English

A maximal $L_p$-regularity theory to initial value problems with time measurable nonlocal operators generated by additive processes

Probability 2023-02-06 v3 Analysis of PDEs

Abstract

Let Z=(Zt)t0Z=(Z_t)_{t\geq0} be an additive process with a bounded triplet (0,0,Λt)t0(0,0,\Lambda_t)_{t\geq0}. Suppose that for any Schwartz function φ\varphi on Rd\mathbb{R}^d whose Fourier transform is in Cc(BcsBcs1)C_c^{\infty}(B_{c_s} \setminus B_{c_s^{-1}} ), there exist positive constants N0N_0, N1N_1, and N2N_2 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 ψμ(r1D)φL1(Rd)N2s(r),r(0,1). \|\psi^{\mu}(r^{-1}D)\varphi\|_{L_1(\mathbb{R}^d)}\leq \frac{N_2}{s(r)},\quad \forall r\in(0,1). where ss is a scaling function (Definition 2.4), csc_s is a positive constant related to ss, μ\mu is a symmetric L\'evy measure on Rd\mathbb{R}^d, ψμ(r1D)φ(x)=F1[ψμ(r1ξ)F[φ]](x)\psi^{\mu}(r^{-1}D)\varphi(x)= \mathcal{F}^{-1} \left[ \psi^{\mu}(r^{-1}\xi) \mathcal{F}[\varphi]\right](x) and ψμ(ξ):=Rd(eiyξ1iyξ1y1)μ(dy).\psi^{\mu}(\xi):=\int_{\mathbb{R}^d}(e^{iy\cdot\xi}-1-iy\cdot\xi 1_{|y|\leq 1})\mu(dy). In this paper, we establish the LpL_p-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 uu to equation satisfying uLq((0,T);Hpμ;γ(Rd))Nu0Bp,qs;γ2q(Rd), \|u\|_{L_q((0,T);H_p^{\mu;\gamma}(\mathbb{R}^d))}\leq N\|u_0\|_{B_{p,q}^{s;\gamma-\frac{2}{q}}(\mathbb{R}^d)}, where NN is independent of uu and u0u_0, and the spaces Bp,qs;γ2q(Rd)B_{p,q}^{s;\gamma-\frac{2}{q}}(\mathbb{R}^d) and Hpμ;γ(Rd)H_p^{\mu;\gamma}(\mathbb{R}^d) are scaled Besov spaces (see Definition 2.8) and generalized Bessel potential spaces (see Definition 2.3), respectively.

Keywords

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

R2 v1 2026-06-23T19:00:42.644Z