This material in this classic work is mostly accessible to the undergraduate level engineer, mathematics, or other reader with similar background, but a good portion of this book is about measure theory of continued fractions, which is more easily accessed by those who have some mathematics background at the graduate level.
Measure theory is the theory of the fraction of the extent of a domain that is mapped from the range of inputs to a function. Measure theory is used primarily by Khinchin and his students, but similar work is posed in terms of probability theory and other contexts by other mathematicians. Once this is understood (and it is hinted at by a footnote or two from the translator), this material becomes as accessible as the rest of the material.
The book begins with a minor aside in a proof of convergence of continued fractions that have real partial numerators and denominators, whose partial numerators are all unity, and the sum of whose partial denominators diverges. Since the simple classical number-theoretic continued fractions are the subject of the book, this proof clearly includes all such continued fractions. This minor excursion from number theory and algebra is a significant advantage to this particular book as it provides a bedrock for later rate-of-convergence discussions.
The related field of analytic theory of continued fractions that was explored by Riemann, Stieltjes, Tchebychev, Padé, Hamburger, Cesàro, and others that are contemporary to Khinchin (memorable classic by H.S. Wall was published in 1948, long after this book was written), is not ignored entirely.
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Customers say
Customers find this book to be an excellent introduction to the subject of continued fractions, with one customer noting it provides a doorway into deep number theory. Moreover, the text is readable and easy to follow.
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12 customers mention content, 10 positive, 2 negative
An OK book. Not technically difficult, basically just high-school algebra....Read more
Nice book. Easy to follow. Interesting subject.Read more
...background, but a good portion of this book is about measure theory of continued fractions, which is more easily accessed by those who have some...Read more
...both transcendental and analytical irrationals, continued fractions are enormously useful. Never heard of them? You're not alone....Read more
8 customers mention readability, 7 positive, 1 negative
Short, readable book, wealth of applications, this little gem provides a doorway into deep number theory....Read more
...An inexpensive, interesting and quick read. Well worth having for the amount of information in it.Read more
...For example 1/pi = 113/355 -- something that is very easy to remember (note the doubles of the odd numbers up to five)....Read more
Nice book. Easy to follow. Interesting subject.Read more
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- ab..cReviewed in the United Kingdom on September 1, 2009
useful book to learn 'assumed mathematical methods'
Format: PaperbackVerified Purchase - AlbearReviewed in the United Kingdom on February 25, 2014
A Russian approach to Measure Theory
Format: PaperbackVerified Purchase
