The reduction of nonlinear ordinary differential equations by a combination of first integrals and Lie group symmetries is investigated. The retention, loss or even gain in symmetries in the integration of a nonlinear ordinary differential equation to a first integral are studied for several examples. The differential equations and first integrals are expressed in terms of the invariants of Lie group symmetries. The first integral is treated as a differential equation where the special case of the first integral equal to zero is examined in addition to the nonzero first integral. The inverse problem for which the first integral is the fundamental quantity enables some predictions of the change in Lie group symmetries when the differential e...
AbstractWe propose a method for constructing first integrals of higher order ordinary differential e...
The provenance of Type II hidden point symmetries of differential equations reduced from nonlinear p...
We discuss the Lie symmetry approach to homogeneous, linear, ordinary differential equations in an a...
The reduction of nonlinear ordinary differential equations by a combination of first integrals and L...
In this paper we present a theory for calculating new symmetries for ordinary differential equations...
In this paper Lie group theory is used to reduce the order of ordinary differential equations. For a...
The solution of a class of third order ordinary differential equations possessing two parameter Lie ...
This paper describes a new symmetry-based approach to solving a given ordinary difference equation. ...
AbstractWe use the Lie theory of extended groups to analyse the first integrals of scalar third-orde...
Lie symmetry analysis of differential equations provides a powerful and fundamental framework to the...
We propose a method for constructing first integrals of higher order ordinary differential equations...
In order to apply Lie's symmetry theory for solving a differential equation it must be possible to i...
In this work, we consider first-order ordinary differential equations which have no systematic way t...
Recently ([1]) we have obtained a novel derivation of first integrals and inte-grating factors for o...
Sundman symmetries arise from more general transformations than do point or contact symmetries. This...
AbstractWe propose a method for constructing first integrals of higher order ordinary differential e...
The provenance of Type II hidden point symmetries of differential equations reduced from nonlinear p...
We discuss the Lie symmetry approach to homogeneous, linear, ordinary differential equations in an a...
The reduction of nonlinear ordinary differential equations by a combination of first integrals and L...
In this paper we present a theory for calculating new symmetries for ordinary differential equations...
In this paper Lie group theory is used to reduce the order of ordinary differential equations. For a...
The solution of a class of third order ordinary differential equations possessing two parameter Lie ...
This paper describes a new symmetry-based approach to solving a given ordinary difference equation. ...
AbstractWe use the Lie theory of extended groups to analyse the first integrals of scalar third-orde...
Lie symmetry analysis of differential equations provides a powerful and fundamental framework to the...
We propose a method for constructing first integrals of higher order ordinary differential equations...
In order to apply Lie's symmetry theory for solving a differential equation it must be possible to i...
In this work, we consider first-order ordinary differential equations which have no systematic way t...
Recently ([1]) we have obtained a novel derivation of first integrals and inte-grating factors for o...
Sundman symmetries arise from more general transformations than do point or contact symmetries. This...
AbstractWe propose a method for constructing first integrals of higher order ordinary differential e...
The provenance of Type II hidden point symmetries of differential equations reduced from nonlinear p...
We discuss the Lie symmetry approach to homogeneous, linear, ordinary differential equations in an a...