Antipodal Hadwiger numbers of finite-dimensional Banach spaces

Abstract

Let X be a finite-dimensional Banach space; we introduce and investigate a natural generalization of the concepts of Hadwiger number H(X) and strict Hadwiger number H'(X). More precisely, we define the antipodal Hadwiger number Hα(X) as the largest cardinality of a subset S ⊂eq SX, such that ∀ x ≠ y ∈ S \,\,\, ∃ f ∈ BX* with \[1 f(x)-f(y) \,\,\, and \,\,\, f(y) f(z) f(x) \,\,\, for \,\,\, z ∈ S.\] The strict antipodal Hadwiger number H'α(X) is defined analogously. We prove that H'α(X)=4 for every Minkowski plane and estimate (or in some cases compute) the numbers Hα(X) and H'α(X), where X=pn, 1 < p +∞ and n 2. We also show that the number H'α(X) grows exponentially in X.