Simplicial and Conical Decomposition of Positively Spanning Sets

Abstract

We investigate the decomposition of a set X, which positively spans the Euclidean space Rd into a set of minimal positive bases, we call simplices, and into maximal sets positively spanning pointed cones, i.e. cones with exactly one apex. For any set X, let S(X) denote the set of simplex subsets of X, and let (X) denote the linear hull of X. The set X is said to fulfill the factorisation condition if and only if for each subset Y⊂ X and each simplex S∈S(X), (Y)(S) = (Y S). We demonstrate that X is a positive basis if and only if it is the union of most d simplices, and X satisfies the factorization condition. In this case, X contains a linear basis B such that each simplex in S(X) has with B, all but one exactly one element in common. We show that for sets positively spanning Rd, the set of subbases of X forms a boolean lattice, which can be embedded into the set 2S(X), with isomorphy for positive bases. Our second main result depending on the former is as follows. A finite set X⊂Rd\0\ can be written as the union of at most 2d maximal sets spanning pointed cones, which, if X is a positive basis, are tantamount to frames of the cones. The inequality holds sharply if and only if X is a cross, that is, a union of 1-simplices derived from a linear basis of Rd. We also show that there can be at the most 2d maximal subsets of X spanning pointed cones, when intersections of two of them do not span a set of full dimension.