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First Integrals of Two-Dimensional Dynamical Systems via Complex Lagrangian Approach
oleh: Muhammad Umar Farooq, Chaudry Masood Khalique, Fazal M. Mahomed
Format: | Article |
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Diterbitkan: | MDPI AG 2019-10-01 |
Deskripsi
The aim of the present work is to classify the Noether-like operators of two-dimensional physical systems whose dynamics is governed by a pair of Lane-Emden equations. Considering first-order Lagrangians for these systems, we construct corresponding first integrals. It is seen that for a number of forms of arbitrary functions appearing in the set of equations, the Noether-like operators also fulfill the classical Noether symmetry condition for the pairs of real Lagrangians and the generated first integrals are reminiscent of those we obtain from the complex Lagrangian approach. We also investigate the cases in which the underlying systems are reducible via quadrature. We derive some interesting results about the nonlinear systems under consideration and also find that the algebra of Noether-like operators is Abelian in a few cases.