Remarks on bounded operators in -K\"othe spaces

Abstract

For locally convex spaces X and Y, the continuous linear map T:X Y is said to be bounded if it maps zero neighborhoods of X into bounded sets of Y. We denote (X,Y) ∈ B when every operator between X and Y is bounded. For a Banach space with a monotone norm \|·\| in which the canonical system (en) forms an unconditional basis, we consider -K\"othe spaces as a generalization of usual K\"othe spaces. In this note, we characterize -K\"othe spaces (apn) and (bsm) such that ((apn), (bsm)) ∈ B. A pair (X,Y) is said to have the bounded factorization property, and denoted (X,Y) ∈ BF, if each linear continuous operator T : X X that factors over Y is bounded. We also prove that injective tensor products of some classical K\"othe spaces have bounded factorization property.