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Mathematics and Its Applications

# Metrical Theory of Continued Fractions

Authors: Iosifescu, M., Kraaikamp, Cornelis

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eBook $109.00 price for USA in USD (gross) • ISBN 978-94-015-9940-5 • Digitally watermarked, DRM-free • Included format: PDF • ebooks can be used on all reading devices • Immediate eBook download after purchase Hardcover$149.99
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Softcover $139.00 price for USA in USD • ISBN 978-90-481-6130-0 • Free shipping for individuals worldwide • Usually dispatched within 3 to 5 business days. About this book This monograph is intended to be a complete treatment of the metrical the­ ory of the (regular) continued fraction expansion and related representations of real numbers. We have attempted to give the best possible results known so far, with proofs which are the simplest and most direct. The book has had a long gestation period because we first decided to write it in March 1994. This gave us the possibility of essentially improving the initial versions of many parts of it. Even if the two authors are different in style and approach, every effort has been made to hide the differences. Let 0 denote the set of irrationals in I = [0,1]. Define the (reg­ ular) continued fraction transformation T by T (w) = fractional part of n 1/w, w E O. Write T for the nth iterate of T, n E N = {O, 1, ... }, n 1 with TO = identity map. The positive integers an(w) = al(T - (W)), n E N+ = {1,2··· }, where al(w) = integer part of 1/w, w E 0, are called the (regular continued fraction) digits of w. Writing . for arbitrary indeterminates Xi, 1 :::; i :::; n, we have w = lim [al(w),··· , an(w)], w E 0, n--->oo thus explaining the name of T. The above equation will be also written as w = lim [al(w), a2(w),···], w E O. Reviews From the reviews: "The authors present and prove the most recent developments in solving the celebrated 1812 Gauss’ problem which originated the metrical theory of continued fractions. At the same time, they study exhaustively the Perron-Frobenius operator, which is of basic importance in this theory, on various Banach spaces including that of functions of bounded variation on the unit interval. The book is of interest to research workers and advanced Ph. D. students in probability theory, stochastic processes and number theory." (Cryssoula Ganatsiou, Zentralblatt MATH, Vol. 1069 (20), 2005) "While many excellent books on continued fractions are written, it is rare to see a book exclusively devoted to the material theory of these objects. … In addition to filling a hole in the mathematical literature, it does this very thoroughly. It gets around most topics related to the metrical theory of continued fractions … . The book is well suited for researchers and advanced graduate students working in functional analysis, probability and/or ergodic theory wishing to learn about the world of continued fractions." (Simon Kristensen, Zentralblatt MATH, Vol. 1122 (24), 2007) ## Table of contents (4 chapters) Table of contents (4 chapters) • Basic properties of the continued fraction expansion Pages 1-51 Iosifescu, Marius (et al.) • Solving Gauss’ problem Pages 53-163 Iosifescu, Marius (et al.) • Limit theorems Pages 165-217 Iosifescu, Marius (et al.) • Ergodic theory of continued fractions Pages 219-311 Iosifescu, Marius (et al.) ### Buy this book eBook$109.00
price for USA in USD (gross)
• ISBN 978-94-015-9940-5
• Digitally watermarked, DRM-free
• Included format: PDF
• ebooks can be used on all reading devices
Hardcover $149.99 price for USA in USD • ISBN 978-1-4020-0892-4 • Free shipping for individuals worldwide • Usually dispatched within 3 to 5 business days. Softcover$139.00
price for USA in USD
• ISBN 978-90-481-6130-0
• Free shipping for individuals worldwide
• Usually dispatched within 3 to 5 business days.

## Bibliographic Information

Bibliographic Information
Book Title
Metrical Theory of Continued Fractions
Authors
Series Title
Mathematics and Its Applications
Series Volume
547
2002
Publisher
Springer Netherlands
Springer Science+Business Media B.V.
eBook ISBN
978-94-015-9940-5
DOI
10.1007/978-94-015-9940-5
Hardcover ISBN
978-1-4020-0892-4
Softcover ISBN
978-90-481-6130-0
Edition Number
1
Number of Pages
XIX, 383
Topics