On the integrability of polynomial fields in the plane by means of Picard-Vessiot theory

Lázaro Ochoa, José Tomás; Morales Ruíz, Juan José; Acosta Humánez, Primitivo Belén; Pantazi, Chara

View/Open

article principal (331,0Kb)

View Usage Statistics

Cita com:

Show full item record

Lázaro Ochoa, José Tomás

Morales Ruíz, Juan José

Acosta Humánez, Primitivo Belén

Pantazi, Chara

Document typeExternal research report

Defense date2012-01-12

Rights accessOpen Access

Abstract

We study the integrability of polynomial vector fields using Galois theory of linear differential equations when the associated foliations is reduced to a Riccati type foliation. In particular we obtain integrability results for some families of quadratic vector fields, Li\'enard equations and equations related with special functions such as Hypergeometric and Heun ones. We also study the Poincar\'e problem for some of the families.

CitationLázaro, J. [et al.]. "On the integrability of polynomial fields in the plane by means of Picard-Vessiot theory". 2012.

URIhttp://hdl.handle.net/2117/14764

URL other repositoryhttp://arxiv.org/abs/1012.4796v2

Collections

View Usage Statistics

Show full item record

Files	Description	Size	Format	View
1012-AcostaLazaroMoralesPantazi2010.pdf	article principal	331,0Kb	PDF	View/Open

Except where otherwise noted, content on this work is licensed under a Creative Commons license : Attribution-NonCommercial-NoDerivs 3.0 Spain

UPCommons. Global access to UPC knowledge

On the integrability of polynomial fields in the plane by means of Picard-Vessiot theory

View/Open

Browse