Sets of unit vectors with small subset sums

Abstract

We say that a family xi|i∈[m] of vectors in a Banach space X satisfies the k-collapsing condition if |Σi∈ Ixi|≤ 1 for all k-element subsets I⊂eq1,2,...,m. Let C(k,d) denote the maximum cardinality of a k-collapsing family of unit vectors in a d Banach space, where the maximum is taken over all spaces of dimension d. Similarly, let CB(k,d) denote the maximum cardinality if we require in addition that Σi=1m xi=o. The case k=2 was considered by F\"uredi, Lagarias and Morgan (1991). These conditions originate in a theorem of Lawlor and Morgan (1994) on geometric shortest networks in smooth finite-dimensional Banach spaces. We show that CB(k,d)=k+1,2d for all k,d≥ 2. The behaviour of C(k,d) is not as simple, and we derive various upper and lower bounds for various ranges of k and d. These include the exact values C(k,d)=k+1,2d in certain cases. We use a variety of tools from graph theory, convexity and linear algebra in the proofs: in particular the Hajnal-Szemer\'edi Theorem, the Brunn-Minkowski inequality, and lower bounds for the rank of a perturbation of the identity matrix.