Balancing games on unbounded sets
Abstract
For a finite set V⊂ Rn, a set T⊂ Rn is called V-closed if t ∈ T and v∈ V imply that either t+v∈ T or t-v ∈ T. The set P(V):=\Σv ∈ W v: W ⊂ V\ is clearly V-closed and so are its translates. We show, assuming V contains no parallel vectors, that if T is closed and V-closed, and x ∈ T is an extreme point of cl conv T, then there is a translate of P(V) containing x and contained in conv T. This result is used to determine the value of a special balancing game. A byproduct is that when m 2 and is not a power of 2, then the m-sets of a 2m-set can be coloured Red and Blue so that complementary m-sets have distinct colours and every point of the 2m-set is contained in the same number of Red and Blue sets.
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