Add to ORKGThesis (M.Sc.)-University of Natal, 1993.The physical world is, for the most part, modelled using second order ordinary differential equations. The time-dependent simple harmonic oscillator and the Ermakov-Pinney equation (which together form an Ermakov system) are two examples that jointly and separately describe many physical situations. We study Ermakov systems from the point of view of the algebraic properties of differential equations. The idea of generalised Ermakov systems is introduced and their relationship to the Lie algebra sl(2, R) is explained. We show that the 'compact' form of generalized Ermakov systems has an infinite dimensional Lie algebra. Such algebras are usually associated only with first order equations in the conte...
Here, a proto-type Ermakov–Painlevé I equation is introduced and a homogeneous Dirichlet-type bounda...
In the present thesis, we study the applications of Lie group theory to system of quasilinear hyperb...
In this short note, we revisit the so-called Ermakov–Pinney (EP) equation viewing its properties fro...
Milne–Pinney equation $\ddot x=-\omega^2(t)x+ k/{x^3}$ is usually studied together with the time-dep...
A recent paper by Karasu (Kalkanli) and Yildirim (Journal of Nonlinear Mathematical Physics 9 (2002)...
É feita uma revisão crítica das propriedades fundamentais dos sistemas de Ermakov, compreendendo a l...
Thesis (Ph.D.)-University of Natal, 1995.In Chapter One the theoretical basis for infinitesimal tran...
Reid\u27s mth-order generalized Ermakov systems of nonlinear coupling constant α are equivalent to a...
"Reid´s mth-order generalized Ermakov systems of nonlinear coupling constant ? are equivalent to an ...
The Ermakov-Pinney equation possesses three Lie point symmetries with the algebra sl(2, R). This alg...
A direct approach to non-linear second-order ordinary differential equations admitting a superpositi...
We investigate the symmetry properties of a pair of Ermakov equations. The system is superintegrable...
This project is about dynamical systems with symmetries. A dynamical system defines a vector field o...
Thesis (Ph.D.)-University of Natal, 1995The Lie theory of extended groups applied to differential eq...
AbstractWe discuss a system which generalizes the Bernoulli equation analogously to the way Rogers a...
Here, a proto-type Ermakov–Painlevé I equation is introduced and a homogeneous Dirichlet-type bounda...
In the present thesis, we study the applications of Lie group theory to system of quasilinear hyperb...
In this short note, we revisit the so-called Ermakov–Pinney (EP) equation viewing its properties fro...
Milne–Pinney equation $\ddot x=-\omega^2(t)x+ k/{x^3}$ is usually studied together with the time-dep...
A recent paper by Karasu (Kalkanli) and Yildirim (Journal of Nonlinear Mathematical Physics 9 (2002)...
É feita uma revisão crítica das propriedades fundamentais dos sistemas de Ermakov, compreendendo a l...
Thesis (Ph.D.)-University of Natal, 1995.In Chapter One the theoretical basis for infinitesimal tran...
Reid\u27s mth-order generalized Ermakov systems of nonlinear coupling constant α are equivalent to a...
"Reid´s mth-order generalized Ermakov systems of nonlinear coupling constant ? are equivalent to an ...
The Ermakov-Pinney equation possesses three Lie point symmetries with the algebra sl(2, R). This alg...
A direct approach to non-linear second-order ordinary differential equations admitting a superpositi...
We investigate the symmetry properties of a pair of Ermakov equations. The system is superintegrable...
This project is about dynamical systems with symmetries. A dynamical system defines a vector field o...
Thesis (Ph.D.)-University of Natal, 1995The Lie theory of extended groups applied to differential eq...
AbstractWe discuss a system which generalizes the Bernoulli equation analogously to the way Rogers a...
Here, a proto-type Ermakov–Painlevé I equation is introduced and a homogeneous Dirichlet-type bounda...
In the present thesis, we study the applications of Lie group theory to system of quasilinear hyperb...
In this short note, we revisit the so-called Ermakov–Pinney (EP) equation viewing its properties fro...