Velocity and diffusion constant of an active particle in a one dimensional force field

Abstract

We consider a run an tumble particle with two velocity states v0, in an inhomogeneous force field f(x) in one dimension. We obtain exact formulae for its velocity VL and diffusion constant DL for arbitrary periodic f(x) of period L. They involve the "active potential" which allows to define a global bias. Upon varying parameters, such as an external force F, the dynamics undergoes transitions from non-ergodic trapped states, to various moving states, some with non analyticities in the VL versus F curve. A random landscape in the presence of a bias leads, for large L, to anomalous diffusion x tμ, μ<1, or to a phase with a finite velocity that we calculate.