Exit times of diffusions with incompressible drift

Abstract

Let ⊂ Rn be a bounded domain and for x∈ let τ(x) be the expected exit time from of a diffusing particle starting at x and advected by an incompressible flow u. We are interested in the question which flows maximize \|τ\|L∞(), that is, they are most efficient in the creation of hotspots inside . Surprisingly, among all simply connected domains in two dimensions, the discs are the only ones for which the zero flow u 0 maximises \|τ\|L∞(). We also show that in any dimension, among all domains with a fixed volume and all incompressible flows on them, \|τ\|L∞() is maximized by the zero flow on the ball.