on ideals of ideals in $c(x)$

Authors

f. azarpanah

a‎. ‎r‎. ‎olfati

abstract

in this article‎, ‎we have characterized ideals in $c(x)$ in which‎ ‎every ideal is also an ideal (a $z$-ideal) of $c(x)$‎. ‎motivated by‎ ‎this characterization‎, ‎we observe that $c_infty(x)$ is a regular‎ ‎ring if and only if every open locally compact $sigma$-compact‎ ‎subset of $x$ is finite‎. ‎concerning prime ideals‎, ‎it is shown that‎ ‎the sum of every two prime (semiprime) ideals of each ideal in‎ ‎$c(x)$ is prime (semiprime) if and only if $x$ is an $f$-space‎. ‎concerning maximal ideals of an ideal‎, ‎we generalize the notion of‎ ‎separability to ideals and we have proved the coincidence of‎ ‎separability of an ideal with dense separability of a subspace of‎ ‎$beta x$‎. ‎finally, we have shown that the goldie dimension of an‎ ‎ideal $i$ in $c(x)$ coincide with the cellularity of‎ ‎$xsetminusdelta (i)$‎.

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Journal title:
bulletin of the iranian mathematical society

Publisher: iranian mathematical society (ims)

ISSN 1017-060X

volume 41

issue 1 2015

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