R. H. Dyer - From Real to Complex Analysis
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- Book:From Real to Complex Analysis
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From Real to Complex Analysis: summary, description and annotation
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The purpose of this book is to provide an integrated course in real and complex analysis for those who have already taken a preliminary course in real analysis. It particularly emphasises the interplay between analysis and topology.
Beginning with the theory of the Riemann integral (and its improper extension) on the real line, the fundamentals of metric spaces are then developed, with special attention being paid to connectedness, simple connectedness and various forms of homotopy. The final chapter develops the theory of complex analysis, in which emphasis is placed on the argument, the winding number, and a general (homology) version of Cauchys theorem which is proved using the approach due to Dixon.
Special features are the inclusion of proofs of Montels theorem, the Riemann mapping theorem and the Jordan curve theorem that arise naturally from the earlier development. Extensive exercises are included in each of the chapters, detailed solutions of the majority of which are given at the end. From Real to Complex Analysis is aimed at senior undergraduates and beginning graduate students in mathematics. It offers a sound grounding in analysis; in particular, it gives a solid base in complex analysis from which progress to more advanced topics may be made.
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, where 
and 
are real and 
, does there exist 
such that 
With somewhat greater effort, development of the Lebesgue integral would allow us to enlarge this class. However, for the topics covered in this text the answer provided suffices; in particular, it is entirely adequate in the resolution of an analogous question asked in the context of complex analysis, a question which is the focus of our final chapter.
and 
be real numbers, with 
. Any finite set of points 
with 
is called a partition of 
and will often be denoted by 
; we put 
and call 
the width of 
. The family of all partitions of 
is denoted by 
, or simply by 
if no ambiguity is possible. Let 
or simply 
be the family of all bounded functions 
; given any 
and any 
, put 
and call 
with respect to 
, respectively.
is the sum of the signed areas of 
rectangles, the 
of which has base 
and height 
; 
is the same except that the 
rectangle has height 
. These quantities are familiar to anyone who has tried to estimate the area of the set of points lying between the curve 
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