Posted by **ChrisRedfield** at Dec. 8, 2014

Published: 2010-07-16 | ISBN: 3034600089, 3034600186 | PDF | 340 pages | 3 MB

Posted by **AvaxGenius** at Oct. 11, 2017

English | PDF(Repost),EPUB | 2014 | 425 Pages | ISBN : 4431545700 | 8.55 MB

The aim of this book is to provide a comprehensive account of higher dimensional Nevanlinna theory and its relations with Diophantine approximation theory for graduate students and interested researchers.

Posted by **libr** at Sept. 25, 2017

English | 2007-03-21 | ISBN: 9812705740 | 377 pages | PDF | 2,5 mb

Posted by **nebulae** at Sept. 20, 2017

English | ISBN: 1470419270 | 2016 | 168 pages | PDF | 1 MB

Posted by **arundhati** at Sept. 13, 2017

2017 | ISBN-10: 1470422557 | 184 pages | PDF | 2 MB

Posted by **Jeembo** at March 19, 2017

English | 2001 | ISBN: 0821827243 | 564 Pages | DJVU | 6.2 MB

This work departs from earlier treatments of the subject by emphasizing integral formulas, the geometric theory of pseudoconvexity, estimates, partial differential equations, approximation theory, the boundary behavior of holomorphic functions, inner functions, invariant metrics, and mapping theory.

Posted by **Nice_smile)** at Jan. 14, 2017

English | 2014 | ISBN: 3319115103 | 110 Pages | PDF | 810.12 KB

Posted by **step778** at Dec. 16, 2016

2013 | pages: 425 | ISBN: 4431545700 | PDF | 3,3 mb

Posted by **Underaglassmoon** at Oct. 3, 2015

Springer | Mathematics | October 30, 2015 | ISBN-10: 4431557466 | 196 pages | pdf | 2.38 mb

by Takeo Ohsawa (Author)

Selects only extremely important materials from the conventional basic theory of complex analysis and manifold theory

Requires no more than a one-semester introductory course in complex analysis as a prerequisite for understanding

Posted by **tanas.olesya** at Oct. 2, 2015

English | 30 Apr. 1999 | ISBN: 0792349644 | 219 Pages | PDF | 15 MB

This interesting book deals with the theory of convex and starlike biholomorphic mappings in several complex variables. The underly ing theme is the extension to several complex variables of geometric aspects of the classical theory of univalent functions.