dorsal/arxiv
View SchemaBuilding scars for integrable systems
| Authors | M. Baldo, F. Raciti |
|---|---|
| Categories | |
| ArXiv ID | quant-ph/9507013 |
| URL | https://arxiv.org/abs/quant-ph/9507013 |
Abstract
It is shown, by means of a simple specific example, that for integrable systems it is possible to build up approximate eigenfunctions, called {\it asymptotic eigenfunctions}, which are concentrated as much as one wants to a classical trajectory and have a lifetime as long as one wants. These states are directly related to the presence of shell structures in the quantal spectrum of the system. It is argued that the result can be extended to classically chaotic system, at least in the asymptotic regime.
{
"annotation_id": "aa4baab6-cb40-4162-aa36-3007c1b2394e",
"date_created": "2026-03-02T18:02:38.017000Z",
"date_modified": "2026-03-02T18:02:38.017000Z",
"file_hash": "42a16a5c9b043e0adb7ab08b8487e469b4b423ffde47cb1f9cf2992619672d80",
"private": false,
"record": {
"abstract": "It is shown, by means of a simple specific example, that for integrable\nsystems it is possible to build up approximate eigenfunctions, called {\\it\nasymptotic eigenfunctions}, which are concentrated as much as one wants to a\nclassical trajectory and have a lifetime as long as one wants. These states are\ndirectly related to the presence of shell structures in the quantal spectrum of\nthe system. It is argued that the result can be extended to classically chaotic\nsystem, at least in the asymptotic regime.",
"arxiv_id": "quant-ph/9507013",
"authors": [
"M. Baldo",
"F. Raciti"
],
"categories": [
"quant-ph"
],
"title": "Building scars for integrable systems",
"url": "https://arxiv.org/abs/quant-ph/9507013"
},
"schema_id": "dorsal/arxiv",
"source": {
"execution_id": "6cbba6c9-182b-400c-bea8-e6c9ad665474",
"id": "arXiv Dataset IDs",
"type": "Model",
"variant": "snapshot-2026-03-01",
"version": "0.1.0"
},
"user_id": 1000002
}