Some years ago I mentioned stumbling across Keith Devlin’s older book (1997), “Goodbye Descartes” and really enjoying it. Dr. Devlin’s interests in cognitive topics, as represented in that volume, overlap my own, and often aren't broached by math writers. Cognitive psychology was a major focus in college, and to this day I find the linkages between mathematics, language, music, and semantics fascinating — despite all that has been written about such topics, I suspect they remain little deeply understood. (And some of it even links back in my own mind to the “General Semantics” of Alfred Korzybski, and the way words and meaning govern/manipulate human thought/behavior).
Anyway, last week I stumbled upon another similar, vintage Devlin volume, “The Language of Mathematics: Making the Invisible Visible” (1998)… and am yet again enthralled by Keith’s beautifully-straightforward exposition! The book obviously can’t qualify for my end-of-year list of best popular math books of 2016, but may nonetheless turn out to be my favorite read of this entire year! And while most of you won’t go searching for an almost 20-year-old volume, that’s what I’d urge you to do, if you've not already read it!.
Keith articulates his theme of math as the science of patterns, while offering excellent introductions to math foundations, history, logic, set theory, calculus, geometry, symmetry, knot theory, topology, probability, and some physics, while admitting there is much he is leaving out. As he writes in a postscript, rather than 'serving up a vast smorgasbord of topics, each one allotted a couple of pages' (as other books often do) he has tried to show that the "mathematical study of any one phenomena has many similarities to a mathematical study of any other." Where so many introductory books to mathematics focus on the logic and procedures of math, Keith emphasizes here the abstract and interwoven nature of real mathematics.
Even though the book's age means a few passages are out-of-date, for the up-and-coming young person interested in math, I don't know a better, clearer overview of what the field is all about.
This extended quote from the volume's Prologue I think captures an essence Dr. Devlin often addresses:
“The use of a symbol such as a letter, a word, or a picture to denote an abstract entity goes hand in hand with the recognition of that entity as an entity. The use of the numeral ‘7’ to denote the number 7 requires that the number 7 be recognized as an entity; the use of the letter m to denote an arbitrary whole number requires that the concept of a whole number be recognized. Having the symbol makes it possible to think about and manipulate the concept.
“This linguistic aspect of mathematics is often overlooked, especially in our modern culture, with its emphasis on the procedural, computational aspects of mathematics. Indeed, one often hears the complaint that mathematics would be much easier if it weren’t for all that abstract notation, which is rather like saying that Shakespeare would be much easier to understand if it were written in simpler language.
"Sadly, the level of abstraction in mathematics, and the consequent need for notation that can cope with that abstraction, means that many, perhaps most, parts of mathematics will remain forever hidden from the nonmathematician; and even the more accessible parts — the parts described in books such as this one — may be at best dimly perceived, with much of their inner beauty locked away from view.”
In turn, all of that reminds me, oddly enough, of a favorite passage (I’ve used here before) from controversial David Berlinski in his book about Euclid, “The King of Infinite Space.” Sometimes I flip-flop between thinking that this odd passage is just wordplay sophistry, and feeling that it is actually a rather profound statement about the nature of proof or certainty (...and I hope Dr. Devlin won't mind that something he has written reminds me of words from Berlinski ;-):
"Like any other mathematician, Euclid took a good deal for granted that he never noticed. In order to say anything at all, we must suppose the world stable enough so that some things stay the same, even as other things change. This idea of general stability is self-referential. In order to express what it says, one must assume what it means.
"Euclid expressed himself in Greek; I am writing in English. Neither Euclid's Greek nor my English says of itself that it is Greek or English. It is hardly helpful to be told that a book is written in English if one must also be told that written in English is written in English. Whatever the language, its identification is a part of the background. This particular background must necessarily remain in the back, any effort to move it forward leading to an infinite regress, assurances requiring assurances in turn.
"These examples suggest what is at work in any attempt to describe once and for all the beliefs 'on which all men base their proofs.' It suggests something about the ever-receding landscape of demonstration and so ratifies the fact that even the most impeccable of proofs is an artifact."
[I do loves me some recursion! ;-) ]
Anyways, there have been many wonderful popular math books in recent years, but sometimes you can't improve much on older volumes, when it comes to a timeless subject like mathematics. And Keith's writing is always as lucid as there is.
Finally, for an older review of Dr. Devlin's book, see here:
