Stability and Energy-Casimir Mapping for Integrable Deformations of the Kermack-McKendrick System

Cristian Lăzureanu; Camelia Petrişor

doi:10.1155/2018/5398768

Advances in Mathematical Physics (Jan 2018)

Stability and Energy-Casimir Mapping for Integrable Deformations of the Kermack-McKendrick System

Cristian Lăzureanu,
Camelia Petrişor

Affiliations

Cristian Lăzureanu: Politehnica University of Timişoara, Department of Mathematics, Piaƫa Victoriei No. 2, 300006 Timişoara, Romania
Camelia Petrişor: Politehnica University of Timişoara, Department of Mathematics, Piaƫa Victoriei No. 2, 300006 Timişoara, Romania

DOI: https://doi.org/10.1155/2018/5398768
Journal volume & issue: Vol. 2018

Abstract

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Integrable deformations of a Hamilton-Poisson system can be obtained altering its constants of motion. These deformations are integrable systems that can have various dynamical properties. In this paper, we give integrable deformations of the Kermack-McKendrick model for epidemics, and we analyze a particular integrable deformation. More precisely, we point out two Poisson structures that lead to infinitely many Hamilton-Poisson realizations of the considered system. Furthermore, we study the stability of the equilibrium points, we give the image of the energy-Casimir mapping, and we point out some of its properties.

Published in Advances in Mathematical Physics

ISSN: 1687-9120 (Print); 1687-9139 (Online)
Publisher: Wiley
Country of publisher: United Kingdom
LCC subjects: Science: Physics
Website: https://onlinelibrary.wiley.com/journal/3197

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