Subordination principle and Feynman-Kac formulae for generalized time-fractional evolution equations

Abstract

We consider generalized time-fractional evolution equations of the form u(t)=u0+∫0tk(t,s)Lu(s)ds with a fairly general memory kernel k and an operator L being the generator of a strongly continuous semigroup. In particular, L may be the generator L0 of a Markov process on some state space Q, or L:=L0+b∇+V for a suitable potential V and drift b, or L generating subordinate semigroups or Schr\"odinger type groups. This class of evolution equations includes in particular time- and space- fractional heat and Schr\"odinger type equations. We show that a subordination principle holds for such evolution equations and obtain Feynman-Kac formulae for solutions of these equations with the use of different stochastic processes, such as subordinate Markov processes and randomly scaled Gaussian processes. In particular, we obtain some Feynman-Kac formulae with generalized grey Brownian motion and other related self-similar processes with stationary increments.