Convex hulls of curves in n-space

Abstract

Let K⊂eq Rn be a convex semialgebraic set. The semidefinite extension degree sxdeg(K) of K is the smallest number d such that K is a linear image of an intersection of finitely many spectrahedra, each of which is described by a linear matrix inequality of size d. This invariant can be considered to be a measure for the intrinsic complexity of semidefinite optimization over the set K. For an arbitrary semialgebraic set S⊂eq Rn of dimension one, our main result states that the closed convex hull K of S satisfies sxdeg(K)1+ n2. This bound is best possible in several ways. Before, the result was known for n=2, and also for general n in the case where S is a monomial curve.

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