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Asymptotic properties of dynamical systems in the plane. (English) Zbl 0757.34030
The authors transforms the system $$x'=A(t)x+h(t,x)$$ ($$x\in\mathbb{R}^ 2$$) into an equation $$z'=a(t)z+b(t)\bar z+g(t,z,\bar z)$$ ($$z\in\mathbb{C}$$) and study the asymptotic properties of solutions of this equation using Wazewski’s topological method.
Reviewer: L.Hatvani (Szeged)

##### MSC:
 34C11 Growth and boundedness of solutions to ordinary differential equations 34D05 Asymptotic properties of solutions to ordinary differential equations 34M99 Ordinary differential equations in the complex domain
##### Keywords:
asymptotic properties; Wazewski’s topological method
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