Remarks on bounded operators in $\ell$-K\"othe spaces

Ersin K{\i}zgut; Elif Uyan{\i}k; and Murat Yurdakul

arXiv:1604.05298·math.FA·May 3, 2016

Remarks on bounded operators in $\ell$-K\"othe spaces

Ersin K{\i}zgut, Elif Uyan{\i}k, and Murat Yurdakul

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Abstract

For locally convex spaces $X$ and $Y$ , the continuous linear map $T : X \to Y$ is said to be bounded if it maps zero neighborhoods of $X$ into bounded sets of $Y$ . We denote $(X, Y) \in B$ when every operator between $X$ and $Y$ is bounded. For a Banach space $ℓ$ with a monotone norm $∥ \cdot ∥$ in which the canonical system $(e_{n})$ forms an unconditional basis, we consider $ℓ$ -K\"othe spaces as a generalization of usual K\"othe spaces. In this note, we characterize $ℓ$ -K\"othe spaces $ℓ (a_{p n})$ and $ℓ (b_{s m})$ such that $(ℓ (a_{p n}), ℓ (b_{s m})) \in B$ . A pair $(X, Y)$ is said to have the bounded factorization property, and denoted $(X, Y) \in B F$ , if each linear continuous operator $T : X \to X$ that factors over $Y$ is bounded. We also prove that injective tensor products of some classical K\"othe spaces have bounded factorization property.

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TopicsAdvanced Banach Space Theory · Advanced Operator Algebra Research · Advanced Topics in Algebra