This article analyzes the global geometric properties of slow invariant manifolds in two-dimensional chemical kinetic models. By enforcing the concept of Lyapunov-type numbers, a classification of slow manifolds into global and generalized structures is obtained, and applied to explain the occurrence of different dynamic phenomena. Several related concepts such as stretching heterogeneity and alpha-omega inversion are introduced and commented by taking the Semenov system as a paradigmatic example. We show that the existence of a global slow manifold along with its properties are controlled by a transcritical bifurcation of the points at infinity, that can be readily identified by analyzing the Poincare projected (Pp) system. The information that can be obtained from the analysis of the Pp-system, and specifically the presence of saddle-points on the Poincare circle, are extremely helpful in the construction of a complete picture of the structure and properties of slow invariant manifolds even when the system exhibits non-hyperbolic equilibrium points or stable limit cycles. (c) 2006 Elsevier Ltd. All rights reserved.

The structure of slow invariant manifolds and their bifurcational routes in chemical kinetic models / Adrover, Alessandra; Creta, Francesco; Cerbelli, Stefano; Valorani, Mauro; Giona, Massimiliano. - In: COMPUTERS & CHEMICAL ENGINEERING. - ISSN 0098-1354. - STAMPA. - 31:11(2007), pp. 1456-1474. [10.1016/j.compchemeng.2006.12.008]

The structure of slow invariant manifolds and their bifurcational routes in chemical kinetic models

ADROVER, Alessandra;CRETA, Francesco;CERBELLI, Stefano;VALORANI, Mauro;GIONA, Massimiliano
2007

Abstract

This article analyzes the global geometric properties of slow invariant manifolds in two-dimensional chemical kinetic models. By enforcing the concept of Lyapunov-type numbers, a classification of slow manifolds into global and generalized structures is obtained, and applied to explain the occurrence of different dynamic phenomena. Several related concepts such as stretching heterogeneity and alpha-omega inversion are introduced and commented by taking the Semenov system as a paradigmatic example. We show that the existence of a global slow manifold along with its properties are controlled by a transcritical bifurcation of the points at infinity, that can be readily identified by analyzing the Poincare projected (Pp) system. The information that can be obtained from the analysis of the Pp-system, and specifically the presence of saddle-points on the Poincare circle, are extremely helpful in the construction of a complete picture of the structure and properties of slow invariant manifolds even when the system exhibits non-hyperbolic equilibrium points or stable limit cycles. (c) 2006 Elsevier Ltd. All rights reserved.
2007
dynamical systems; geometric singular perturbation theory; invariant geometric properties; lyapunov numbers; multiple time scales; slow manifolds
01 Pubblicazione su rivista::01a Articolo in rivista
The structure of slow invariant manifolds and their bifurcational routes in chemical kinetic models / Adrover, Alessandra; Creta, Francesco; Cerbelli, Stefano; Valorani, Mauro; Giona, Massimiliano. - In: COMPUTERS & CHEMICAL ENGINEERING. - ISSN 0098-1354. - STAMPA. - 31:11(2007), pp. 1456-1474. [10.1016/j.compchemeng.2006.12.008]
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11573/230780
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