A study on state spaces in classical Banach spaces

Abstract

Let X be a real or complex Banach space. Let S(X) denote the unit sphere of X. For x∈ S(X), let Sx=\x*∈ S(X*):x*(x)=1\. A lot of Banach space geometry can be determined by the `quantum' of the state space Sx. In this paper, we mainly study the norm compactness and weak compactness of the state space in the space of Bochner integrable function and c0-direct sums of Banach spaces. Suppose X is such that X* is separable and let μ be the Lebesgue measure on [0,1]. For f∈ L1(μ,X), we demonstrate that if Sf is norm compact, then f is a smooth point. When μ is the discrete measure, we show that if (xi) ∈ S(1(X)) and \|xi\|≠ 0 for all i∈N, then S(xi) is weakly compact in ∞(X*) if and only if Sxi\|xi\| is weakly compact in X* for each i∈N and diam(Sxi\|xi\|) 0 . For discrete c0-sums, we show that for (xi)∈ c0(X), S(xi) is weakly compact if and only if for each i0∈ N such that \|xi0\|=1, the state space Sxi0 is weakly compact.