Radial Fast Diffusion on the Hyperbolic Space

Abstract

We consider radial solutions to the fast diffusion equation ut= um on the hyperbolic space HN for N 2, m∈(ms,1), ms=N-2N+2. By radial we mean solutions depending only on the geodesic distance r from a given point o ∈ HN. We investigate their fine asymptotics near the extinction time T in terms of a separable solution of the form V(r,t)=(1-t/T)1/(1-m)V1/m(r), where V is the unique positive energy solution, radial w.r.t. o, to - V=c\,V1/m for a suitable c>0, a semilinear elliptic problem thoroughly studied in MS08, BGGV. We show that u converges to V in relative error, in the sense that \|um(·,t)/ Vm(·,t)-1\|∞0 as t T-. In particular the solution is bounded above and below, near the extinction time T, by multiples of (1-t/T)1/(1-m)e-(N-1)r/m.