2 edition of **Value distribution theory** found in the catalog.

Value distribution theory

Yang, Le

- 260 Want to read
- 4 Currently reading

Published
**1993**
by Springer-Verlag, Science Press in Berlin, New York, Beijing
.

Written in English

- Value distribution theory.

**Edition Notes**

Statement | Yang Lo. |

Classifications | |
---|---|

LC Classifications | QA331.7 .Y3613 1993 |

The Physical Object | |

Pagination | xii, 268, [1] p. ; |

Number of Pages | 268 |

ID Numbers | |

Open Library | OL1192435M |

ISBN 10 | 3540543791, 0387543791 |

LC Control Number | 94183719 |

OCLC/WorldCa | 29741392 |

Additional Physical Format: Online version: Sario, Leo. Value distribution theory. Princeton, N.J., Van Nostrand [] (OCoLC) Material Type. ISBN: OCLC Number: Description: vi, pages ; 25 cm. Contents: Part I. Geometric value distribution theory --A new program of investigations in analysis: Gamma-lines approaches / Barsegian, GOn level sets of quasiconformal mappings / Sukiasyan, G. --Part cal value distribution theory --On the .

Introduction 5 Statistical extreme value theory is a field of statistics dealing with extreme values, i.e., large deviations from the median of probability distributions. The theory assesses the type of probability distribution generated by processes. A theory of value should identify the factors that determine the distribution of income. If it cannot identify the magnitude of profit, a theory of value should indicate which forces external to the economic system determine the magnitude of profit. A theory of value should help us identify the forces responsible for economic growth.

COVID Resources. Reliable information about the coronavirus (COVID) is available from the World Health Organization (current situation, international travel).Numerous and frequently-updated resource results are available from this ’s WebJunction has pulled together information and resources to assist library staff as they consider how to handle coronavirus. The main object of this book will be the behavior of large sets of discrete random variables. A discrete random variable X is completely deﬁned1 by the set of values it can take, X, which we assume to be a ﬁnite set, and its probability distribution {pX(x)}x∈X. The value pX(x) is the probability that the random variable Xtakes the value x.

You might also like

anti-Stalin campaign and international communism

anti-Stalin campaign and international communism

Youth socialization in Kazakhstan

Youth socialization in Kazakhstan

The Random House dictionary of the Englishlanguage

The Random House dictionary of the Englishlanguage

Portugal and porcelain

Portugal and porcelain

Gyāraspur, a heritage of excellence

Gyāraspur, a heritage of excellence

Eclipse

Eclipse

Smash cut

Smash cut

Water for People-water for Life

Water for People-water for Life

The book is very well-written. The reviewer highly recommends this book. Value distribution theory book To close on a personal note, I learned a lot from reading this book." (Min Ru, Zentralblatt MATH, Vol.

) "The book is a very nice introduction to the theory of value distribution by covering all major aspects of the theory. Cited by: An entire function J (z) of order A(0. A (0) satisfies -1' logn(r, J = a) \ 1m = 1\ r->oo logr for every finite complex value a, with at most one exception.

This result, generally known as the Picard-Borel theorem, lay the foundation for the theory of value distribution and since then has been the source of many research papers on this : $ An entire function J (z) of order A(0. A (0) satisfies -1' logn(r, J = a) \ 1m = 1\ r->oo logr for every finite complex value a, with at most one exception.

This result, generally known as the Picard-Borel theorem, lay the foundation for the theory of value distribution and since then has been the source of many research papers on this : Springer-Verlag Berlin Heidelberg. An entire function J (z) of order A(0 oo logr for every finite complex value a, with at most one exception.

This result, generally known as the Picard-Borel theorem, lay the foundation for the theory of value distribution and since then has been the source of many research papers on this subject.

The purpose of this research monograph is to build up a modern value distribution theory for complex analytic mappings between abstract Riemann surfaces.

All results presented herein are new in that, apart from the classical background material in the last chapter, there is no over lapping with.

The Nevanlinna theory of value distribution of meromorphic functions, one of the milestones of complex analysis during the last century, was c- ated to extend the classical results concerning the distribution of of entire functions to the more general setting of meromorphic functions.

