Monochromatic infinite sets in Minkowski planes
Abstract
We prove that for any p-norm in the plane with 1<p<∞ and for every infinite M ⊂ R2, there exists a two-colouring of the plane such that no isometric copy of M is monochromatic. On the contrary, we show that for every polygonal norm (that is, the unit ball is a polygon) in the plane, there exists an infinite M ⊂ R2 such that for every two-colouring of the plane there exists a monochromatic isometric copy of M.
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