Existence of Periodic Solution for a Class of Linear Third Order ODE
Abstract
In this paper, we will consider third order linear dif- ferential equation
y′′′ +αy′′ +βy′ +γy+f(t,y)=e(t),
where α,β,γ are constant coefficients, f(t,y) is continuous, e(t) is discontinuous, and f and e are periodic functions with respect to t of period w. We will introduce sufficient conditions under which the above equation have at least one non-trivial periodic solution of period w. We will see that under the so called condi- tions, all the solutions of the equation will be bounded. It must be mentioned that e in this equation is called “controller” in the en- gineering problems and it was always considered to be continuous to ensure us that periodic solution exists. In this paper, we will show the existence of periodic solution without supposing that e to be continuous.
y′′′ +αy′′ +βy′ +γy+f(t,y)=e(t),
where α,β,γ are constant coefficients, f(t,y) is continuous, e(t) is discontinuous, and f and e are periodic functions with respect to t of period w. We will introduce sufficient conditions under which the above equation have at least one non-trivial periodic solution of period w. We will see that under the so called condi- tions, all the solutions of the equation will be bounded. It must be mentioned that e in this equation is called “controller” in the en- gineering problems and it was always considered to be continuous to ensure us that periodic solution exists. In this paper, we will show the existence of periodic solution without supposing that e to be continuous.
Keywords
Periodic solution, linear third order
ODE, bounded solution, stability, discontinuous controller.
Refbacks
- There are currently no refbacks.
This work is licensed under a Creative Commons Attribution 3.0 License.