English

Dirichlet problems associated to abstract nonlocal space-time differential operators

Analysis of PDEs 2025-04-08 v2

Abstract

Let the abstract fractional space-time operator (t+A)s(\partial_t + A)^s be given, where s(0,)s \in (0,\infty) and A ⁣:D(A)XX-A \colon \mathsf{D}(A) \subseteq X \to X is a linear operator generating a uniformly bounded strongly measurable semigroup (S(t))t0(S(t))_{t\ge0} on a complex Banach space XX. We consider the corresponding Dirichlet problem of finding a function u ⁣:RXu \colon \mathbb{R} \to X such that (t+A)su(t)=0(\partial_t + A)^s u(t) = 0 on (t0,)(t_0, \infty) and u(t)=g(t)u(t) = g(t) on (,t0](-\infty, t_0], for given t0Rt_0 \in \mathbb{R} and g ⁣:(,t0]Xg \colon (-\infty,t_0] \to X. We define the concept of LpL^p-solutions, to which we associate a mild solution formula which expresses uu in terms of gg and (S(t))t0(S(t))_{t\ge0} and generalizes the well-known variation of constants formula for the mild solution to the abstract Cauchy problem u+Au=0u' + Au = 0 on (t0,)(t_0, \infty) with u(t0)=xD(A)u(t_0) = x \in \overline{\mathsf{D}(A)}. Moreover, we include a comparison to analogous solution concepts arising from Riemann-Liouville and Caputo type initial value problems.

Keywords

Cite

@article{arxiv.2404.11289,
  title  = {Dirichlet problems associated to abstract nonlocal space-time differential operators},
  author = {Joshua Willems},
  journal= {arXiv preprint arXiv:2404.11289},
  year   = {2025}
}

Comments

25 pages

R2 v1 2026-06-28T15:57:07.484Z