One advance in the proof of the conjecture on meromorphic solutions of Briot–Bouquet type equations
- Authors: Yanchenko A.Y.1
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Affiliations:
- National Research University "Moscow Power Engineering Institute"
- Issue: Vol 86, No 5 (2022)
- Pages: 197-208
- Section: Articles
- URL: https://journal-vniispk.ru/1607-0046/article/view/133909
- DOI: https://doi.org/10.4213/im9265
- ID: 133909
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Abstract
We study entire solutions (solutions which are entire functions) of differential equations of the form$P(y,y^{(n)})=0$, where $P$ is a polynomial with complex coefficients, $n$ is a natural number.We show that, under some constraints on $P$, all entire solutions of such equations are eitherpolynomials, or functions of the form $e^{-L\beta z}Q(e^{\beta z})$, where $L$ is a nonnegative integer, $\beta$ isa complex number, and $Q$ is a polynomial with complex coefficients.This verifies the well-known A. E. Eremenko's conjecture on meromorphic solutions of autonomousBriot–Bouquet type equations for entire solutions in the nondegenerate case.
About the authors
Aleksandr Yakovlevich Yanchenko
National Research University "Moscow Power Engineering Institute"Candidate of physico-mathematical sciences, Associate professor
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