Abstract
Let l be a Banach sequence space with a monotone norm in which the canonical system (e_{n}) is an unconditional basis. We show that if there exists a continuous linear unbounded operator between l-K\{o}the spaces, then there exists a continuous unbounded quasi-diagonal operator between them. Using this result, we study in terms of corresponding K\{o}the matrices when every continuous linear operator between l-K\{o}the spaces is bounded. As an application, we observe that the existence of an unbounded operator between l-K\{o}the spaces, under a splitting condition, causes the existence of a common basic subspace.
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