Enhanced dissipation and H\"ormander's hypoellipticity

Abstract

We examine the phenomenon of enhanced dissipation from the perspective of H\"ormander's classical theory of second order hypoelliptic operators [31]. Consider a passive scalar in a shear flow, whose evolution is described by the advection-diffusion equation \[ ∂t f + b(y) ∂x f - f = 0 on T × (0,1) × R+ \] with periodic, Dirichlet, or Neumann conditions in y. We demonstrate that decay is enhanced on the timescale T -(N+1)/(N+3), where N-1 is the maximal order of vanishing of the derivative b'(y) of the shear profile and N=0 for monotone shear flows. In the periodic setting, we recover the known timescale of Bedrossian and Coti Zelati [8]. Our results are new in the presence of boundaries.