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Meromorphic Extensions of $$(\cdot , W)$$-Meromorphic Functions
Complex Analysis and Operator Theory, 2020zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Thai Thuan Quang, Lien Vuong Lam
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The Order of the Derivative of a Meromorphic Function†
Journal of the London Mathematical Society, 1936J. M. Whittaker
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ON THE GEOMETRY OF MEROMORPHIC FUNCTIONS
Mathematics of the USSR-Sbornik, 1982This paper establishes various propositions characterizing the geometric behavior of meromorphic functions in . Distortion theorems for these functions form a basis for the arguments. Namely, a finite number of nice curves , , in the -plane are considered (in particular, may be a straight line) and information is obtained about the lengths of the ...
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GENERALIZED MEROMORPHIC FUNCTIONS
Russian Academy of Sciences. Izvestiya Mathematics, 1994The autor continues his pioneering work on generalized meromorphic functions on the big plane generated by a compact Abelian group \(G\) with ordered dual group \(\Gamma\subset\mathbb{R}\). Here he presents the proofs of several of his previously announced results. Let \(G\) be a compact Abelian group with ordered dual group \(\Gamma\subset \mathbb{R}\)
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Rational Deficient Functions of Meromorphic Functions
Bulletin of the London Mathematical Society, 1986Let f be a nonconstant meromorphic function in the complex plane. Nevanlinna theory asserts that f has a countable set of deficient values with total deficiencies at most 2. \textit{R. Nevanlinna} proposed (Le théorème de Picard-Borel et la théorie des fonctions méromorphes (1929)) to generalize this result in replacing complex values by meromorphic ...
Frank, Günter, Weissenborn, Gerd
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Bounds for the derivative of certain meromorphic functions and on meromorphic Bloch-type functions
Czechoslovak Mathematical JournalzbMATH Open Web Interface contents unavailable due to conflicting licenses.
Bhowmik, Bappaditya, Sen, Sambhunath
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FEIGENBAUM’S CONSTANT FOR MEROMORPHIC FUNCTIONS
International Journal of Modern Physics C, 1992We calculate Feigenbaum’s constant for a double-periodic meromorphic function: the Jacobian elliptic function sn[2K (m)x, m]. For m=0 this function reduces to sin(πx), with real period, while for m=1 it reduces to a hyperbolic tangent, having a pure imaginary period.
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ON THE TYPE OF ENTIRE AND MEROMORPHIC FUNCTIONS
Russian Academy of Sciences. Sbornik Mathematics, 1994Let \(\Lambda = \{(\lambda_ n, m_ n) \in \mathbb{C} \times \mathbb{N},\;n = 1,2, \dots\}\) be the divisor, \(f\) be an entire function, \(f_ \Lambda = 0\), \(f \not \equiv 0\). To evaluate a given characteristic of growth of the function \(f\) by a given characteristic of \(\Lambda\) is the traditional problem in the theory of entire functions.
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Condenser Capacity and Meromorphic Functions
Computational Methods and Function Theory, 2010zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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