Blobbed topological recursion of the quartic Kontsevich model II: Genus=0
Hock, Alexander; Wulkenhaar, Raimar; Dołega, Maciej (appendix)
Research article (journal) | Peer reviewedAbstract
We prove that the genus-0 sector of the quartic analogue of the Kontsevich model is completely governed by an involution identity which expresses the meromorphic differential ω0,n at a reflected point ιz in terms of all ω0,m with m≤n at the original point z. We prove that the solution of the involution identity obeys blobbed topological recursion, which confirms a previous conjecture about the quartic Kontsevich model.
Details about the publication
Journal: Annales de l’Institut Henri Poincaré D: Combinatorics, Physics and their Interactions (AIHPD)
Volume: online first
Status: accepted / in press (not yet published)
Release year: 2024 (22/07/2024)
Language in which the publication is written: English
DOI: 10.4171/AIHPD/198
Link to the full text: https://arxiv.org/abs/2103.13271
Keywords: (Blobbed) Topological recursion; Meromorphic forms on Riemann surfaces; Residue calculus; Involution; Partitions of sets
Authors from the University of Münster
| Hock, Alexander | Mathematical Institute |
| Wulkenhaar, Raimar | Professur für Reine Mathematik (Prof. Wulkenhaar) |