m-TOPOLOGY ON THE RING OF REAL-MEASURABLE FUNCTIONS
(ندگان)پدیدآور
Yousefpour, H.Estaji, A. A.Mahmoudi Darghadam, A.Sadeghi, Gh.نوع مدرک
TextOriginal Manuscript
زبان مدرک
Englishچکیده
In this article we consider the $m$-topology on linebreak $M(X,mathscr{A})$, the ring of all real measurable functions on a measurable space $(X, mathscr{A})$, and we denote it by $M_m(X,mathscr{A})$. We show that $M_m(X,mathscr{A})$ is a Hausdorff regular topological ring, moreover we prove that if $(X, mathscr{A})$ is a $T$-measurable space and $X$ is a finite set with $|X|=n$, then $M_m(X,mathscr{A})cong mathbb R^n$ as topological rings. Also, we show that $M_m(X,mathscr{A})$ is never a pseudocompact space and it is also never a countably compact space. We prove that $(X,mathscr{A})$ is a pseudocompact measurable space, if and only if $ {M}_{m}(X,mathscr{A})= {M}_{u}(X,mathscr{A})$, if and only if $ M_m(X,mathscr{A}) $ is a first countable topological space, if and only if $M_m(X,mathscr{A})$ is a connected space, if and only if $M_m(X,mathscr{A})$ is a locally connected space, if and only if $M^*(X,mathscr{A})$ is a connected subset of $M_m(X,mathscr{A})$.
کلید واژگان
m-topologymeasurable space
pseudocompact measurable space
connected space
first countable topological space
شماره نشریه
1تاریخ نشر
2021-09-011400-06-10
ناشر
Shahrood University of Technologyسازمان پدید آورنده
Faculty of Mathematics and Computer Sciences, Hakim Sabzevari University, Sabzevar, Iran.Faculty of Mathematics and Computer Sciences, Hakim Sabzevari University, Sabzevar, Iran.
Faculty of Mathematics and Computer Sciences, Hakim Sabzevari University, Sabzevar, Iran.
Faculty of Mathematics and Computer Sciences, Hakim Sabzevari University, Sabzevar, Iran.
شاپا
2345-51282345-511X