The behaviour of transformations on sequence spaces (Q792578)

Notation is taken from \textit{P. K. Kamthan} and \textit{M. Gupta}, Sequence spaces and series, (1981; Zbl 0447.46002). Let \(\lambda\),\(\mu\) be sequence spaces with their normal topology, \(T=[a_{ij}]:\lambda \to \mu\) a matrix transformation. T is defined to be simply bounded if there exists a zero neighbourhood U in \(\lambda\) such that T(U) is a simple bounded set; further, for any sequence space \(\delta\) the notion of a \(\delta\)-nuclear map between locally convex spaces is introduced. Results: The simple boundedness of T is characterized in case \(\mu\) is normal; a characterization of the \(\delta\)-nuclearity of T is given in case \(\delta =\mu^{xx}\) and \(\lambda\) is monotone. As a corollary the following is obtained: If \(\lambda\) is monotone and \(\mu\) is normal and simple, then T is \(\mu\)-nuclear if and only if T is simply bounded.