Dunford--Pettis type properties and the Grothendieck property for function spaces

Abstract

For a Tychonoff space X, let Ck(X) and Cp(X) be the spaces of real-valued continuous functions C(X) on X endowed with the compact-open topology and the pointwise topology, respectively. If X is compact, the classic result of A.~Grothendieck states that Ck(X) has the Dunford-Pettis property and the sequential Dunford--Pettis property. We extend Grothendieck's result by showing that Ck(X) has both the Dunford-Pettis property and the sequential Dunford-Pettis property if X satisfies one of the following conditions: (i) X is a hemicompact space, (ii) X is a cosmic space (=a continuous image of a separable metrizable space), (iii) X is the ordinal space [0,) for some ordinal , or (vi) X is a locally compact paracompact space. We show that if X is a cosmic space, then Ck(X) has the Grothendieck property if and only if every functionally bounded subset of X is finite. We prove that Cp(X) has the Dunford--Pettis property and the sequential Dunford-Pettis property for every Tychonoff space X, and Cp(X) has the Grothendieck property if and only if every functionally bounded subset of X is finite.