Propagation of singularities in many-body scattering in the presence of bound states

András Vasy

doi:10.5802/jedp.560

András Vasy

Journées équations aux dérivées partielles (1999), article no. 16, 20 p.

Abstract

In these lecture notes we describe the propagation of singularities of tempered distributional solutions $u \in 𝒮^{'}$ of $(H - λ) u = 0$ , where $H$ is a many-body hamiltonian $H = Δ + V$ , $Δ \geq 0$ , $V = \sum_{a} V_{a}$ , and $λ$ is not a threshold of $H$ , under the assumption that the inter-particle (e.g. two-body) interactions $V_{a}$ are real-valued polyhomogeneous symbols of order $- 1$ (e.g. Coulomb-type with the singularity at the origin removed). Here the term “singularity” provides a microlocal description of the lack of decay at infinity. Our result is then that the set of singularities of $u$ is a union of maximally extended broken bicharacteristics of $H$ . These are curves in the characteristic variety of $H$ , which can be quite complicated due to the existence of bound states. We use this result to describe the wave front relation of the S-matrices. Here we only present the statement of the results and sketch some of the ideas in proving them, the complete details will appear elsewhere.

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DOI: 10.5802/jedp.560

András Vasy. Propagation of singularities in many-body scattering in the presence of bound states. Journées équations aux dérivées partielles (1999), article  no. 16, 20 p.. doi: 10.5802/jedp.560

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