Open AccessSuperposition rules and second-order Riccati equations
Author(s) -
José F. Cariñena,
Javier de Lucas
Publication year - 2011
Publication title -
the journal of geometric mechanics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.511
H-Index - 17
eISSN - 1941-4897
pISSN - 1941-4889
DOI - 10.3934/jgm.2011.3.1
Subject(s) - superposition principle , mathematics , differential equation , ordinary differential equation , riccati equation , order (exchange) , set (abstract data type) , mathematical analysis , computer science , finance , economics , programming language
A superposition rule is a particular type of map that enables one to express the general solution of certain systems of first-order ordinary differential equations, the so-called Lie systems, out of generic families of particular solutions and a set of constants. The first aim of this work is to propose several generalisations of this notion to second-order differential equations. Next, several results on the existence of such generalisations are given and relations with the theories of Lie systems and quasi-Lie schemes are found. Finally, our methods are used to study second-order Riccati equations and other second-order differential equations of mathematical and physical interest.
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