Mixed linear fractional boundary value problems

Abstract

In this article we obtain two-sided estimates for the Greens function of fractional boundary value problems on R+ × R+ × Rd of the form \[(-t1Dβ0+* - t2Dγ0+*)u(t1, t2, x) = Lxu(t1, t2, x),\] with some prescribed boundary functions on the boundaries \0\ × R+ × Rd and R+ ×\0\× Rd. The operators t1Dβ and t1Dγ are Caputo fractional derivatives of order β, γ ∈ (0, 1) and Lx is the generator of a diffusion semigroup: Lx= ∇ ·(a(x) ∇) for some nice function a(x). The Greens function of such boundary value problems are decomposed into its components along each boundary, giving rise to a natural extension to the case involving k ≥ 2 number of fractional derivatives on the left hand side.