The solution of a class of third order ordinary differential equations possessing two parameter Lie symmetry group is obtained by group theoretic means. It is shown that reduction to quadratures is possible according to two scenarios: (1) if upon first reduction of order the obtained second order ordinary differential equation besides the inherited point symmetry acquires at least one more new point symmetry (possibly a hidden symmetry of Type II). (2) First, reduction paths of the fourth order differential equations with four parameter symmetry group leading to the first order equation possessing one known (inherited) symmetry are constructed. Then, reduction paths along which a third order equation possessing two-parameter symmetry group ...
The process of integrating an nth-order scalar ordinary differential equation with symmetry is revis...
The similarity solution to Prandtl’s boundary layer equations for two-dimensional and radial flows w...
In this paper we present a theory for calculating new symmetries for ordinary differential equations...
The solution of a class of third order ordinary differential equations possessing two parameter Lie ...
In this paper Lie group theory is used to reduce the order of ordinary differential equations. For a...
In order to apply Lie's symmetry theory for solving a differential equation it must be possible to i...
There are many routines developed for solving ordinary differential Equations (ODEs) of different ty...
Abstract. An iterative algorithm is presented for reducing an nth-order ordinary differential equati...
Transformations of differential equations to other equivalent equations play a central role in many ...
The reduction of nonlinear ordinary differential equations by a combination of first integrals and L...
In the framework of projective-geometric theory of systems of differential equations developed by th...
AbstractThird order ordinary differential equations admitting a transitive symmetry group of fiber-p...
For formulating mathematical models, engineering problems and physical problems, Nonlinear ordinary ...
Based on symmetry and invariance principles, Lie group analysis is the only systematic method for so...
We present here, in compact form, the necessary and sufficient conditions for linearization of third...
The process of integrating an nth-order scalar ordinary differential equation with symmetry is revis...
The similarity solution to Prandtl’s boundary layer equations for two-dimensional and radial flows w...
In this paper we present a theory for calculating new symmetries for ordinary differential equations...
The solution of a class of third order ordinary differential equations possessing two parameter Lie ...
In this paper Lie group theory is used to reduce the order of ordinary differential equations. For a...
In order to apply Lie's symmetry theory for solving a differential equation it must be possible to i...
There are many routines developed for solving ordinary differential Equations (ODEs) of different ty...
Abstract. An iterative algorithm is presented for reducing an nth-order ordinary differential equati...
Transformations of differential equations to other equivalent equations play a central role in many ...
The reduction of nonlinear ordinary differential equations by a combination of first integrals and L...
In the framework of projective-geometric theory of systems of differential equations developed by th...
AbstractThird order ordinary differential equations admitting a transitive symmetry group of fiber-p...
For formulating mathematical models, engineering problems and physical problems, Nonlinear ordinary ...
Based on symmetry and invariance principles, Lie group analysis is the only systematic method for so...
We present here, in compact form, the necessary and sufficient conditions for linearization of third...
The process of integrating an nth-order scalar ordinary differential equation with symmetry is revis...
The similarity solution to Prandtl’s boundary layer equations for two-dimensional and radial flows w...
In this paper we present a theory for calculating new symmetries for ordinary differential equations...