Abstract

In classical mechanics, the system of coupled harmonic oscillators is shown to possess the symmetry applicable toa six-dimensional space in complex coordinates, two-dimensional phase space consisting of two position and twomomentum variables. In search into the features of a dynamical system, with the possibility of its complex invariant,we explore this dynamical systems. Dynamical algebraic approach is used to study two-dimensional complex systems(coupled oscillator system) on the extended complex phase plane (ECPS). Scope and importance of invariants in theanalysis of complex trajectories for dynamical systems is discussed.

How to Cite
SINGH VIRDI, Jasvinderpal. Lie Algebraic Approach and Complex Invariant Coupled Oscillator Systems. Global Journal of Science Frontier Research, [S.l.], aug. 2013. ISSN 2249-4626. Available at: <https://journalofscience.org/index.php/GJSFR/article/view/931>. Date accessed: 02 july 2022.