On transcendental meromorphic solutions of Hayman's equation
Abstract
We present a complete description of the form of transcendental meromorphic solutions of the second order differential equation equation w''w-w'2+a w'w+b w2=α w+β w'+γ, equation where a, b, α, β and γ are all rational functions. Together with the Wiman--Valiron theory, we then show that any transcendental meromorphic solution w of equation () has hyper-order (w)≤ n for some integer n≥ 0. Moreover, if w has finite order σ(w), then 2σ(w) is a positive integer; if βγ0 and w has infinite order or if γ0 and w has infinite order, then the hyper-order (w) is a positive integer.
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