In computational geometry, a point p in a finite set of points S is said to be maximal or non-dominated if there is no other point q in S whose coordinates are all greater than or equal to the corresponding coordinates of p. The maxima of a point set S are all the maximal points of S. The problem of finding all maximal points, sometimes called the problem of the maxima or maxima set problem, has been studied as a variant of the convex hull and orthogonal convex hull problems. It is equivalent to finding the Pareto frontier of a collection of points, and was called the floating-currency problem by Herbert Freeman based on an application involving comparing the relative wealth of individuals with different holdings of multiple currencies.[1]
- ^ Preparata, Franco P.; Shamos, Michael Ian (1985), "Section 4.1.3: The problem of the maxima of a point set", Computational Geometry: An Introduction, Texts and Monographs in Computer Science, Springer-Verlag, pp. 157–166, ISBN 0-387-96131-3.