Local resetting with geometric confinement

‘Local resetting’ was recently introduced to describe stochastic resetting in interacting systems where particles independently try to reset to a common ‘origin’. Our understanding of such systems, where the resetting process is itself affected by interactions, is still very limited. One ubiquitous constraint that is often imposed on the dynamics of interacting particles is geometric confinement, e.g. restricting rigid spherical particles to a channel so narrow that overtaking becomes difficult. We here explore the interplay between local resetting and geometric confinement in a system consisting of two species of diffusive particles: ‘bath’ particles, and ‘tracers’ which undergo local resetting. Mean-field (MF) analysis and numerical simulations show that the resetting tracers, whose stationary density profile exhibits a typical ‘tent-like’ shape, imprint this shape onto the bath density profile. Upon varying the ratio of the degree of geometric confinement over particle diffusivity, the system is found to transition between two states. In one tracers expel bath particles away from the origin, while in the other they ensnare them instead. Between these two states, we find a special case where the MF approximation is exact.