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The projective geometric theory of systems of second-order differential equations: Straightening and symmetry theorems of m second-order ordinary differential equations y→̈ = f→(t, y→, y→̇) with m unknown functions y1(t
The projective geometric theory of systems of second-order differential equations: Straightening and symmetry theorems of m second-order ordinary differential equations y→̈ = f→(t, y→, y→̇) with m unknown functions y1(t
On the algorithmic linearizability of nonlinear ordinary differential equations of nonlinear ordinary differential equation of arbitrary order. We develop two algorithms to check if a
Parametric basis functions for collective nuclear models elliptic boundary-value problem to a system of second order ordinary differential equations (ODEs) using
Algorithmic verification of linearizability for ordinary differential equationsFor a nonlinear ordinary differential equation solved with respect to the highest order derivative
A Maple Implementation of the Finite Element Method for Solving Metastable State Problems for Systems of Second-Order Ordinary Differential EquationsWe present a new algorithm for systems of second-order ordinary diff tial equations to calculate
Kantorovich and Galerkin-Type Methods for Modelling Quantum Tunneling of Composite Systems through Barriers scattering problem for the Schrödinger equation is reduced to a set of coupled second-order ordinary
Geometric theory of differential systems: Linearization criterion for systems of second-order ordinary differential equations with a 4-dimensional solvable symmetry group of the Lie-Petrov type VI 1 derivatives) second-order ordinary differential equations whose right-hand sides are polynomials of the third
PSEUDOSPECTRAL METHOD FOR SECOND-ORDER AUTONOMOUS NONLINEAR DIFFERENTIAL EQUATIONSAutonomous nonlinear differential equations constituted a system of ordinary differential equations
The coupled-channel method for modelling quantum transmission of composite systems is reduced to a set of coupled second-order ordinary differential equations with the boundary conditions
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