The 2+1 convex hull of a finite set

Abstract

We study R2-separately convex hulls of finite sets of points in R3, as in KirchheimMullerSverak2003. This notion of convexity, which we call 2+1 convexity, corresponds to rank-one convex convexity, or quasiconvexity, when R3 is identified with certain subsets of matrices. We introduce '2+1 complexes', which generalize Tn constructions, define the '2+1-complex convex hull of a set', and prove that it is an inner approximation to the 2+1 convex hull. We also consider outer approximations to 2+1 convexity based in the locality theorem of rank convexity, by iteratively chopping off 'D-prisms'. For many finite sets, this procedure reaches a '2+1 K-complex' in a finite number of steps, and thus computes the 2+1 convex hull. We show examples of finite sets for which this procedure does not reach the 2+1 convex hull in a finite number of steps, but we show that there is always a sequence of outer approximations built with D-prisms that converges to a 2+1 K-complex. We conclude that Krc is always a '2+1 K-complex', which has interesting consequences.