Weak minimizing property and reflexivity

Abstract

For an operator T from X to Y denote m(T) the infimum of ||Tx|| on the unit sphere SX of X. A sequence (xn) in SX is said to be minimizing for T if ||Txn|| tends to m(T). In 2020 U. S. Chakraborty introduced and studied the following weak minimizing property (WmP): a pair (X,Y) of Banach spaces is said to have the WmP if, for every bounded linear operator T: X Y that admits a non-weakly null minimizing sequence, the function x \|Tx\| attains its minimum on the unit sphere. We present the following new results about the WmP for pairs of infinite-dimensional separable Banach spaces: (i) If (X,Y) has the WmP, then X is reflexive. (ii) If X is reflexive and Y does not contain isomorphic copies of X, then (X,Y) has the WmP. (iii) If X is reflexive and Y contains an isomorphic copy of X, then there is an equivalent norm on Y such that, for this equivalent norm, (X,Y) does not have the WmP. The first result extends to non-separable X if and only if X possesses a countable total set of functionals.