Re^5: Is it possible to get a 'hole' in a Veronoi diagram?

That all sound plausible to me. Greek, but plausible :)

My 'proof' is somewhat erm, simpler. Working with Sam's phone box analogy from above, for there to be a hole in the middle of the phone boxes would imply an area of space between them that isn't "closest" to any of them. Which just doesn't make any sense.

Examine what is said, not who speaks -- Silence betokens consent -- Love the truth but pardon error.

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In the absence of evidence, opinion is indistinguishable from prejudice.

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