Matroid Partition Property and the Secretary Problem

Abstract

A matroid M on a set E of elements has the α-partition property, for some α>0, if it is possible to (randomly) construct a partition matroid P on (a subset of) elements of M such that every independent set of P is independent in M and for any weight function w:E≥ 0, the expected value of the optimum of the matroid secretary problem on P is at least an α-fraction of the optimum on M. We show that the complete binary matroid, Bd on F2d does not satisfy the α-partition property for any constant α>0 (independent of d). Furthermore, we refute a recent conjecture of B\'erczi, Schwarcz, and Yamaguchi by showing the same matroid is 2d/d-colorable but cannot be reduced to an α 2d/d-colorable partition matroid for any α that is sublinear in d.