JB*-triples occur in the study of bounded symmetric domains in several complex variables and in the study of contractive projections on C*-algebras. These spaces are equipped with a ternary product o:, :, :q, the Jordan triple product, and are essentially geometric objects in that the linear isometries between them are exactly the linear bijections preserving the Jordan triple product (cf.[23]).A JB*-triple is a complex Banach space and its open unit ball admits many biholomorphic automorphisms, which play a fundamental role in the theory of JB*-triples and bounded symmetric domains. In fact, a Banach space is a JB*-triple if, and only if, the biholomorphic automorphisms of its open unit ball act transitively [23]. Recently, Isidro and Kaup [22] studied the question of when these holomorphic automorphisms are weakly continuous, and a notion of weakly continuous JB*-triples was introduced in [24]. The weak continuity of these automorphisms turns out to be closely related to a well-known Banach property, namely the Dunford-Pettis property (which will be recalled below). Indeed, using [22] one can show that a JB*-triple with a unitary tripotent has the Dunford-Pettis property if, and only if, every biholomorphic automorphism of its open unit ball is sequentially weakly continuous in the sense that it preserves weak convergence of sequences (see Proposition 8 below). It is therefore of interest to know which JB*-triples have the Dunford-Pettis property.In this paper, we characterise JB*-triples having the Dunford-Pettis property. We show that, among other results, a JB*-triple Z has the Dunford-Pettis property if, and only if, for every weakly null sequence (z n ) in Z, the sequence (oz n , z n , zq) is also weakly null for all z ? Z**. It follows that the Dunford-Pettis property is inherited by subtriples and that a JBW*-triple W has the Dunford-Pettis property if, and only if, W is an l _ -sum G α L _ (Ω α , µ α , C α ), where C α is a Cartan factor and sup α dim C α _.We also show that the predual WJ has the Dunford-Pettis property if, and only if, W l l _ -sum G α L _ (Ω α , µ α , C α ) with dim C α _ for all α. These results subsume those in [5, 9, 10].
Dunford-Pettis property and weak continuity of automorphismsLet C(X ) be the Banach space of continuous functions on a compact Hausdorff space X. It is a celebrated result of Grothendieck [15] that every weakly compact linear operator on C(X ) is completely continuous. He called this property of C(X ) the Dunford-Pettis property (DPP for short) referring, of course, to an earlier result of Dunford and Pettis [13] that L " -spaces enjoy the same property. Grothendieck [15] has also shown that a Banach space E has DPP if, and only if, whenever (x n ) and
