Mean perimeter and area of the convex hull of a planar Brownian motion in the presence of resetting

Abstract

We compute exactly the mean perimeter and the mean area of the convex hull of a 2-d Brownian motion of duration t and diffusion constant D, in the presence of resetting to the origin at a constant rate r. We show that for any t, the mean perimeter is given by L(t)= 2 π Dr\, f1(rt) and the mean area is given by A(t) = 2πDr\, f2(rt) where the scaling functions f1(z) and f2(z) are computed explicitly. For large t 1/r, the mean perimeter grows extremely slowly as L(t) (rt) with time. Likewise, the mean area also grows slowly as A(t) 2(rt) for t 1/r. Our exact results indicate that the convex hull, in the presence of resetting, approaches a circular shape at late times. Numerical simulations are in perfect agreement with our analytical predictions.