@article{107357,
author = {Josef Kalas},
title = {Asymptotic behaviour of the equation $\dot z=G(t,z)[h(z)+g(t,z)]$},
journal = {Archivum Mathematicum},
volume = {025},
year = {1989},
pages = {195-206},
zbl = {0702.34042},
mrnumber = {1188064},
language = {en},
url = {http://dml.mathdoc.fr/item/107357}
}
Kalas, Josef. Asymptotic behaviour of the equation $\dot z=G(t,z)[h(z)+g(t,z)]$. Archivum Mathematicum, Tome 025 (1989) pp. 195-206. http://gdmltest.u-ga.fr/item/107357/
On a "Liapunov-like" function for an equation $\dot{z} =f(t,z)$ with a complex-valued function f, Aгch. Math. (Brno) 18 (1982), 65-76. (1982) | MR 0683347
Asymptotic nature of solutions of the equation ż = f(t,z) with a complex-valued function f, Arch. Math. (Brno) 20 (1984), 83-94. (1984) | MR 0784859
Some results on the asymptotic behaviour of the equation ż = f(t,z) with a complex-valued function f, Arch. Math. (Brno) 21 (1985), 195-199. (1985) | MR 0833131
Contributions to the asymptotic behaviour of the equation ż = f(t, z) with a complex-valued function f, to appear. | MR 1037349
On a system of differential equations, Zeszyty Naukowe Univ. Jagiellonskiego, Prace Mat. Zeszyt 9, 77 (1963), 37-48. (1963) | MR 0204763 | Zbl 0267.34029
Equation $Z' =A(t) - Z^2$, coefficient of which has a small modulus, Czech. Math. J. 21 (96) 1971, 311-317. (1971) | MR 0287096
Geometrical ąpproach to the study of the Riccati differential equation with complex-valued coefficients, J. Diff. Equations 25 (1977), 108-114. (1977) | MR 0492454
The Riccati differential equation with complex-valued coefficients and application to the equation $x'' +P(t)x' + Q(t)x = 0$, Aгch. Math. (Brno) 18 (1982), 133-143. (1982) | MR 0682101 | Zbl 0514.34042