K. E. Lenz, H. E. Lomeli, J. D. Meiss, “Quadratic volume preserving maps: an extension of a result of Moser”, Regul. Chaotic Dyn., 1998, Volume 3, Issue 3,Pages <nobr>122

This article is cited in 11 papers

On the 70th birthday of J.Moser

Quadratic volume preserving maps: an extension of a result of Moser

K. E. Lenz^a, H. E. Lomeli^b, J. D. Meiss^c

^a Department of Mathematics and Statistics, University of Minnesota, Duluth, MN 55812
^b Depeurtment of Mathematics, Instituto Tecnológico Autónomo de México, México, DF 01000
^c Department of Applied Mathematics, University of Colorado, Boulder, CO 80309

Abstract: A natural generalization of the Henon map of the plane is a quadratic diffeomorphism that has a quadratic inverse. We study the case when these maps are volume preserving, which generalizes the the family of symplectic quadratic maps studied by Moser. In this paper we obtain a characterization of these maps for dimension four and less. In addition, we use Moser's result to construct a subfamily of in n dimensions.

MSC: 34C23, 34C35, 58F08

Received: 11.07.1998

Language: English

DOI: 10.1070/RD1998v003n03ABEH000085