Exact interpolation between Fick and Cattaneo diffusion in relativistic kinetic theory

Abstract

We construct a family of exactly solvable relativistic kinetic theories in 1+1 dimensions whose hydrodynamic sector continuously interpolates between Fick's and Cattaneo's laws of diffusion. The interpolation is controlled by a single parameter a∈[0,1], which tunes the microscopic scattering dynamics from infinitely soft but infinitely frequent scatterings (a=0), reproducing standard diffusion, to maximally hard but finite-rate scatterings (a=1), yielding hyperbolic Cattaneo-type transport. For intermediate values of a, the dynamics combines frequent weak scatterings with rare strong randomizing events, providing a concrete microscopic realization of mixed diffusive-telegraphic behavior. Remarkably, the full quasinormal mode spectrum can be obtained analytically for all a. This allows us to track explicitly how purely diffusive modes continuously deform into damped propagating modes as the collision structure is varied.