Completely regular growth solutions of second order complex linear differential equations

Heittokangas, Janne; Laine, Ilpo; Tohge, Kazuya; Wen, Zhi‐Tao

doi:10.5186/aasfm.2015.4057

Cited by 26 publications

(41 citation statements)

References 9 publications

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“…The following is our main result on the second order equation (4.1), extending [7,Theorem 3.4]. Theorem 1.…”

Section: Second Order Equationsmentioning

confidence: 69%

“…as r → ∞ uniformly in θ. For example, a transcendental exponential polynomial function is of completely regular growth, see [7,Lemma 1.3].…”

Section: Completely Regular Growthmentioning

confidence: 99%

“…It is natural to consider linear differential equations with transcendental exponential polynomial coefficients as an important special case of this problem. For the second order case, partial results are given in [7], where exponential polynomial solutions of second order equations with exponential polynomial coefficients are studied.…”

Section: Completely Regular Growthmentioning

confidence: 99%

“…In Section 6, we observe some general growth properties of finite order solutions of a class of equations of the form (1.1). In Section 7, we give the proof of our theorem for second order equations, part of which follows from results in [7]. Then in Section 8, the proof of the general theorem for arbitrary order equations is given.…”

Section: Introductionmentioning

confidence: 99%

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Dual exponential polynomials and linear differential equations

Wen

Gundersen

Heittokangas

2018

Journal of Differential Equations

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“…The following is our main result on the second order equation (4.1), extending [7,Theorem 3.4]. Theorem 1.…”

Section: Second Order Equationsmentioning

confidence: 69%

“…as r → ∞ uniformly in θ. For example, a transcendental exponential polynomial function is of completely regular growth, see [7,Lemma 1.3].…”

Section: Completely Regular Growthmentioning

confidence: 99%

Section: Completely Regular Growthmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Dual exponential polynomials and linear differential equations

Wen

Gundersen

Heittokangas

2018

Journal of Differential Equations

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“…[33, p. 300],[36] Let f be a transcendental solution of (5.1), where A(z) and B(z) have completely regular growth, such that ρ(f ) < ∞. Does f have completely regular growth?…”

mentioning

confidence: 99%

Research Questions on Meromorphic Functions and Complex Differential Equations

Gundersen

2016

Comput. Methods Funct. Theory

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Thirty research questions on meromorphic functions and complex differential equations are listed and discussed. The main purpose of this paper is to make this collection of problems available to everyone.MSC 2010: 30D20, 30D35, 34M05, 34M10. Complex analysis questionsSection 2 has notation, Section 3 has questions on meromorphic and entire functions, Sections 4 and 5 have questions on second order homogeneous linear complex differential equations, and Section 6 has questions on first order nonlinear complex differential equations. NotationIn this paper a meromorphic function means a function that is meromorphic in the whole complex plane. We assume the reader is familiar with the Nevanlinna theory of meromorphic functions; see [34], [66].For a meromorphic function f , we use the following notation.Let ρ(f ) denote the order of f .Let µ(f ) denote the lower order of f .Let λ(f ) denote the exponent of convergence of the sequence of zeros of f , counted according to the multiplicities.Let λ(f ) denote the exponent of convergence of the sequence of zeros of f , where each zero is counted once. Questions on meromorphic functionsThis section has questions on meromorphic and entire functions. Question 3.1. Does there exist an entire function that possesses an infinite number of positive real zeros and no other zeros and an infinite number of purely imaginary one-points and no other one-points?If such an entire function exists, then the function would have growth of at most order two, mean type; see [12], [52].Question 3.2. Does there exist an entire function that possesses an infinite number of positive real zeros and no other zeros, and an infinite number of onepoints such that all the one-points lie on a finite number of half-lines that start from the origin, where an infinite number of the one-points are not positive real numbers?If such an entire function f exists, then the zeros and one-points of f would all lie on two or more half-lines that start from the origin, and f would have finite

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On meromorphic solutions of non‐linear differential equations of Tumura–Clunie type

Heittokangas

Latreuch

Wang

et al. 2021

Mathematische Nachrichten

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Meromorphic solutions of non‐linear differential equations of the form fn+Pfalse(z,ffalse)=h are investigated, where n≥2 is an integer, h is a meromorphic function, and P(z,f) is differential polynomial in f and its derivatives with small functions as its coefficients. In the existing literature this equation has been studied in the case when h has the particular form hfalse(zfalse)=p1false(zfalse)eα1false(zfalse)+p2false(zfalse)eα2false(zfalse), where p1,p2 are small functions of f and α1,α2 are entire functions. In such a case the order of h is either a positive integer or equal to infinity. In this article it is assumed that h is a meromorphic solution of the linear differential equation h′′+r1false(zfalse)h′+r0false(zfalse)h=r2false(zfalse) with rational coefficients r0,r1,r2, and hence the order of h is a rational number. Recent results by Liao–Yang–Zhang (2013) and Liao (2015) follow as special cases of the main results.

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Completely regular growth solutions of second order complex linear differential equations

Cited by 26 publications

References 9 publications

Dual exponential polynomials and linear differential equations

Dual exponential polynomials and linear differential equations

Research Questions on Meromorphic Functions and Complex Differential Equations

On meromorphic solutions of non‐linear differential equations of Tumura–Clunie type

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