Contribution aux espaces de type de Stepanov-Orlicz. I (Q762725)

In Prace Mat 13, 267-274 (1970; Zbl 0234.46047), \textit{J. Musielak} and \textit{A. Waszak} introduced the notions of the uniformly bounded and equisplittable families of measures for studying comparison of some countably modular spaces. In this paper, I introduce some Orlicz function spaces with the modular of the form \[ (*)\quad (x(\cdot))=\sup_{s\in R}\{(I/\ell \int^{s+\ell}_{s}\phi (x(t))dt\}. \] on the linear space of all the functions x(\(\cdot)\), real valued, defined on the set of reals R and Lebesgue-measurable, \(\phi\) being a convex \(\phi\)-function (in Matuszewska sense) and \(\ell\), a real constant. I show that the modular (*) may be considered as defined by a family of measures. Then the results from J. Musielak and A. Waszak are very useful for studying comparison of such Orlicz spaces. These spaces will be very important in the theory of almost periodic functions.