DOIAbstract
AbstractWe discuss a system which generalizes the Bernoulli equation analogously to the way Rogers and Schief generalize the Ermakov system and set both in a geometrical context
AbstractWe discuss a system which generalizes the Bernoulli equation analogously to the way Rogers and Schief generalize the Ermakov system and set both in a geometrical context
Novel hybrid Ermakov-Painleve IV systems are introduced and an associated Ermakov invariant is used ...
Cataloged from PDF version of article.We present a new generalized algorithm which allows the constr...
Reid\u27s mth-order generalized Ermakov systems of nonlinear coupling constant α are equivalent to a...
We discuss a system which generalizes the Bernoulli equation analogously to the way Rogers and Schie...
AbstractWe discuss a system which generalizes the Bernoulli equation analogously to the way Rogers a...
Thesis (M.Sc.)-University of Natal, 1993.The physical world is, for the most part, modelled using se...
É feita uma revisão crítica das propriedades fundamentais dos sistemas de Ermakov, compreendendo a l...
AbstractTwo generalized forms of the Pinney equation, recently derived by Rogers, Schief, and Winter...
AbstractThe object of the present note is to prove a new explicit formula for the generalized Bernou...
"Reid´s mth-order generalized Ermakov systems of nonlinear coupling constant ? are equivalent to an ...
We propose definitions of homogeneity and projective equivalence for systems of ordinary differentia...
summary:In this paper first order systems of linear of ODEs are considered. It is shown that these s...
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...
AbstractWe review some of the recent results in the projective-geometric theory of systems of conser...
Novel hybrid Ermakov-Painleve IV systems are introduced and an associated Ermakov invariant is used ...
Cataloged from PDF version of article.We present a new generalized algorithm which allows the constr...
Reid\u27s mth-order generalized Ermakov systems of nonlinear coupling constant α are equivalent to a...
We discuss a system which generalizes the Bernoulli equation analogously to the way Rogers and Schie...
AbstractWe discuss a system which generalizes the Bernoulli equation analogously to the way Rogers a...
Thesis (M.Sc.)-University of Natal, 1993.The physical world is, for the most part, modelled using se...
É feita uma revisão crítica das propriedades fundamentais dos sistemas de Ermakov, compreendendo a l...
AbstractTwo generalized forms of the Pinney equation, recently derived by Rogers, Schief, and Winter...
AbstractThe object of the present note is to prove a new explicit formula for the generalized Bernou...
"Reid´s mth-order generalized Ermakov systems of nonlinear coupling constant ? are equivalent to an ...
We propose definitions of homogeneity and projective equivalence for systems of ordinary differentia...
summary:In this paper first order systems of linear of ODEs are considered. It is shown that these s...
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...
AbstractWe review some of the recent results in the projective-geometric theory of systems of conser...
Novel hybrid Ermakov-Painleve IV systems are introduced and an associated Ermakov invariant is used ...
Cataloged from PDF version of article.We present a new generalized algorithm which allows the constr...
Reid\u27s mth-order generalized Ermakov systems of nonlinear coupling constant α are equivalent to a...
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