Home
About
Advanced Search
Browse by Discipline
Scientific Societies
E-print Alerts
Add E-prints
FAQ
•
HELP
•
SITE MAP
•
CONTACT US
Search
Advanced Search
Meiss, James - Department of Applied Mathematics, University of Colorado at Boulder
NL3240 Hamiltonian systems 1 NL3240 Hamiltonian systems
Targeting Chaotic Orbits to the Moon Through Erik M. Bollt and James D. Meiss
Heteroclinic primary intersections and codimension one Melnikov method for volume preserving maps \Lambda
PRAMANA c Indian Academy of Sciences Vol. 70, No. 6 --journal of June 2008
Building on the Legacy of John The Transition to Chaos in
Reversors and Symmetries for Polynomial Automorphisms of the Plane
Quadratic volume preserving maps: an extension of a result of Moser
Copyright by SIAM. Unauthorized reproduction of this article is prohibited. SIAM J. APPLIED DYNAMICAL SYSTEMS c 2011 Society for Industrial and Applied Mathematics
Transport in Time Dependent
Area-PReserving James Meiss
Invariant Torus University of Colorado
Symmetries and Integrability Volume Preserving Maps
NL3238 The Standard Map 1 NL3238 The Standard Map
Towards an Understanding of the Breakup of Invariant Tori
Stability of Minimal Periodic Orbits Holger R. Dullin y & James D. Meiss
Transient Measures in the Standard Map James D. Meiss
SIAM J. APPLIED DYNAMICAL SYSTEMS c 2005 Society for Industrial and Applied Mathematics Vol. 4, No. 3, pp. 515562
Self-Consistent Chaos in the Beam-Plasma Instability
Twist Maps and the Breakup of J. D. Meiss
Differential Dynamical Systems --Errata (Second Printing) J. D. Meiss
Physica D 139 (2000) 276300 Computing connectedness: disconnectedness and discreteness
Discontinuity Induced Bifurcations in a Model of Saccharomyces cerevisiae.
Volume-preserving maps with an invariant Department of Mathematics, University of Colorado, Boulder, Colorado 80309-0395
Heteroclinic primary intersections and codimension one Melnikov method for volume preserving maps
Reversible Polynomial Automorphisms of the Plane: the Involutory Case
Heteroclinic intersections between Invariant Circles of Volume-Preserving Maps
Twist Singularities for Symplectic Maps H. R. Dullin
Drift by Coupling to an Anti-Integrable Limit R. W. Easton, J. D. Meiss, G. Roberts
Differential Dynamical Systems Errata (First Printing)
An Approximate Renormalization for the Breakup of Invariant Tori with Three Frequencies
ON THE BREAKUP OF INVARIANT TORI WITH THREE FREQUENCIES
Differential DifferentialDynamicalSystemsJamesD.Meiss
JAMES DONALD MEISS Address Department of Applied Mathematics
Symplectic maps James D. Meiss
Average Exit Time for Volume Preserving Maps Program in Applied Mathematics
