A maximal $L_p$-regularity theory to initial value problems with time measurable nonlocal operators generated by additive processes
Abstract
Let be an additive process with a bounded triplet . Suppose that for any Schwartz function on whose Fourier transform is in , there exist positive constants , , and such that \begin{equation*} \int_{\mathbb{R}^d}|\mathbb{E}[\varphi(x+r^{-1}Z_t)]|dx\leq N_0 e^{- \frac{N_1 t}{s(r)}},\quad \forall (r,t)\in(0,1)\times[0,T], \end{equation*} and where is a scaling function (Definition 2.4), is a positive constant related to , is a symmetric L\'evy measure on , and In this paper, we establish the -solvability to the initial value problem \begin{equation} \frac{\partial u}{\partial t}(t,x)=\mathcal{A}_Z(t)u(t,x),\quad u(0,\cdot)=u_0,\quad (t,x)\in(0,T)\times\mathbb{R}^d, \end{equation} In other words, there exists a unique solution to equation satisfying where is independent of and , and the spaces and are scaled Besov spaces (see Definition 2.8) and generalized Bessel potential spaces (see Definition 2.3), respectively.
Cite
@article{arxiv.2010.01533,
title = {A maximal $L_p$-regularity theory to initial value problems with time measurable nonlocal operators generated by additive processes},
author = {Jae-Hwan Choi and Ildoo Kim},
journal= {arXiv preprint arXiv:2010.01533},
year = {2023}
}
Comments
47 pages