A Note on Norine's Antipodal-Colouring Conjecture
Abstract
Norine's antipodal-colouring conjecture, in a form given by Feder and Subi, asserts that whenever the edges of the discrete cube are 2-coloured there must exist a path between two opposite vertices along which there is at most one colour change. The best bound to date was that there must exist such a path with at most n/2 colour changes. Our aim in this note is to improve this upper bound to (38+o(1))n.
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