The Breit-Wigner series for noncompactly supported potentials on the line

The Breit-Wigner series for noncompactly supported potentials on the line

We propose a conjecture stating that for resonances, $\lambda_j$, of a noncompactly supported potential, the series $\sum_j \operatorname{Im} \lambda_j/|\lambda_j|^2$ diverges. This series appears in the Breit-Wigner approximation for a compactly supported potential, in which case it converges. We p...

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Sprache:eng
Schlagworte:
Mathematics - Analysis of PDEs
Mathematics - Complex Variables
Mathematics - Mathematical Physics
Mathematics - Spectral Theory
Physics - Mathematical Physics
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Zusammenfassung:We propose a conjecture stating that for resonances, $\lambda_j$, of a noncompactly supported potential, the series $\sum_j \operatorname{Im} \lambda_j/|\lambda_j|^2$ diverges. This series appears in the Breit-Wigner approximation for a compactly supported potential, in which case it converges. We provide heuristic motivation for this conjecture and prove it in several cases.
DOI:10.48550/arxiv.2005.13765