A linear homogeneous partial differential equation with entire solutions represented by Bessel polynomials |
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Authors: | Pei-Chu Hu Chung-Chun Yang |
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Affiliation: | a Department of Mathematics, Shandong University, Jinan 250100, Shandong, PR China b School of Mathematics and Information Science, Xinyang Normal University, Henan, China |
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Abstract: | We have continued our earlier studies on entire solutions of some special type linear homogeneous partial differential equations. Specifically, we deal with entire solutions of the equations that are represented in convergent series of Bessel polynomials, and determine orders and types of the solutions, in terms of their Taylor coefficients, by establishing an analogue of Lindelöf-Pringsheim theorem as well as Wiman-Valiron type theory for such functions. Finally, by using value distribution theory of holomorphic functions, we are able to exhibit some uniqueness theorems of the entire (or meromorphic) solutions. |
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Keywords: | Entire solutions Homogeneous linear partial differential equation Polynomial coefficients Bessel polynomials |
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