您现在的位置:首页 > 知识库 > 理学类 >多复变中的全纯函数和积分表示 英文版
多复变中的全纯函数和积分表示 英文版

多复变中的全纯函数和积分表示 英文版

资料大小: 87.98 MB
文档格式: PDF文档
资料语言: 简体中文
资料类别: 理学类
更新日期: 2020-01-07
下载说明:
推荐信息: 函数   积分   英文   中的   表示

本地下载(30点)  备用下载(30点)

内容简介
多复变中的全纯函数和积分表示 英文版
出版时间:2012年版
内容简介
  I am pleased that Springer-Verlag has decided to reprint this book, givingme the opportunity to include a number of corrections. The changes in this printing are mainly limited to the correction of typographical and other minor errors which I have become aware of since 1986. A couple of changes should be mentioned explicitly. The definition of completely srngular in Chapter H.2 has been modified slightly, the proof of Theorem I1.2.3 has been changed accordingly, and Appendix C has been rewritten. I would like to thank J. Bruna, K. Burke, J. Fleron, W. Rudin, W. Stoll and E. Straube for their helpful comments.Soon after publication of the first edition, E. Martinelly brought to my at-tention some papers by F. Severi and G. Fichera, which play a fundamental role in the development of the so-called CR extension theorem. This result-a strengthening of the celebrated Hartogs Extension Theorem-involves the characterization of boundary values of holomorphic functions by the tangen- tial Cauchy-Riemann equations, i.e., by intrinsic conditions on the boundary.Unfortunately, much of the literature written in English related to tbis topic had been unaware of the work of Severi and Fichera, and thus it presents an inaccurate account of its history. In view of the new evidence and of the great interest which the Hartogs and CR extension phenomena have generated over many decades, I have completely revised and expanded the relevant sectionsof the Notes to Chapter IV. and I have added several new references tothe bibliography. It is my pleasure to thank R. Gunning, L. Hormander, J.J.Kohn, E. Martinelly, and H. Rossi for their assistance in setting the record straight.
目录
全纯函数的局部性质
正则和伪凸区域
微分形式和hermitian几何
cn上的积分表示
严格伪凸上的levi问题和解
cn上正则区域上的函数理论
严格伪凸上的函数理论话题