On the complexity of the set of unconditional convex bodies
Abstract
We show that for any t>1, the set of unconditional convex bodies in Rn contains a t-separated subset of cardinality at least (C(t) n). This implies that there exists an unconditional convex body in Rn which cannot be approximated within the distance d by a projection of a polytope with N faces unless N > (c(d)n). We also show that for t>2, the cardinality of a t-separated set of completely symmetric bodies in Rn does not exceed (c(t) 2 n).
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