The theorems of Caratheodory and Gluskin for 0<p<1
Abstract
In this note we investigate some aspects of the local structure of finite dimensional p-Banach spaces. The well known theorem of Gluskin gives a sharp lower bound of the diameter of the Minkowski compactum. In [Gl] it is proved that diam( Mn1)≥ cn for some absolute constant c. Our purpose is to study this problem in the p-convex setting. In [Pe], T. Peck gave an upper bound of the diameter of Mnp, the class of all n-dimensional p-normed spaces, namely, diam( Mnp)≤ n2/p-1. We will show that such bound is optimum.
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