In mathematics, the value distribution theory of holomorphic functions is a division of mathematical analysis. It tries to get quantitative measures of the number of times a function f(z) assumes a value a, as z grows in size, refining the Picard theorem on behaviour close to an essential singularity.

The book also presents the state of the art in the studies of the analogues between Diophantine approximation (in number theory) and value distribution theory (in complex analysis), with a method based on Vojta’s dictionary for the terms of these two fields.

The approaches are relatively natural and more effective than existing methods. This important book provides an up-to-date comprehensive and down-to-earth survey of the theory and practice of extreme value distributions -- one of the most prominent success stories of modern applied probability and s: 4.

"Value Distribution of Meromorphic Functions" focuses on functions meromorphic in an angle or on the complex plane, T directions, deficient values, singular values, potential theory in value distribution and the proof of the celebrated Nevanlinna conjecture.

The book is very well-written. The reviewer highly recommends this book. To close on a personal note, I learned a lot from reading this book." (Min Ru, Zentralblatt MATH, Vol. ) "The book is a very nice introduction to the theory of value distribution by covering all major aspects of the theory.

Brand: Springer-Verlag Berlin Heidelberg. Value Distribution Theory of the Gauss Map of Minimal Surfaces in Rm. Authors: Fujimoto, Hirotaka Free Preview. "This book presents recent results in the value-distribution theory of L-functions with emphasis on the phenomenon of universality.

In this book the author proves universality for polynomial Euler products. is written in a narrative and reader friendly : Springer-Verlag Berlin Heidelberg. The purpose of this research monograph is to build up a modern value distribution theory for complex analytic mappings between abstract Riemann surfaces.

All results presented herein are new in that, apart from the classical background material in the last chapter, there is no over lapping with any existing monograph on merom orphic functions. Book Description. The essays in this volume, first published inseek to re-examine an important area of economic theory: value and distribution.

In a sustained and analytical critique, two principle methodological approaches are compared and distinguished: the Classical or ‘surplus-based’ theories and the demand-and-supply-based.

Mr Dobb examines the history of economic thought in the light of the modern controversy over capital theory and, more particularly, the appearance of Sraffa's book The Production of Commodities by Means of Commodities, which was a watershed in the critical discussions constituted a crucial turning-point in the history of economics: an estimate not unconnected with his reinterpretation Cited by: The book presents a rigorous reconstruction of Ricardo's contribution to economic theory and a unifying interpretation of the key issues of Ricardo's research.

Part One deals primarily with the problems of value and distribution Part Two deals specifically with the issues of distribution and growth. In probability theory and statistics, the generalized extreme value (GEV) distribution is a family of continuous probability distributions developed within extreme value theory to combine the Gumbel, Fréchet and Weibull families also known as type I, II and III extreme value distributions.

By the extreme value theorem the GEV distribution is the only possible limit distribution of properly. 1 Essentials of Nevanlinna Theory.- 2 Normal Families.- 3 Borel Directions.- 4 Value Distribution of Meromorphic Functions Together with Their Derivatives.- 5 Recent Studies on Borel Directions.- 6 Deficient Values and Borel Directions of Meromorphic Functions.- 7 The Spread Relation and Its Applications.

Other Titles. Internal Report SUF–PFY/96–01 Stockholm, 11 December 1st revision, 31 October last modiﬁcation 10 September Hand-book on STATISTICAL. Value Distribution Theory (The university series in higher mathematics) Softcover reprint of the original 1st ed.

Edition by Leo Sario (Author) ISBN ISBN Why is ISBN important? ISBN. This bar-code number lets you verify that you're getting exactly the right version or edition of a book.Mr Dobb examines the history of economic thought in the light of the modern controversy over capital theory and, more particularly, the appearance of Sraffa's book The Production of Commodities by Means of Commodities, which was a watershed in the critical discussions constituted a crucial turning-point in the history of economics: an estimate not unconnected with his reinterpretation of.Tulane University Program on Value-Distribution Theory in Complex Analysis and Related Topics in Differential Geometry ().

Value-distribution theory. New York, M. Dekker, [v. 1, ] (OCoLC) Material Type: Conference publication: Document Type: Book: All Authors / Contributors: Robert O Kujala; Albert L Vitter.