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Geometric properties of $$\tau $$-confluent hypergeometric function
Analysis and Mathematical Physics, 2020zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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The Confluent Hypergeometric Functions
200910.1 Introduction Whereas Gauss was largely responsible for the systematic study of the hypergeometric function, E. E. Kummer (1810â1893) is the person most associated with developing properties of the related confluent hypergeometric function. Kummer published his work on this function in 1836, and since that time it has been commonly referred to
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Univalence of confluent hypergeometric functions
1998Summary: Conditions of univalence and convexity for a confluent hypergeometric function \(\Phi\) with complex coefficients are obtained. Condition of starlikeness of \(z\Phi(z)\) is given.
Kanas, Stanisława, Stankiewicz, Jan
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The Confluent Hypergeometric Function
1991Many of the special functions of mathematical physics can be expressed in terms of specific forms of the confluent hypergeometric function. As its name suggests, this function is related to the hypergeometric function of Chapter 2. Let us see how.
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The Confluent Hypergeometric Functions
1998Abstract Whereas Gauss was largely responsible for the systematic study of the hypergeometric function, E. E. Kummer (1810-1893) is the person most associated with developing properties of the related confluent hypergeometric function.
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Confluent Hypergeometric Functions
Mathematics of Computation, 1961Y. L. L., L. J. Slater
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The Confluent Hypergeometric Function Vol 15
Physics Bulletin, 1970H Buchholz Berlin: Springer 1969 pp xv + 238 price $16 The original German edition of this book appeared in 1953 as volume 2 of the Ergebnisse der Angewandten Mathematik. It contains virtually all the important information on confluent hypergeometric functions that was available at the time.
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Integrative oncology: Addressing the global challenges of cancer prevention and treatment
Ca-A Cancer Journal for Clinicians, 2022Jun J Mao,, Msce +2 more
exaly
XXVI.—Some Confluent Hypergeometric Functions of Two Variables
Proceedings of the Royal Society of Edinburgh, 19401. This paper is the continuation of a former one (Erdélyi, 1939), and deals with the integration of the system of two partial linear differential equations of the second orderThe former paper will be referred to as I; all the notations of I will be retained without further explanation.
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