本书是以实变函数与泛函分析课程内容为先导的介绍近代实分析的引论性著作。除必要的基础知识外，一些最活跃的研究领域，如Calderen—Zygmund奇异积分算子，Hp空间的实变理论，算于的加权模不等式等，在书中都得到了充分反映．全书通过对实变量函数所构成的各种函数空间(如Lebesgue空间、连续函数空间、Hardy空间、BMO空间等)和它们之间的算子作用以及Fourier分析、算子与空间内插等重要方法的描述，对20世纪50年代以来逐步形成与发展的处理n维欧氏空间上各种分析问题的实变方法与技巧做了系统、深入、简明的介绍．本书内容丰富、近代、叙述严谨、简明，是实分析方面一本可读性很强的教科书与参考书．. 本书前4章可供本科高年级学生选修，全书可作基础与应用数学、计算数学等许多方面的研究生的公共学位课教材，为从事调和分析、偏微分方程、非线性分析、数值分析、乃至数学物理等方面的研究与应用的读者提供必要的实分析基础训练．...

《实分析习题集》(第2版)是优秀的实分析课程配套习题集．书中提供了600多道习题的详细解答。内容涉及实分析基础、拓扑和连续、测度论、Lebesgue积分、赋范空间与空间、Hilbcrt空间等．书后附录中列出了习题中引用的定理、引理等，因此不需要参考原书也能运用这本习题集。

《实分析(英文版·第4版)》是实分析课程的优秀教材，被国外众多著名大学（如斯坦福大学、哈佛大学等）采用。全书分为三部分：第一部分为实变函数论.介绍一元实变函数的勒贝格测度和勒贝格积分:第二部分为抽象空间。介绍拓扑空间、度量空间、巴拿赫空间和希尔伯特空间；第三部分为一般测度与积分理论。介绍一般度量空间上的积分.以及拓扑、代数和动态结构的一般理论。书中不仅包含数学定理和定义，而且还提出了富有启发性的问题，以便读者更深入地理解书中内容。

《实分析和概率论(原书第2版)》清晰地讲解了现代概率论以及概率测度与度量空间之间的相互关系。《实分析和概率论(原书第2版)》分两部分，第一部分介绍了实分析的内容，包括基础集合论、一般拓扑、测度、积分、巴拿赫空间及希尔伯特空间上的函数分析、凸集和函数以及拓扑空间上的测度，第二部分介绍了基于测度论卜的概率论，包括大数定律、遍历定理、中心极限定理、条件期望、鞅收敛另外，随机过程一章介绍了布朗运动以及布朗桥。

The first three editions of H．］．Royden’S Real Analysis have contributed to the education of generation so fm a them atical analysis students．This four the dition of Real Analysispreservesthe goal and general structure of its venerable predecessors——to present the measure theory．integration theory．and functional analysis that a modem analyst needs to know． The book is divided the three parts：Part I treats Lebesgue measure and Lebesgueintegration for functions of a single real variable；Part II treats abstract spaces topological spaces，metric spaces，Banach spaces，and Hilbert spaces；Part III treats integration over general measure spaces．together with the enrichments possessed by the general theory in the presence of topological，algebraic，or dynamical structure． The material in Parts II and III does not formally depend on Part I．However．a careful treatment of Part I provides the student with the opportunity to encounter new concepts in afamiliar setting，which provides a foundation and motivation for the more abstract conceptsdeveloped in the second and third parts．Moreover．the Banach spaces created in Part I．theLp spaces，are one of the most important dasses of Banach spaces．The principal reason forestablishing the completeness of the Lp spaces and the characterization of their dual spacesiS to be able to apply the standard tools of functional analysis in the study of functionals andoperators on these spaces．The creation of these tools is the goal of Part II．

An in-depth look at real analysis and its applications-now expanded and revised. This new edition of the widely used analysis book continues to cover real analysis in greater detail and at a more advanced level than most books on the subject. Encompassing several subjects that underlie much of modern analysis, the book focuses on measure and integration theory, point set topology, and the basics of functional analysis. It illustrates the use of the general theories and introduces readers to other branches of analysis such as Fourier analysis, distribution theory, and probability theory. This edition is bolstered in content as well as in scope-extending its usefulness to students outside of pure analysis as well as those interested in dynamical systems. The numerous exercises, extensive bibliography, and review chapter on sets and metric spaces make Real Analysis: Modern Techniques and Their Applications, Second Edition invaluable for students in graduate-level analysis courses. New features include: * Revised material on the n-dimensional Lebesgue integral. * An improved proof of Tychonoff's theorem. * Expanded material on Fourier analysis. * A newly written chapter devoted to distributions and differential equations. * Updated material on Hausdorff dimension and fractal dimension.