Diffusion and annihilation reactions of Levy flights with bounded long-range hoppings

Abstract

A new kind of random walk named bounded Levy flights (BLFs), where the step length is a bounded random variable, is proposed and their properties are studied with the aid of mean field and Monte Carlo techniques. BLFs are characterized by the Levy exponent ( sigma ) and the length of the longest possible flight (R_M). It is found that in one dimension (1D), the mean number of distinct sites visited by the walker (S_N) and the average square displacement (R_N²) behave like S_N varies as R^Q_MN^ds(Q=f^sigma ,ds=1/2) and R²_N varies as R_M^{f( sigma )}N^nu (v=1), where f( sigma ) is a continuously tunable function of sigma with f( sigma )0.9 ( sigma 0.1) and f( sigma )0 ( sigma 2). In addition, the long-time behaviour of annihilation reactions between BLFs, which react via exchange in 1D is found to be anomalous because the density of walkers ( rho _A) behaves like d rho _A/dt-R^{f( sigma )}_M rho _A^X with X=1+(1/ds)=3(t) while, shortly after the beginning of the reaction, the classical behaviour X=2(t0) holds.