Abstract
Abstract
We prove that the set of elementary tensors is weakly closed in the projective tensor product of two Banach spaces. As a result, we answer a question of Rodríguez and Rueda Zoca [‘Weak precompactness in projective tensor products’, Indag. Math. (N.S.)35(1) (2024), 60–75], proving that if
$(x_n) \subset X$
and
$(y_n) \subset Y$
are two weakly null sequences such that
$(x_n \otimes y_n)$
converges weakly in
$X \widehat {\otimes }_\pi Y$
, then
$(x_n \otimes y_n)$
is also weakly null.
Publisher
Cambridge University Press (CUP)