Narrow operators on vector-valued sup-normed spaces

Abstract

We characterise narrow and strong Daugavet operators on C(K,E)-spaces; these are in a way the largest sensible classes of operators for which the norm equation \|Id+T\| = 1+\|T\| is valid. For certain separable range spaces E including all finite-dimensional ones and locally uniformly convex ones we show that an unconditionally pointwise convergent sum of narrow operators on C(K,E) is narrow, which implies for instance the known result that these spaces do not have unconditional FDDs. In a different vein, we construct two narrow operators on C([0,1],1) whose sum is not narrow.

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