Add to ORKGan algorithm is given to linearize nonlinear first order systems of partial differential equations admitting an infinite-parameter lie group of point trasformations. The associated infinitesimal operator must be a linear combination of commuting operators which individually are not necessarily admitted by the basic system, whereas the cofficents of the combination are given by arbitrary solutions of suitable linear system. The procedure is based on the introduction of the canonical variables corresponding to the commuting operators. Within such a framework we reformulate a theorem already proved by Kumei and Bluman [SIAM J. appl. math. 42 (1982)]. The paper concludes with some illustrative examples of the proposed algorith
The Carleman linearization and Lie series techniques are generalized to nonlinear PDE's and applied ...
AbstractIn this paper we consider the second order Monge–Ampère equations in (1+1), (2+1), and (3+1)...
The present Ph.D. Thesis is concerned with first order PDE's and to the structural conditions allowi...
AbstractAn algorithm is given to linearize nonlinear first order systems of partial differential equ...
In this paper it is shown an algorithm leading to linearization of nonlinear systems of partial diff...
Solving nonlinear ordinary differential equations is one of the fundamental and practically importan...
For a nonlinear ordinary differential equation solved with respect to the highest order derivative a...
We study the linearization of nonlinear second-order ordinary differential equations from the point ...
The paper claims to give a systematic approach allowing one to obtain invertible variable transforma...
Abstract. Complex Lie point transformations are used to linearize a class of systems of second order...
In the framework of projective-geometric theory of systems of differential equations developed by th...
In this paper we consider first-order systems with constant coefficients for two real-valued functio...
In this paper we consider first-order systems with constant coefficients for two real-valued functio...
Transformations of differential equations to other equivalent equations play a central role in many ...
Despite the fact that Sophus Lie's theory was virtually the only systematic method for solving nonli...
The Carleman linearization and Lie series techniques are generalized to nonlinear PDE's and applied ...
AbstractIn this paper we consider the second order Monge–Ampère equations in (1+1), (2+1), and (3+1)...
The present Ph.D. Thesis is concerned with first order PDE's and to the structural conditions allowi...
AbstractAn algorithm is given to linearize nonlinear first order systems of partial differential equ...
In this paper it is shown an algorithm leading to linearization of nonlinear systems of partial diff...
Solving nonlinear ordinary differential equations is one of the fundamental and practically importan...
For a nonlinear ordinary differential equation solved with respect to the highest order derivative a...
We study the linearization of nonlinear second-order ordinary differential equations from the point ...
The paper claims to give a systematic approach allowing one to obtain invertible variable transforma...
Abstract. Complex Lie point transformations are used to linearize a class of systems of second order...
In the framework of projective-geometric theory of systems of differential equations developed by th...
In this paper we consider first-order systems with constant coefficients for two real-valued functio...
In this paper we consider first-order systems with constant coefficients for two real-valued functio...
Transformations of differential equations to other equivalent equations play a central role in many ...
Despite the fact that Sophus Lie's theory was virtually the only systematic method for solving nonli...
The Carleman linearization and Lie series techniques are generalized to nonlinear PDE's and applied ...
AbstractIn this paper we consider the second order Monge–Ampère equations in (1+1), (2+1), and (3+1)...
The present Ph.D. Thesis is concerned with first order PDE's and to the structural conditions allowi...