Quotients of Banach spaces with the Daugavet property

Abstract

We consider a general concept of Daugavet property with respect to a norming subspace. This concept covers both the usual Daugavet property and its weak* analogue. We introduce and study analogues for narrow operators and rich subspaces in this general setting and apply the results to show that a quotient of L1[0,1] over an 1-subspace can fail the Daugavet property. The latter answers a question posed to us by A. Pelczynski in the negative.