| "You never need more than four colors to color every country on a map a different color from its neighbors" Is that true in today's geography? I know of one almost [1] counterexample (of that specific statement, not of the four-color theorem): the North Sea, Belgium, the French Republic, Germany and the Kingdom of the Netherlands all border each other, so you need five different colors to color them on a map. [1] Almost because the Kingdom of the Netherlands isn't a country. Confused? Read http://en.m.wikipedia.org/wiki/Kingdom_of_the_Netherlands, in particular the part about overseas territories, and notice that Sint Maarten borders Saint-Martin. [on an even more sideways track: the US dollar is an official currency in part of the _country_ of the Netherlands (in Bonaire, Saba and St Eustatius)] Back to my original question: does anybody know of a valid counterexample for the statement on countries? |
Neither is the North Sea! Nonetheless, this is a neat example.
> Back to my original question: does anybody know of a valid counterexample for the statement on countries?
A standard counterexample to the hypotheses of the 4-colour theorem (though not to the conclusion, as consulting a map easily verifies) is Michigan, which is not connected.
The 4-colour theorem's hypotheses also rules out the possibility of 4 countries meeting at a corner (or, rather, declare that they don't meet in that case). If there were such an arrangement—and I'd be surprised if there isn't; for 3 countries, one has the example of Finland, Sweden, and Norway—then it would be easy to juice it up to a counterexample.
Maybe the guy who established an island with a bizarre currency, including one coin that had a denomination of π (I can't remember who—I thought Dean Kamen, but his Wikipedia page doesn't mention it), could be induced to subdivide his island in such a way as to create a counterexample. :-)