Hahn-Banach type extension theorems on p-operator spaces

Abstract

Let V⊂eq W be two operator spaces. Arveson-Wittstock-Hahn-Banach theorem asserts that every completely contractive map :V B(H) has a completely contractive extension :W B(H), where B(H) denotes the space of all bounded operators from a Hilbert space H to itself. In this paper, we show that this is not in general true for p-operator spaces, that is, we show that there are p-operator spaces V⊂eq W, an SQp space E, and a p-completely contractive map :V B(E) such that does not extend to a p-completely contractive map on W. Restricting E to Lp spaces, we also consider a condition on W under which every completely contractive map :V B(Lp(μ)) has a completely contractive extension :W B(Lp(μ)).