Knot Book; An Elementary Introduction to the Mathematical Theory of Knots

A knot seems a simple, everyday thing, at least to anyone who wears laced shoes or uses a corded telephone. In the mathematical discipline known as topology, knots are anything but simple: at 16 crossings of a "closed curve in space that does not intersect itself anywhere", a knot can take one of 1,388,705 permutations, and more are possible. All this thrills mathematics professor Colin Adams, whose primer The Knot Book offers an engaging if often challenging introduction to the mysterious, often unproven, but, he suggests, ultimately knowable nature of knots of all kinds--whether nontrivial, satellite, torus, cable or hyperbolic. As perhaps befits its subject, Adams's prose is sometimes... well, tangled ("A knot is amphicheiral if it can be deformed through space to the knot obtained by changing every crossing in the projection of the knot to the opposite crossing.") but his book is great fun for puzzle and magic buffs, and a useful reference for students of knot theory and other aspects of higher mathematics. --Gregory McNamee