Packings in classical Banach spaces

Abstract

We obtain several new results on the simultaneous packing and covering constant γ(X) of a Banach space X, and its lattice counterpart γ*(X). These constants measure how efficient a (lattice) packing by unit balls in X can be, the optimal case being that γ(X)= 1 and the worst that γ(X)= 2. Our first main result is that γ(X)> 1 whenever BX admits a LUR point, which leads us to a negative answer to a question of Swanepoel. We also develop general methods to compute these constants for a large class of spaces. As a sample of our findings: (i) γ*(X)= 1 when X is a separable octahedral Banach space, or X= C(K), where K is zero-dimensional; (ii) γ(p()r X)= γ*(p()r X)= 221/p, whenever dens(X)< and 1≤ r≤ p< ∞; (iii) γ(Lp(μ))= γ*(Lp(μ))= 221/p for 1≤ p≤ 2 and every measure μ; (iv) there exist reflexive (resp. octahedral) Banach spaces X with γ(X)= 2. We leave a large area open for further research and we indicate several possible directions.