Schwarzian derivative, Painlevé XXV–Ermakov equation, and Bäcklund transformations
Artykuł naukowy w czasopiśmie recenzowanyCzasopismo: MATHEMATISCHE NACHRICHTEN (ISSN: 0025-584X)
Współautorzy: Sandra Carillo Galina Filipuk Federico Zullo
Rok wydania: 2024
Tom: 297
Numer czasopisma: 1
Strony od-do: 83-101
Streszczenie: The role of Schwarzian derivative in the study of nonlinear ordinary differential equations is revisited. Solutions and invariances admitted by Painlevé XXV–Ermakov equation, Ermakov equation, and third-order linear equation in a normal form are shown to be based on solutions of the Schwarzian equation. Starting from the Riccati equation and the second-order element of the Riccati chain as the simplest examples of linearizable equations, by introducing a suitable change of variables, it is shown how the Schwarzian derivative represents a key tool in the construction of solutions. Two families of Bäcklund transformations, which link the linear and nonlinear equations under investigation, are obtained. Some analytical examples are given and discussed.
Słowa kluczowe: Bäcklund transformations, Ermakov equation, Painlevé XXV–Ermakov equation, Schwarzian derivative
DOI: https://doi.org/10.1002/mana.202200180
Cytowanie w formacie Bibtex:
@article{1,
author = "Aliaksandr Chychuryn and Sandra Carillo Galina Filipuk Federico Zullo",
title = "Schwarzian derivative, Painlevé XXV–Ermakov equation, and Bäcklund transformations",
journal = "MATHEMATISCHE NACHRICHTEN",
year = "2024",
number = "1",
pages = "83-101"
}
Cytowanie w formacie APA:
Chychuryn, A. and Sandra Carillo Galina Filipuk Federico Zullo(2024). Schwarzian derivative, Painlevé XXV–Ermakov equation, and Bäcklund transformations. MATHEMATISCHE NACHRICHTEN, 1, 83-101.