L- and M-weakly compact multilinear operators and their linear adjoints
Abstract
Let X1, …, Xm be Banach spaces and let E1, …, Em,F be Banach lattices. Our main results read as follows: (i) The linear adjoint A* of a continuous multilinear operator A X1 × ·s × Xm F is M-weakly compact if and only if A is L-weakly compact. (ii) The linear adjoint A* of a multilinear operator of order bounded variation A E1 × ·s × Em F is L-weakly compact if and only if the linearization of A on the positive projective tensor product is M-weakly compact. In our way to prove these results, we develop the basic theory of linear adjoints of multilinear operators between Riesz spaces, we prove that multilinear operators of order bounded variation between Banach lattices are continuous, and we explore different notions of multilinear operators of M-weakly compact-type.
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