Domain of generalized difference matrix \(B(r,s)\) on some Maddox's spaces (Q2861323)

Let \(p=\{p_{k}\}\in l^{\infty }\) with \(p_{k}>0\) and let \(r,s\) be non-zero real numbers. Set \(M=\max \{1,\left\| p\right\| _{\infty }\}\). In [Q. J. Math., Oxf. II. Ser. 18, 345--355 (1967; Zbl 0156.06602)], \textit{I. J. Maddox} introduced the sequence space \(l^{\infty }(p)=\{x:\sup \left| x_{k}\right| ^{p_{k}}<\infty \}\). The authors define a related space \(\widehat{l^{\infty }}(p)=\{x:\sup \left| sx_{k-1}+rx_{k}\right|^{p_{k}}<\infty \}\) which they equip with the paranorm \(g(x)=\sup \left| sx_{k-1}+rx_{k}\right| ^{p_{k}/M}\). The authors show that this defines a complete paranormed space which is isomorphic to \(l^{\infty }(p)\) with its paranorm. The authors compute the \(\beta \)- and \(\gamma \)-duals of this space and give a characterization of the matrix maps from this space into \(l^{\infty }\), \(c\) and \(c_{0}\). Maddox [loc.\,cit.]\ also defined the spaces \(c(p)\) and \(c_{0}(p)\), and the authors define related spaces as above and establish similar results for these spaces.