Hostname: page-component-78c5997874-g7gxr Total loading time: 0 Render date: 2024-11-19T16:42:47.778Z Has data issue: false hasContentIssue false
  • English
  • Français

Wave Equation with Slowly Decaying Potential: asymptotics ofSolution and Wave Operators

Published online by Cambridge University Press:  12 May 2010

S. A. Denisov
S. A. Denisov*
Affiliation:
University of Wisconsin–Madison, Mathematics Department 480 Lincoln Dr., Madison, WI, 53706, USA
*
1 E-mail: [email protected]
Get access

Abstract

In this paper, we consider one-dimensional wave equation with real-valued square-summablepotential. We establish the long-time asymptotics of solutions by, first, studying thestationary problem and, second, using the spectral representation for the evolutionequation. In particular, we prove that part of the wave travels ballistically ifqL 2(ℝ+) and this result issharp.

Keywords

wave equationsquare-summable potentialwave operators
Type
Research Article
Information
Mathematical Modelling of Natural Phenomena , Volume 5 , Issue 4: Spectral problems. Issue dedicated to the memory of M. Birman , 2010 , pp. 122 - 149
Copyright
© EDP Sciences, 2010

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

Christ, M., Kiselev, A.. Scattering and wave operators for one-dimensional Schrödinger operators with slowly decaying nonsmooth potentials . Geom. Funct. Anal., 12 (2002), 11741234.CrossRefGoogle Scholar
Damanik, D., Simon, B.. Jost functions and Jost solutions for Jacobi matrices. I. A necessary and sufficient condition for Szegő asymptotics . Invent. Math., 165 (2006), No. 1, 150.CrossRefGoogle Scholar
S. Denisov. On weak asymptotics for Schrödinger evolution. Mathematical Modelling of Natural Phenomena (to appear).
Denisov, S.. On the existence of wave operators for some Dirac operators with square summable potential . Geom. Funct. Anal., 14 (2004), No. 3, 529534.CrossRefGoogle Scholar
Denisov, S., Kupin, S.. Asymptotics of the orthogonal polynomials for the Szegő class with a polynomial weight . J. Approx. Theory, 139 (2006), No. 1–2, 828.CrossRefGoogle Scholar
Denisov, S.. Absolutely continuous spectrum of multidimensional Schrödinger operator . Int. Math. Res. Not., 2004, No. 74, 39633982. CrossRefGoogle Scholar
Killip, R.. Perturbations of one-dimensional Schrödinger operators preserving the absolutely continuous spectrum . Int. Math. Res. Not., 2002, 20292061. CrossRefGoogle Scholar
Killip, R., Simon, B.. Sum rules and spectral measure of Schrödinger operators with L 2 potentials . Ann. of Math., (2) 170 (2009), No. 2, 739782. CrossRefGoogle Scholar
P. Lax, R. Phillips. Scattering theory. Pure and Applied Mathematics, Academic Press Inc., Boston, 1989.
Naboko, S.N.. Dense point spectra of Schrödinger and Dirac operators . Theor. Mat. Fiz., 68 (1986), 1828.Google Scholar
B. Simon. Orthogonal polynomials on the unit circle. Parts 1 and 2. American Mathematical Society Colloquium Publications, American Mathematical Society, Providence, 2005.
Simon, B.. Some Schrödinger operators with dense point spectrum . Proc. Amer. Math. Soc., 125 (1997), 203208.CrossRefGoogle Scholar