Multifractal features of random walks on random fractals

Abstract

We find that the fluctuations of the probability density P(r,t) of random walks on random fractals, for fixed distance r and time t, have a broad logarithmic distribution. The average moments 〈${\mathit{P}}^{\mathit{q}}$〉 scale is a multifractal way, 〈${\mathit{P}}^{\mathit{q}}$〉∼〈P${\mathrm{〉}}^{\mathrm{\tau }\left(\mathit{q}\right)}$, where τ(q)∼${\mathit{q}}^{\gamma }$, γl space, the distribution of P(l,t) is narrow and 〈${\mathit{P}}^{\mathit{q}}$〉∼〈P${\mathrm{〉}}^{\mathit{q}}$.