Applied Mathematics and Nonlinear Sciences (Dec 2020)
Periodic solutions for differential systems in ℝ3 and ℝ4
Abstract
We provide sufficient conditions for the existence of periodic solutions for the differential systems x′=y, y′=z, z′=−y−εF(t,x,y,z), andx′=y, y′=−x−εG(t,x,y,z,u), z′=u, u′=−z−εH(t,x,y,z,u),\matrix{{x' = y,\;\;\;y' = z,\;\;\;z' = - y - \varepsilon F(t,x,y,z),\;\;\;{\rm{and}}} \cr {x' = y,\quad y' = - x - \varepsilon G(t,x,y,z,u),\quad z' = u,\quad u' = - z - \varepsilon H(t,x,y,z,u),} \hfill \cr } where F, G and H are 2π–periodic functions in the variable t and ɛ is a small parameter. These differential systems appear frequently in many problems coming from the sciences and the engineering.
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