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On the meromorphic solutions of an equation of Hayman |
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| Authors: | YM Chiang RG Halburd |
| Affiliation: | a Department of Mathematics, Hong Kong University of Science and Technology, Clear Water Bay, Sai Kung, N.T., Hong Kong b Department of Mathematical Sciences, Loughborough University, Loughborough, Leicestershire LE11 3TU, UK |
| Abstract: | The behavior of meromorphic solutions of differential equations has been the subject of much study. Research has concentrated on the value distribution of meromorphic solutions and their rates of growth. The purpose of the present paper is to show that a thorough search will yield a list of all meromorphic solutions of a multi-parameter ordinary differential equation introduced by Hayman. This equation does not appear to be integrable for generic choices of the parameters so we do not find all solutions—only those that are meromorphic. This is achieved by combining Wiman-Valiron theory and local series analysis. Hayman conjectured that all entire solutions of this equation are of finite order. All meromorphic solutions of this equation are shown to be either polynomials or entire functions of order one. |
| Keywords: | Wiman-Valiron theory Local series analysis Finite-order meromorphic solutions Painlevé property |
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