an:05635188
Zbl 1209.34002
Laine, Ilpo
Complex differential equations
EN
Battelli, Flaviano (ed.) et al., Handbook of differential equations: Ordinary differential equations. Vol. IV. Amsterdam: Elsevier/North Holland (ISBN 978-0-444-53031-8/hbk). Handbook of Differential Equations, 269-363 (2008).
2008
a
34-02 34M03 34M05 30D35 34M15
complex differential equations
Research on the properties (existence, order of growth, zeros, poles and fixed points, etc.) of solutions of differential equations in a complex domain and in the unit disc is very important. There has been a fast development in this field and many significant results have been obtained since the 1980s.
In the present text, I. Laine studies and lists many recent results on the growth and value distribution of meromorphic solutions of complex differential equations in the complex plane and in the unit disc, which are not to be found in books such as:
[1] [\textit{I. Laine}, Nevanlinna theory and complex differential equations. de Gruyter Studies in Mathematics. 15. Berlin: W. de Gruyter (1992; Zbl 0784.30002)].
[2] [\textit{G. Jank} and \textit{L. Volkmann}, Einf??hrung in die Theorie der ganzen und meromorphen funktionen mit Anwendungen auf Differentialgleichungen. UTB f??r Wissenschaft, Gro??e Reihe. Basel etc.: Birkh??user (1985; Zbl 0682.30001)].
In this text, I. Laine presents results under the following five aspects:
{\parindent7mm
\begin{itemize}\item[(1)] local theory of complex differential equations;
\item[(2)] linear differential equations in the complex plane;
\item[(3)] linear differential equations in unit disc;
\item[(4)] nonlinear differential equations in the complex plane;
\item[(5)] algebroid solutions of complex differential equations.
\end{itemize}}
This work could be very important to researchers in the field of complex differential equations.
For the entire collection see [Zbl 1173.34001].
Zhibo Huang (Guangzhou)
Zbl 0784.30002; Zbl 0682.30001