Diophantine Approximations (Dover Books on Mathematics) [Paperback]

Ivan Niven (Author)

Book Description

ISBN-10: 0486462676 | ISBN-13: 978-0486462677 | Publication Date: March 14, 2008

This self-contained treatment covers basic results on homogeneous approximation of real numbers; the analogue for complex numbers; basic results for nonhomogeneous approximation in the real case; the analogue for complex numbers; and fundamental properties of the multiples of an irrational number, for both fractional and integral parts. 1963 edition.

Product Details

• Paperback: 80 pages
• Publisher: Dover Publications (March 14, 2008)
• Language: English
• ISBN-10: 0486462676
• ISBN-13: 978-0486462677
• Product Dimensions: 8.5 x 5.6 x 0.2 inches
• Shipping Weight: 4 ounces (View shipping rates and policies)
• Average Customer Review: 4.0 out of 5 stars  See all reviews (1 customer review)
• Amazon Best Sellers Rank: #1,285,534 in Books (See Top 100 in Books)

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1 of 1 people found the following review helpful:

4.0 out of 5 stars some mathematical gems in the rough, September 26, 2011

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muddy glass (new york) - See all my reviews

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This review is from: Diophantine Approximations (Dover Books on Mathematics) (Paperback)

diophantine approximation is a topic in number theory that deals with the approximation of irrational numbers by rational numbers. for example, the golden ratio [1+sqrt(5)]/2 is approximately 21/13 (or other ratios of fibonacci numbers), which can be easily seen via phi's continued fraction expansion. niven's "diophantine approximations" is an extended version of a lecture delivered by the author at a meeting of the mathematical association of america in 1960. at 62 pages sans the front and back matters, it is not meant to be a broad survey of the subject, but rather a self-contained exposition of certain related results, sometimes using non-standard techniques. as such, there are some gems in here for those brave enough to dig in, but the reader will need to have the motivation to do the digging in the first place.

niven's complete avoidance of continued fractions in this book is either a noteworthy feature or a horrendous bug, depending on your preferences. continued fractions hold an honorable position in this topic since convergents, the truncations of continued fractions, are the best approximations of irrationals in some sense. in chapter 1, where certain inequalities are developed to bound the error of an approximation by rationals, niven instead uses the tool of farey sequences in place of continued fractions. this might look ugly to some readers, but it also pays off to some extent. for example, it is well known that the absolute value of the error is bounded by the reciprocal of a product of consecutive denominators of the sequence of convergents. interestingly, if we ditch the absolute value bars, we can form tighter asymmetric bounds, i.e. the upper and lower bounds are of different forms. the author's approach yields a proof of this fact, which generalizes the symmetric bounds obtained through a standard approach with continued fractions.

another unique feature of this book is the generalization of the results in the real number case to that of complex numbers: irrational complex numbers are approximated by rational complex numbers. in this setting, complex integers are just the gaussian integers, and hence rational complex numbers are quotients of complex integers. irrational complex numbers form the complement of the rational complex numbers. diophantine approximation in the complex case is the subject of chapters 4 and 5 of the book. as you might suspect, lattices play a pivotal role here.

chapter 3 is perhaps the most interesting to me, though others are unlikely to feel the same. among other things, this chapter covers some structure theorems due to skolem and bang that deal with the integer parts of multiples of irrationals, i.e. what you get by applying the floor function to multiples of irrationals. i was pleasantly surprised to see these results in this book. these theorems could've helped with a problem i was working on in my high school days, so i'm happy to have this book as a reference. as niven notes, theorem 3.7 itself is so unknown that it's been rediscovered by several mathematicians over the years!

generally speaking, the proofs in this book can be a bit difficult to read. the reader will see the spirit of minkowski's geometry of numbers at work throughout the book, despite the fact that only one figure is drawn in this text! this is somewhat quirky, but i suppose the reader can and should draw his/her own pictures. the economical exposition in roughly 60 pages also implies that readers should be ready to supply the missing steps in proofs. however, most of the missing algebra can be done in your head or in the margins of the book. (yes, really. i'm lookin' at you, fermat.) the greatest difficulty in reading the proofs is probably attributable to the lack of motivation in some cases, as if constants and expressions are obtained out of thin air by "magic." however, to be fair, i will paraphrase one of my programming professors: "first get it to work, then worry about elegance later."

sometimes typography becomes a problem with older mathematical texts. springer is generally good about typesetting, but it's hit or miss with other publishers. (artin's book on galois theory and atiyah/macdonald's book on commutative algebra come to mind as two examples where the excellent content is done a tremendous disservice by the atrocious typesetting.) fortunately, niven's book looks good, even by modern standards. nevertheless, there are a few obvious typos that haunt the text. the careful reader should be able to exorcise them without too much difficulty.

overall, this book contains some intriguing results that are not widely known and is thus recommended to all patient lovers of numbers. niven's approach and choice of topics seem unorthodox enough to avoid excessive overlap with other number theory books. given the cheap cover price, there's very little reason not to have this book on your bookshelf if you're even remotely interested in any of the concepts covered. lastly, if you wish to read more about continued fractions, check out the two books by khinchin and olds, both aptly titled "continued fractions."