English

Path integrals for stochastic hybrid reaction-diffusion processes

Statistical Mechanics 2021-10-15 v2

Abstract

We construct path integrals for stochastic hybrid reaction-diffusion (RD) processes, in which the reaction terms depend on the discrete state of a randomly switching environment. We proceed by spatially discretizing a given RD system and using a spinor representation of the environmental states to derive a path integral for the lattice model. In the case of large molecular numbers, the corresponding continuum path integral action is expressed in terms of an effective Hamiltonian, which involves a concentration field u(\x,t)u(\x,t), \xRd\x\in \R^d, a conjugate field v(\x,t)v(\x,t), and MM auxiliary conjugate pairs (cm(t),ϕm(t))(c_m(t),\phi_m(t)), where MM is the number of discrete environmental states. The variable cm(t)c_m(t) determines the effective probability that a sample path is exposed to the mm-th environmental state at time tt, with m=1Mcm(t)=1\sum_{m=1}^Mc_m(t)=1. We then consider the semi-classical (adiabatic) limit ϵ0\epsilon \rightarrow 0, where ϵ1\epsilon^{-1} determines the rate of switching between the environmental states. We show how the auxiliary variables can be eliminated to yield an action functional for the fields uu and vv alone. The associated Hamiltonian is the sum of a diffusion term and the Perron or principal eigenvalue of a functional linear operator involving the reaction terms and the matrix generator of the switching process. The reduced path integral is then used to derive a functional Hamilton-Jacobi equation for least action paths and to obtain a Gaussian noise approximation of the stochastic hybrid RD system in the adiabatic limit. Finally, the path integral in the case of low molecular numbers is constructed by considering a corresponding RD master equation. It is now necessary to take into account two sources of noise, one due to the switching environment and the other due to fluctuations in molecular numbers.

Keywords

Cite

@article{arxiv.2103.07759,
  title  = {Path integrals for stochastic hybrid reaction-diffusion processes},
  author = {Paul C. Bressloff},
  journal= {arXiv preprint arXiv:2103.07759},
  year   = {2021}
}

Comments

31 pages, 1 figure

R2 v1 2026-06-24T00:06:40.111Z