A Characterization of the Realizable Matousek Unique Sink Orientations

Abstract

The Matousek LP-type problems were used by Matousek to show that the Sharir-Welzl algorithm may require at least subexponential time. Later, G\"artner translated this result into the language of Unique Sink Orientations (USOs) and introduced the Matousek USOs, the USOs equivalent to Matousek's LP-type problems. He further showed that the Random Facet algorithm only requires quadratic time on the realizable subset of the Matousek USOs, but without characterizing this subset. In this paper, we deliver this missing characterization and also provide concrete realizations for all realizable Matousek USOs. Furthermore, we show that the realizable Matousek USOs are exactly the orientations arising from simple extensions of cyclic-P-matroids.