cover image The Nothing That Is: A Natural History of Zero

The Nothing That Is: A Natural History of Zero

Robert Kaplan. Oxford University Press, $65 (240pp) ISBN 978-0-19-512842-0

We know how useful it is to call nothing a number, but our ancestors didn't: without the idea of zero, complicated arithmetic was hard enough, and algebra--let alone modern higher math--unthinkable. Kaplan elucidates expertly the history and uses of the symbol for nothing at all not only in math, and the history of math and science, but also in historical linguistics, medieval metaphysics, accounting, pedagogy and literary interpretation. Among the questions he poses: What psychological and symbolic meanings did zero have for medieval mystics? Sumerians invented positional notation (the convention that lets the 8 in 283 mean 80, not 8); ancient Greeks had to conquer the Babylonians even to learn that. It was in India that the idea arose of treating no-thing as a number just like one-thing or two-things. (Kaplan suggests that the circular symbol arose from the depression left by a counting stone removed from sand.) The zero idea spread through the Arab world to Europe and China. A cast of mathematical thinkers, among them Archimedes, Aryabhata and John von Neumann, join less likely figures in Kaplan's bevy of anecdotes, among the latter Meister Eckhart, Dostoevsky, Sylvia Plath and Wallace Stevens (the source of the book's title). Kaplan's eloquence can blur the line between metaphor and consequence: the ""fluidity of position"" that zero brought to European arithmetic indeed helped cause Renaissance social ""fluidity,"" but only through a very long chain of effects. More often, Kaplan is entertaining, clear and to the (decimal) point. Who knew there was so much to say about nothing? 40,000 first printing; author tour; foreign rights sold in Italy, the Netherlands, the U.K., Germany, Brazil. (Oct.)