Bicolored point sets admitting non-crossing alternating Hamiltonian paths

Abstract

Consider a bicolored point set P in general position in the plane consisting of n blue and n red points. We show that if a subset of the red points forms the vertices of a convex polygon separating the blue points, lying inside the polygon, from the remaining red points, lying outside the polygon, then the points of P can be connected by non-crossing straight-line segments so that the resulting graph is a properly colored closed Hamiltonian path.

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