A counterexample for the Daugavet index of thickness in 1-sums

Abstract

We give a negative answer to a question of Haller-Langemets-Lima-Nadel-Rueda Zoca asking whether, for all Banach spaces X and Y, the Daugavet index of thickness satisfies \[ T(X1 Y)=\T(X),T(Y)\. \] We show that this equality does hold whenever one of the two summands has the Daugavet property. On the other hand, if D is a Banach space with the Daugavet property and N is a suitable absolute norm, then for X=DN D, one has T(X1 X)<T(X).

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