Title :
The shortest universal solutions for non-linear dynamic equation
Author :
Cao, Shaozhong ; Li, Yang
Author_Institution :
Sch. of Inf. & Mech. Eng., Beijing Inst. of Graphic Commun., Beijing, China
Abstract :
To study on the non-linear dynamic equation dx(t)/dt = F(x(t), t), the concept of “time-state space” - (t, x(t)) is introduced to obtain the shortest universal analytic solutions at any order series. F(x(t), t) can be expanded as Taylor series on independent variable t at the point of (t = 0, x(0)) in the time-status space. And then, the shortest universal analytic solutions at any order series can be obtained by integrating, and the convergence can also be proven.
Keywords :
convergence; nonlinear equations; series (mathematics); Taylor series; convergence; nonlinear dynamic equation; order series; time-state space concept; universal analytic solution; Control systems; Convergence; Equations; Mathematical model; Nonlinear dynamical systems; Taylor series; non-linear dynamic equation; series solution; time-status space;
Conference_Titel :
Cloud Computing and Intelligence Systems (CCIS), 2011 IEEE International Conference on
Conference_Location :
Beijing
Print_ISBN :
978-1-61284-203-5
DOI :
10.1109/CCIS.2011.6045127
