the arcs going out of this node are realized, and then the policy will determine which node to visit next with the

Feynman's path integral formulation of quantum statistical mechanics, which has commonly been applied be Monte Carlo methods, is now also implemented by traditional molecular dynamics simulations of the microcanonical ensemble and in the No&-Hoover method simulating the isothermal-isobaric ensemble.