The Cartan equivalence method is used to deduce an invariant characterization of the scalar third-order ordinary differential equation u"' = f(x, u, u', u"), which admits the maximal 7-dimensional point symmetry Lie algebra. The method provides auxiliary functions that can be used to efficiently obtain the point transformation that does the reduction to the simplest linear equation u"' = 0. Moreover, examples are given to illustrate the method. Copyright ? 2018 John Wiley & Sons, Ltd.Scopu
The equivalence problem for systems of second-order differential equations under point transformatio...
AbstractWe show that an nth (n ⩾ 3) order linear ordinary differential equation has exactly one of n...
AbstractWe use Cartan's equivalence method to study the differential invariants of a single second o...
The linearization problem for scalar third-order ordinary differential equations via point transform...
The Cartan equivalence method is applied to provide an invariant characterization of the third-order...
We present here, in compact form, the necessary and sufficient conditions for linearization of third...
Cartan's method of equivalence is used to prove that there exists two fundamental tensorial invarian...
We provide an algorithmic approach to the construction of point transformations for scalar ordinary ...
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We use Cartan’s equivalence method to study the differential invariants of a single second order ord...
AbstractThird order ordinary differential equations admitting a transitive symmetry group of fiber-p...
There are many routines developed for solving ordinary differential Equations (ODEs) of different ty...
We compute cohomology spaces of Lie algebras that describe differential invariants of third order o...
In this work the generalized Lie problem for the thirdorder ODEs $y'''=F(x,y)$ is studied. Symmetry ...
The subject of this article are third-order differential equations that may be linearized by a varia...
The equivalence problem for systems of second-order differential equations under point transformatio...
AbstractWe show that an nth (n ⩾ 3) order linear ordinary differential equation has exactly one of n...
AbstractWe use Cartan's equivalence method to study the differential invariants of a single second o...
The linearization problem for scalar third-order ordinary differential equations via point transform...
The Cartan equivalence method is applied to provide an invariant characterization of the third-order...
We present here, in compact form, the necessary and sufficient conditions for linearization of third...
Cartan's method of equivalence is used to prove that there exists two fundamental tensorial invarian...
We provide an algorithmic approach to the construction of point transformations for scalar ordinary ...
AbstractThere are seven equivalence classes of second-order ordinary differential equations possessi...
We use Cartan’s equivalence method to study the differential invariants of a single second order ord...
AbstractThird order ordinary differential equations admitting a transitive symmetry group of fiber-p...
There are many routines developed for solving ordinary differential Equations (ODEs) of different ty...
We compute cohomology spaces of Lie algebras that describe differential invariants of third order o...
In this work the generalized Lie problem for the thirdorder ODEs $y'''=F(x,y)$ is studied. Symmetry ...
The subject of this article are third-order differential equations that may be linearized by a varia...
The equivalence problem for systems of second-order differential equations under point transformatio...
AbstractWe show that an nth (n ⩾ 3) order linear ordinary differential equation has exactly one of n...
AbstractWe use Cartan's equivalence method to study the differential invariants of a single second o...