AbstractTwo generalized forms of the Pinney equation, recently derived by Rogers, Schief, and Winternitz from Lie group considerations, are here connected with two linearizable second-order ODE's belonging to the Gambier classification
Abstract|The classical Pinney equation is discretised in such a way that its well-known nonlinear su...
We employ generalized Sundman transformation method to obtain certain new first integrals of autonom...
AbstractThe connection problem is considered in a hypergeometric function framework for (i) the two ...
AbstractTwo generalized forms of the Pinney equation, recently derived by Rogers, Schief, and Winter...
AbstractA Lie group approach is adopted to construct generalized Pinney equations of two distinct ty...
A quasi-Lie scheme is a geometric structure that provides t-dependent changes of variables transform...
A direct approach to non-linear second-order ordinary differential equations admitting a superpositi...
The class of nonlinear ordinary differential equations $y^\prime\primey = F(z,y^2)$, where F is a sm...
During the last few years, several fairly systematic nonlinear theories of generalized solutions of ...
Ordinary differential equations of the second order of P-type are considered in the paper aiming at ...
Recently ([1]) we have obtained a novel derivation of first integrals and inte-grating factors for o...
The connection problem is considered in a hypergeometric function framework for (i) the two most gen...
The connection problem is considered in a hypergeometric function framework for (i) the two most gen...
The connection problem is considered in a hypergeometric function framework for (i) the two most gen...
The connection problem is considered in a hypergeometric function framework for (i) the two most gen...
Abstract|The classical Pinney equation is discretised in such a way that its well-known nonlinear su...
We employ generalized Sundman transformation method to obtain certain new first integrals of autonom...
AbstractThe connection problem is considered in a hypergeometric function framework for (i) the two ...
AbstractTwo generalized forms of the Pinney equation, recently derived by Rogers, Schief, and Winter...
AbstractA Lie group approach is adopted to construct generalized Pinney equations of two distinct ty...
A quasi-Lie scheme is a geometric structure that provides t-dependent changes of variables transform...
A direct approach to non-linear second-order ordinary differential equations admitting a superpositi...
The class of nonlinear ordinary differential equations $y^\prime\primey = F(z,y^2)$, where F is a sm...
During the last few years, several fairly systematic nonlinear theories of generalized solutions of ...
Ordinary differential equations of the second order of P-type are considered in the paper aiming at ...
Recently ([1]) we have obtained a novel derivation of first integrals and inte-grating factors for o...
The connection problem is considered in a hypergeometric function framework for (i) the two most gen...
The connection problem is considered in a hypergeometric function framework for (i) the two most gen...
The connection problem is considered in a hypergeometric function framework for (i) the two most gen...
The connection problem is considered in a hypergeometric function framework for (i) the two most gen...
Abstract|The classical Pinney equation is discretised in such a way that its well-known nonlinear su...
We employ generalized Sundman transformation method to obtain certain new first integrals of autonom...
AbstractThe connection problem is considered in a hypergeometric function framework for (i) the two ...
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