Statistical exponential formulas for homogeneous diffusion

Abstract

Let 1p denote the 1-homogeneous p-Laplacian, for 1 ≤ p ≤ ∞. This paper proves that the unique bounded, continuous viscosity solution u of the Cauchy problem \[ \ arrayc ut \ - \ ( p \, N + p - 2 \, ) \, 1p u ~ = ~ 0 for x ∈ RN, t > 0 \\ \\ u(·,0) ~ = ~ u0 ∈ BUC( RN ) array . \] is given by the exponential formula \[ u(t) ~ := ~ n ∞ ( Mt/np )n u0 \, \] where the statistical operator Mhp BUC( RN ) BUC( RN ) is defined by \[ (Mhp )(x) := (1-q) median∂ B(x,2h) \ \, \, \ + q mean∂ B(x,2h) \ \, \, \ \, \] with q := N ( p - 1 ) N + p - 2 , when 1 ≤ p ≤ 2 and by \[ (Mhp )(x) := ( 1 - q ) midrange∂ B(x,2h) \ \, \, \ + q mean∂ B(x,2h) \ \, \, \ \, \] with q = N N + p - 2 , when p ≥ 2. Possible extensions to problems with Dirichlet boundary conditions and to homogeneous diffusion on metric measure spaces are mentioned briefly.