Contribution aux espaces denombrablement modulaires. Complétude des espaces généralisés \(X_{\rho},X_{\rho _ o}\) et \(X_{\rho _ s}\) (Q762726)

In [Stud. Math. 31, 331-337 (1968; Zbl 0179.174)], \textit{J. Albrycht} and \textit{J. Musielak} introduced and studied comparison of countably modular spaces \(X_{\rho}\) and \(X_{\rho_ o}\), defined, on a linear space of functions x(\(\cdot)\), by modulars \(\rho (x(\cdot))=\sum^{\infty}_{i=1}\frac{1}{2^ i}\frac{\rho_ i(x(\cdot))}{1+\rho_ i(x(\cdot))}\) and, respectively, \(\rho_ o(x(\cdot))=\sup_{i}\rho_ i(x(\cdot))\), where \((\rho_ i)\) is a sequence of modulars, on X, of the form \[ (*)\quad \rho_ i(x(\cdot))=\int_{T}\phi_ i(x(t))d\mu (t), \] each \(\phi_ i\) being a convex \(\phi\)-function (in Matuszewska sense) and \(\mu\) a non negative measure. In Proc. Mat. 13, 267-274 (1970; Zbl 0234.46047). \textit{J. Musielak} and \textit{A. Waszak} introduced the new countably modular space X by the modular \(\rho_ s(x(\cdot))=\sum^{\infty}_{i=1}\rho_ i(x(\cdot))\) where each \(\rho_ i\) is given by (*) and extended the preceding results on countably modular spaces considering \(\mu\) as a family of measures. In a preceding paper I have examined the comparison of countably modular spaces by replacing (*) by one of the relations \[ \rho_ i(x(\cdot))=\int_{T}\phi_ i(x(t),t)\quad d\mu (t),\quad \rho_ i(x(\cdot))=\sup_{s\in S}\int_{T}\phi_ i(x(t),t)d\mu (t), \] where \((u,t)\to \phi_ i(u,t)\) is a convex \(\phi\)-function depending on a parameter \(t\in T\) (in Musielak-Orlicz sense) and \((\mu_ s)_{s\in S}^ a \)family of measures. In this paper, I have studied the modular completeness of such countably modular spaces.