The Daugavet property and translation-invariant subspaces

Abstract

Let G be an infinite, compact abelian group and let be a subset of its dual group . We study the question which spaces of the form C(G) or L1(G) and which quotients of the form C(G)/C(G) or L1(G)/L1(G) have the Daugavet property. We show that C(G) is a rich subspace of C(G) if and only if -1 is a semi-Riesz set. If L1(G) is a rich subspace of L1(G), then C(G) is a rich subspace of C(G) as well. Concerning quotients, we prove that C(G)/C(G) has the Daugavet property, if is a Rosenthal set, and that L1(G) is a poor subspace of L1(G), if is a nicely placed Riesz set.