Topological duals of some paranormed sequence spaces (Q1415067)

Summary: Let \(P=(p_{k})\) be a bounded positive sequence and let \(A=(a_{nk})\) be an infinite matrix with all \(a_{nk}\geq 0\). For normed spaces \(E\) and \(E_{k}\), the matrix \(A\) generates the paranormed sequence spaces \([A,P]_{\infty}((E_{k}))\), \([A,P]_{0}((E_{k}))\), and \([A,P]((E))\), which generalise almost all the well-known sequence spaces such as \(c_{0}\), \(c\), \(l_{p}\), \(l_{\infty}\), and \(w_{p}\). In this paper, topological duals of these paranormed sequence spaces are constructed and general representation formulae for their bounded linear functionals are obtained in some special cases of the matrix \(A\).