2018
DOI: 10.1007/s00041-018-9633-3
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The Hagedorn–Hermite Correspondence

Abstract: We investigate the relationship between the semiclassical wave packets of Hagedorn and the Hermite functions by establishing a relationship between their ladder operators. This Hagedorn-Hermite correspondence provides a unified view as well as simple proofs of some essential results on the Hagedorn wave packets. Particularly, we show that Hagedorn's ladder operators are a natural set of ladder operators obtained from the position and momentum operators using the symplectic group. This construction reveals an a… Show more

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Cited by 5 publications
(6 citation statements)
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“…We drop the time and spatial dependence for brevity here. Just as we have done in the above subsection, rewriting the cubic term in (22) for α using (10), we obtain…”
Section: 3mentioning
confidence: 92%
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“…We drop the time and spatial dependence for brevity here. Just as we have done in the above subsection, rewriting the cubic term in (22) for α using (10), we obtain…”
Section: 3mentioning
confidence: 92%
“…What if one uses the classical Hamiltonian system for (q, p) as in (4) of Hagedorn? As discussed in Remark 2.5, we have α as shown in (22). Then, as shown in Appendix A.3, we have…”
Section: 2mentioning
confidence: 95%
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“…Hagedorn's semiclassical wave packets are closely related to, or coincide with, generalized coherent states or generalized squeezed states, as studied by Combescure (1992), Robert (2007) and Combescure and Robert (2012). The precise relationship was expounded by Lasser and Troppmann (2014) and more recently by Ohsawa (2019). Ohsawa (2018) derived differential equations for the variational approximation by a single Hagedorn function ϕ ε k of arbitrary index k, for an approximate Hamiltonian.…”
Section: Notesmentioning
confidence: 98%