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奇异积分和函数的可微性
《奇异积分和函数的可微性(英文)(影印版)》内容简介:This book is an outgrowth of a course which I gave at Orsay duringthe academic year 1 966.67 MY purpose in those lectures was to pre-sent some of the required background and at the same time clarify theessential unity that exists between several related areas of analysis.These areas are:the existence and boundedness of singular integral op-erators;the boundary behavior of harmonic functions;and differentia-bility properties of functions of several variables.AS such the commoncore of these topics may be said to represent one of the central develop-ments in n.dimensional Fourier analysis during the last twenty years,and it can be expected to have equal influence in the future.These pos. -
欧几里得空间的傅立叶分析
《欧几里得空间的博里叶分析》内容简介:This book is designed to be an introduction to harmonic analysis inEuclidean spaces. The subject has seen a considerable flowering during thepast twenty years. We have not tried to cover all phases of this develop-ment. Rather, our chief concern was to illustrate various methods used inthis aspect of Fourier analysis that exploit the structure of Euclideanspaces. In particular, we try to show the role played by the action oftranslations, dilations, and rotations. Another concern, not independentof this chief one, is to motivate the study of harmonic analysis on moregeneral spaces having an analogous structure (such as arises in symmetricspaces). It is our feeling that the study of Fourier analysis in that contextand, also, in other general settings, is more meaningful once the specialEuclidean case is understood. -
调和分析
这是近年来现代分析数学最著名、最重要的论著之一。近30年来,调和分析历经了巨大发展,涌现了许多新的成果,而此书的主旨正是对这一领域的最新发展作了全面、系统、深入的阐述。书中主要论述了以下几方面的内容:调和分析经典理论的实变刻画;拟微分算子与奇异积分算子;几乎正交理论;振荡积分理论;极大算子和极大平均理论Heisenberg群上的调和分析等。作者尽量使用第一手材料,而且尽其所能将每一种证明方法的优越性告诉读者。每章的附录对最新的研究成果及其在其它学科中的应用进行了详细的评述。总之,这是一部论证严谨、内容丰富而不乏深度的不可多得的优秀学术专著。