A necessary and sufficient condition for k-transversals

Abstract

We solve a long-standing open problem posed by Goodman \& Pollack in 1988 by establishing a necessary and sufficient condition for a family of convex sets in Rd to admit a k-transversal for any 0 k d-1. This result is a common generalization of Helly's theorem (k=0) and the Goodman-Pollack-Wenger theorem (k=d-1). Additionally, we obtain an analogue in the complex setting by characterizing the existence of a complex k-transversal to a family of convex sets in Cd, extending the work of McGinnis (k=d-1). Our approach is topological and employs a Borsuk-Ulam-type theorem on Stiefel manifolds. Finally, we demonstrate how our results imply the central transversal theorems of Zivaljevi\'c-Vre\'cica and Dol'nikov in the real case and of Sadovek-Sober\'on in the complex case.

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