Time-changed processes governed by space-time fractional telegraph equations

Abstract

In this work we construct compositions of processes of the form Sn2β(c2 L (t) , t>0, ∈ (0, 1/2], β ∈ (0,1], n ∈ N, whose distribution is related to space-time fractional n-dimensional telegraph equations. We present within a unifying framework the pde connections of n-dimensional isotropic stable processes Sn2β whose random time is represented by the inverse L (t), t>0, of the superposition of independent positively-skewed stable processes, H (t) = H12 (t) + (2λ 1 H2 (t), t>0, (H12, H2, independent stable subordinators). As special cases for n=1, = 1/2 and β = 1 we examine the telegraph process T at Brownian time B (Orsingher and Beghin) and establish the equality in distribution B (c2 L1/2 (t)) law= T (|B(t)|), t>0. Furthermore the iterated Brownian motion (Allouba and Zheng) and the two-dimensional motion at finite velocity with a random time are investigated. For all these processes we present their counterparts as Brownian motion at delayed stable-distributed time.