Abstract Lax-Phillips scattering scheme for second-order operator-differential equations
DOI10.1007/BF02390611zbMATH Open0891.47008OpenAlexW2086992618MaRDI QIDQ3364956
Publication date: 1996
Published in: Ukrainian Mathematical Journal (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf02390611
scattering matrixoperator-differential equationLax-Phillips scattering schemeselfadjoint extensionincoming subspacemaximal symmetric operatoroutgoing subspacepositive boundary value space
Linear symmetric and selfadjoint operators (unbounded) (47B25) Linear differential equations in abstract spaces (34G10) Scattering theory of linear operators (47A40)
Related Items (1)
Recommendations
- Unnamed Item 👍 👎
- Unnamed Item 👍 👎
- An abstract Lax-Phillips scattering theory for a class of second-order equations 👍 👎
- Scattering operator and associated semigroup in the generalized Lax-- Phillips scheme 👍 👎
- On the Lax-Phillips scattering matrix of the abstract wave equation 👍 👎
- On elements of scattering theory for abstract Schrödinger equation. Lax-Phillips approach 👍 👎
- On elements of the Lax-Phillips scattering scheme for ρ-perturbations of an abstract wave equation 👍 👎
- Abstract scattering scheme of Lax and Phillips in Pontryagin spaces 👍 👎
- Abstract Lax-Phillips scattering scheme for second-order operator-differential equations 👍 👎
- On the determination of free evolution in the Lax-Phillips scattering scheme for second-order operator-differential equations 👍 👎
This page was built for publication: Abstract Lax-Phillips scattering scheme for second-order operator-differential equations
