A permanence property for dominated multilinear operators (Q2180882)

The Banach space of all unconditionally norm convergent series is denoted by \(\ell _{1}\left[ X\right]\). If \(1\leq q_{1},\dots,q_{k}<\infty \) are such that \(1/q_{1}+\dots+1/q_{k}\leq 1\) and \(1\leq q<\infty \) with \(1/q=1/q_{1}+\dots+1/q_{k}\) then the \((q_{1},\dots,q_{k})\)-dominated \(k\)-linear operator \(T:X_{1}\times\dots\times X_{k}\longrightarrow Y\) induces the bounded \(k\)-linear operator \(M_{T}\) defined from \(\omega_{q_{1}}(X_{1})\times\dots\times \omega _{q_{k}}(X_{k})\) to\(\ \ell _{q}(Y)\) by \(M_{T}((x_{n}^{1}),\dots,(x_{n}^{k}))=\left( T(x_{n}^{1},\dots,x_{n}^{k})\right) _{n}\). In the present paper, the author shows that, if \(T\) is \((q_{1},\dots,q_{k})\)-dominated (with \(2\leq q_{1},\dots,q_{k}<\infty \) ), then \(M_{T}:\ell _{1}\left[X_{1}\right] \times\dots\times \ell _{1}\left[ X_{k}\right] \longrightarrow \ell _{q}(Y)\) is \((q_{1},\dots,q_{k})\)-dominated with the same ideal norm. Also, a multilinear variant of a Gluskin-Kislyakov-Reinov type result is given.