On a class of integrable systems with a quartic first integral

Abstract

We generalize, to some extent, the results on integrable geodesic flows on two dimensional manifolds with a quartic first integral in the framework laid down by Selivanova and Hadeler. The local structure is first determined by a direct integration of the differential system which expresses the conservation of the quartic observable and is seen to involve a finite number of parameters. The global structure is studied in some details and leads to a class of models living on the manifolds S2, H2 or R2. As special cases we recover Kovalevskaya's integrable system and a generalization of it due to Goryachev.