We specialize Olver’s and Rosenau’s side condition heuristics for the determination of particular invariant sets of ordinary differential equations. It turns out that side conditions of so-called LaSalle type are of special interest. Moreover we put side condition properties of symmetric and partially symmetric equations in a wider context. In the final section we present an application to parameter-dependent systems, in particular to quasi-steady state for chemical reactions.
Side conditions for ordinary differential equations / G. Cicogna, G. Gaeta, S. Walcher. - In: JOURNAL OF LIE THEORY. - ISSN 0949-5932. - 25:1(2014), pp. 125-146.
Side conditions for ordinary differential equations
G. GaetaSecondo
;
2014
Abstract
We specialize Olver’s and Rosenau’s side condition heuristics for the determination of particular invariant sets of ordinary differential equations. It turns out that side conditions of so-called LaSalle type are of special interest. Moreover we put side condition properties of symmetric and partially symmetric equations in a wider context. In the final section we present an application to parameter-dependent systems, in particular to quasi-steady state for chemical reactions.
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