On the numerical index of real Lp(μ)-spaces

Abstract

We give a lower bound for the numerical index of the real space Lp(μ) showing, in particular, that it is non-zero for p≠ 2. In other words, it is shown that for every bounded linear operator T on the real space Lp(μ), one has |∫ |x|p-1(x) T x dμ | : x∈ Lp(μ), \|x\|=1 ≥ Mp12\|T\| where Mp=t∈[0,1]|tp-1-t|1+tp>0 for every p≠ 2. It is also shown that for every bounded linear operator T on the real space Lp(μ), one has ∫ |x|p-1|Tx| dμ : x∈ Lp(μ), \|x\|=1 ≥ 12\|T\|.