Kenneth Appel

From Wikipedia, the free encyclopedia

Kenneth Appel (born 1932) is a mathematician who, in 1976 with colleague Wolfgang Haken at the University of Illinois at Urbana-Champaign, solved one of the most famous problems in mathematics, the four-color theorem. They proved that any two-dimensional map, with certain limitations, can be filled in with four colors without any adjacent "countries" sharing the same color. Appel's children, including Laurel Appel, Peter Appel, and Andrew Appel, now a professor at Princeton, helped in the checking of over 1000 topological cases that constitute this proof.

The proof has been one of the most controversial of modern mathematics because of its heavy dependence on computer "number-crunching" to sort through possibilities. Even Appel has agreed, in numerous interviews, that it lacks elegance and provided no new insight that has guided future mathematical research.

Others, however, have pointed to this work as the start of a sea-change in mathematicians' attitudes toward computers - which they had largely disdained as a tool for engineers rather than for theoreticians - leading to the creation of what is sometimes called "experimental mathematics."

From 1993 through 2002, Appel was head of the mathematics department at the University of New Hampshire in Durham, New Hampshire.

Retrieved from "http://en.wikipedia.org../../../k/e/n/Kenneth_Appel_6c73.html"

Categories: 1932 births | Living people | American mathematicians | 20th century mathematicians | Graph theorists

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• This page was last modified 12:37, 4 April 2007 by Wikipedia user Thijs!bot. Based on work by Wikipedia user(s) David Eppstein, Michael Hardy, Terryn3, Kenappel, M a s, Icairns, Disambiguator, D6, SystemBuilder, Unyoyega, Zoicon5, YUL89YYZ, DavidWBrooks, Ssd, Schneelocke, Danny and Alan Peakall and Anonymous user(s) of Wikipedia.
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