English

Hyperbolic problems with totally characteristic boundary

Analysis of PDEs 2023-12-19 v1

Abstract

We study first-order symmetrizable hyperbolic N×NN\times N systems in a spacetime cylinder whose lateral boundary is totally characteristic. In local coordinates near the boundary at x=0x=0, these systems take the form tu+A(t,x,y,xDx,Dy)u=f(t,x,y),(t,x,y)(0,T)×R+×Rd, \partial_t u + \mathcal A(t,x,y,xD_x,D_y) u = f(t,x,y), \quad (t,x,y)\in(0,T)\times\mathbb R_+\times\mathbb R^d, where A(t,x,y,xDx,Dy)\mathcal A(t,x,y,xD_x,D_y) is a first-order differential operator with coefficients smooth up to x=0x=0 and the derivative with respect to xx appears in the combination xDxxD_x. No boundary conditions are required in such a situation and corresponding initial-boundary value problems are effectively Cauchy problems. We introduce a certain scale of Sobolev spaces with asymptotics and show that the Cauchy problem for the operator t+A(t,x,y,xDx,Dy)\partial_t + \mathcal A(t,x,y,xD_x,D_y) is well-posed in that scale. More specifically, solutions uu exhibit formal asymptotic expansions of the form u(t,x,y)(p,k)(1)kk!xplogk ⁣xupk(t,y)as x+0 u(t,x,y) \sim \sum_{(p,k)} \frac{(-1)^k}{k!} x^{-p} \log^k \!x \, u_{pk}(t,y) \quad \text{as $x\to+0$} where (p,k)C×N0(p,k)\in\mathbb C\times\mathbb N_0 and p\Re p\to-\infty as p|p|\to\infty, provided that the right-hand side ff and the initial data ut=0u|_{t=0} admit asymptotic expansions as x+0x \to +0 of a similar form, with the singular exponents pp and their multiplicities unchanged. In fact, the coefficient upku_{pk} are, in general, not regular enough to write the terms appearing in the asymptotic expansions as tensor products. This circumstance requires an additional analysis of the function spaces. In addition, we demonstrate that the coefficients upku_{pk} solve certain explicitly known first-order symmetrizable hyperbolic systems in the lateral boundary. Especially, it follows that the Cauchy problem for the operator t+A(t,x,y,xDx,Dy)\partial_t+\mathcal A(t,x,y,xD_x,D_y) is well-posed in the scale of standard Sobolev spaces Hs((0,T)×R+1+d)H^s((0,T)\times\mathbb R_+^{1+d}).

Keywords

Cite

@article{arxiv.2312.10644,
  title  = {Hyperbolic problems with totally characteristic boundary},
  author = {Zhuoping Ruan and Ingo Witt},
  journal= {arXiv preprint arXiv:2312.10644},
  year   = {2023}
}

Comments

28 pages

R2 v1 2026-06-28T13:53:48.751Z