Analytic Function Theory

The field of boundary limit theorems in analytic function theory is usually considered to have begun about 1906, with the publication of Fatou's thesis [8]. In this remarkable memoir a theorem is proved, that now bears the author's name, which implies that any bounded holomorphic function defined on the unit disk possesses an angular limit almost everywhere (Lebesgue measure) on the frontier. Outstanding classical contributions to this field can be attributed to F. and M. Riesz, R. Nevanlinna, Lusin, Privaloff, Frostman, Plessner, and others.

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COMPARING AND ZILBER’S EXPONENTIAL FIELDS: ZERO SETS OF EXPONENTIAL POLYNOMIALS

Journal of the Institute of Mathematics of Jussieu ◽

10.1017/s1474748014000231 ◽

2014 ◽

Vol 15 (1) ◽

pp. 71-84 ◽

Cited By ~ 1

Author(s):

P. D’Aquino ◽

A. Macintyre ◽

G. Terzo

Keyword(s):

Analytic Function ◽

Function Theory ◽

Research Programme ◽

Exponential Functions ◽

Exponential Polynomials ◽

Zero Sets ◽

Diophantine Geometry ◽

Complex Exponential ◽

Identity Theorem

We continue the research programme of comparing the complex exponential with Zilberś exponential. For the latter, we prove, using diophantine geometry, various properties about zero sets of exponential functions, proved for $\mathbb{C}$ using analytic function theory, for example, the Identity Theorem.

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Solution of Plane Problems of Elasticity Utilizing Partitioning Concepts

Journal of Applied Mechanics ◽

10.1115/1.3423087 ◽

1973 ◽

Vol 40 (3) ◽

pp. 767-772 ◽

Cited By ~ 29

Author(s):

O. L. Bowie ◽

C. E. Freese ◽

D. M. Neal

Keyword(s):

Analytic Function ◽

Power Series ◽

Collocation Method ◽

Stress Function ◽

Function Theory ◽

Series Expansions ◽

Two Dimensional ◽

Numerical Examples ◽

Power Series Expansions

A partitioning plan combined with the modified mapping-collocation method is presented for the solution of awkward configurations in two-dimensional problems of elasticity. It is shown that continuation arguments taken from analytic function theory can be applied in the discrete to “stitch” several power series expansions of the stress function in appropriate subregions of the geometry. The effectiveness of such a plan is illustrated by several numerical examples.

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An investigation of beam theory using the Airy stress function coupled with analytic function theory

Journal of Engineering Mathematics ◽

10.1007/bf00039324 ◽

1986 ◽

Vol 20 (1) ◽

pp. 73-79

Author(s):

D. E. Jesson ◽

W. N. Cottingham

Keyword(s):

Analytic Function ◽

Stress Function ◽

Function Theory ◽

Beam Theory ◽

Airy Stress Function

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The Rapid Tearing of a Half Plane

Journal of Applied Mechanics ◽

10.1115/1.3169025 ◽

1985 ◽

Vol 52 (1) ◽

pp. 51-56

Author(s):

J. P. Dempsey ◽

E. B. Smith

Keyword(s):

Stress Intensity ◽

Analytic Function ◽

Conformal Mapping ◽

Crack Propagation ◽

Function Theory ◽

Elastic Half Space ◽

Intensity Factors ◽

Crack Propagation Velocity ◽

Crack Bifurcation ◽

Mechanical Disturbances

The surface of an elastic half space is subjected to sudden antiplane mechanical disturbances. Crack initiation and subsequent crack instability are examined via two idealized problems; the first is concerned with instantaneous crack bifurcation and the second with instantaneous skew crack propagation. In either problem, crack propagation occurs at a constant subsonic velocity under an angle κπ with the normal to the surface. For the externally applied disturbances that are considered here, and for contstant crack-tip velocities, the particle velocity and τθz are functions of r/t and θ only, which allows Chaplygin’s transformation and conformal mapping to be used. The problems can then be solved using analytic function theory. For various values of the angle of crack propagation, the dependence of the elastodynamic stress intensity factors on the crack propagation velocity is investigated. For certain specific geometries, fully analytical solutions are derived to provide check cases.

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Mathematics of the 19th Century: Geometry/Analytic Function Theory

College Mathematics Journal ◽

10.2307/2687730 ◽

1999 ◽

Vol 30 (2) ◽

pp. 159

Author(s):

John Ewing ◽

A. N. Kolmogorov ◽

A. P. Yushkevich ◽

Roger Cooke

Keyword(s):

Analytic Function ◽

19Th Century ◽

Function Theory ◽

The 19Th Century

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Analytic Function Theory (E. Hills)

SIAM Review ◽

10.1137/1005108 ◽

1963 ◽

Vol 5 (4) ◽

pp. 377-378

Author(s):

J. L. Walsh

Keyword(s):

Analytic Function ◽

Function Theory

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Интегральные операторы, теоремы вложения, изометрии, граничное поведение и коэффициенты Тэйлора многомерных пространств типа Неванлинны и связанные с ними проблемы

Вестник КРАУНЦ. Физико-математические науки ◽

10.26117/2079-6641-2021-36-3-40-64 ◽

2021 ◽

pp. 40-64

Author(s):

R.F. Shamoyan

Keyword(s):

Analytic Function ◽

Function Theory ◽

Research Area ◽

One Dimension ◽

Embedding Theorems ◽

Higher Dimension ◽

Taylor Coefficients ◽

New Research

This paper contains an overview of recent results of Area-Nevanlinna classes in higher dimension. We here consider various aspects of this new interesting research area of analytic function theory in higher dimension (integral operations, embedding theorems, Taylor coefficients). Previously in one dimension all these results were known. New open interesting Problems in this new research area will be also discussed and indicated. В обзорной работе собраны воедино различные утверждения, полученные различными авторами в последнее время по аналитическим многомерным пространствам типа Неванлинны в различных многомерных областях. В статье также сформулированы и кратко обсуждаются различные новые актуальные интересные проблемы, возникающие естественным образом в указанных многомерных классах аналитических функций в различных областях в Cn. Особое внимание в работе уделяется изометриям, действию различных интегральных операторов, различным теоремам вложения, и оценкам коэффициентов Тейлора в упомянутых аналитических пространствах типа Неванлинны в различных многомерных областях. Вдобавок в данной статье вместе с ранее изученными многомерными классами функций подобного типа вводятся также новые различные шкалы многомерных пространств типа Неванлинны в различных областях в Cn.

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