Some isomorphically polyhedral Orlicz sequence spaces
Abstract
A Banach space is polyhedral if the unit ball of each of its finite dimensional subspaces is a polyhedron. It is known that a polyhedral Banach space has a separable dual and is c0-saturated, i.e., each closed infinite dimensional subspace contains an isomorph of c0. In this paper, we show that the Orlicz sequence space hM is isomorphic to a polyhedral Banach space if t 0M(Kt)/M(t) = ∞ for some K < ∞. We also construct an Orlicz sequence space hM which is c0-saturated, but which is not isomorphic to any polyhedral Banach space. This shows that being c0-saturated and having a separable dual are not sufficient for a Banach space to be isomorphic to a polyhedral Banach space.
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