{"id":1427,"date":"2022-11-20T15:20:54","date_gmt":"2022-11-20T15:20:54","guid":{"rendered":"https:\/\/ced.fst-usmba.ac.ma\/p\/mjaga\/?page_id=1427"},"modified":"2022-12-05T22:06:27","modified_gmt":"2022-12-05T22:06:27","slug":"relative-prime-resp-semiprime-ideals-with-applications-in-cx","status":"publish","type":"page","link":"https:\/\/ced.fst-usmba.ac.ma\/p\/mjaga\/relative-prime-resp-semiprime-ideals-with-applications-in-cx\/","title":{"rendered":"Relative prime (resp., semiprime) ideals with applications in C(X)"},"content":{"rendered":"\n<div style=\"height:77px\" aria-hidden=\"true\" class=\"wp-block-spacer\"><\/div>\n\n\n\n<div class=\"wp-block-columns is-layout-flex wp-container-core-columns-is-layout-9d6595d7 wp-block-columns-is-layout-flex\">\n<div class=\"wp-block-column is-layout-flow wp-block-column-is-layout-flow\">\n<div class=\"wp-block-columns is-layout-flex wp-container-core-columns-is-layout-9d6595d7 wp-block-columns-is-layout-flex\">\n<div class=\"wp-block-column is-layout-flow wp-block-column-is-layout-flow\"><\/div>\n\n\n\n<div class=\"wp-block-column is-layout-flow wp-block-column-is-layout-flow\" style=\"flex-basis:30%\">\n<figure class=\"wp-block-image size-full is-resized is-style-default\"><img loading=\"lazy\" decoding=\"async\" src=\"https:\/\/ced.fst-usmba.ac.ma\/p\/mjaga\/wp-content\/uploads\/2022\/03\/logovf-4.png\" alt=\"\" class=\"wp-image-752\" width=\"151\" height=\"201\"\/><\/figure>\n<\/div>\n\n\n\n<div class=\"wp-block-column is-layout-flow wp-block-column-is-layout-flow\" style=\"flex-basis:70%\">\n<p style=\"font-size:21px\"><strong>Moroccan    Journal of Algebra and Geometry with Applications<\/strong><\/p>\n\n\n\n<p><a href=\"https:\/\/ced.fst-usmba.ac.ma\/p\/mjaga\/moroccan-journal-of-algebra-and-geometry-with-applications-volume-1-issue-2-2022\/\" data-type=\"URL\" data-id=\"https:\/\/ced.fst-usmba.ac.ma\/p\/mjaga\/moroccan-journal-of-algebra-and-geometry-with-applications-volume-1-issue-2-2022\/\">Latest articles<\/a><\/p>\n<\/div>\n<\/div>\n<\/div>\n\n\n\n<div class=\"wp-block-column is-layout-flow wp-block-column-is-layout-flow\"><\/div>\n\n\n\n<div class=\"wp-block-column is-layout-flow wp-block-column-is-layout-flow\" style=\"flex-basis:14px\"><\/div>\n<\/div>\n\n\n\n<div class=\"wp-block-columns is-layout-flex wp-container-core-columns-is-layout-9d6595d7 wp-block-columns-is-layout-flex\">\n<div class=\"wp-block-column is-layout-flow wp-block-column-is-layout-flow\" style=\"flex-basis:100%\">\n<p class=\"has-text-align-center has-text-color has-huge-font-size\" style=\"color:#060182\"><em><strong>Relative prime (resp., semiprime) ideals with applications in C(X)<\/strong><\/em><\/p>\n<\/div>\n<\/div>\n\n\n\n<p><\/p>\n\n\n\n<p class=\"has-text-align-center\" style=\"font-size:18.5px\">Alireza Olfati and <strong>Ali Taherifar<\/strong> <i class=\"fas fa-envelope\"><\/i><br> Department of Mathematics, Yasouj University, Yasouj, Iran<br>Department of Mathematics, Yasouj University, Yasouj, Iran<\/p>\n\n\n\n<div style=\"height:35px\" aria-hidden=\"true\" class=\"wp-block-spacer\"><\/div>\n\n\n\n<p class=\"has-text-align-center has-text-color\" style=\"color:#232222;font-size:16px\"><span style=\"color:#626161\" class=\"color\">Pages 428-441 |  Received 20 August 2022,  Accepted 01 November 2022, Published 06 December 2022  <\/span><\/p>\n\n\n\n<div style=\"height:31px\" aria-hidden=\"true\" class=\"wp-block-spacer\"><\/div>\n\n\n\n<div class=\"wp-block-columns is-layout-flex wp-container-core-columns-is-layout-9d6595d7 wp-block-columns-is-layout-flex\">\n<div class=\"wp-block-column is-layout-flow wp-block-column-is-layout-flow\" style=\"flex-basis:25%\"><\/div>\n\n\n\n<div class=\"wp-block-column is-layout-flow wp-block-column-is-layout-flow\" style=\"flex-basis:250%\">\n<div style=\"height:51px\" aria-hidden=\"true\" class=\"wp-block-spacer\"><\/div>\n\n\n\n<p class=\"has-large-font-size\"><strong><span style=\"color:#060182\" class=\"color\">Abstract<\/span><\/strong><\/p>\n\n\n\n<p>Let <span class=\"katex-eq\" data-katex-display=\"false\">I<\/span> and <span class=\"katex-eq\" data-katex-display=\"false\">J<\/span> be two ideals in a commutative ring <span class=\"katex-eq\" data-katex-display=\"false\">R<\/span>. The ideal <span class=\"katex-eq\" data-katex-display=\"false\">I<\/span> is called <span class=\"katex-eq\" data-katex-display=\"false\">J<\/span>-prime (resp., <span class=\"katex-eq\" data-katex-display=\"false\">J<\/span>-semiprime) if <span class=\"katex-eq\" data-katex-display=\"false\">a,b \\in J<\/span> (resp., <span class=\"katex-eq\" data-katex-display=\"false\">a \\in J<\/span>) and <span class=\"katex-eq\" data-katex-display=\"false\">ab \\in I<\/span> (resp., <span class=\"katex-eq\" data-katex-display=\"false\">a^2 \\in I<\/span>) imply <span class=\"katex-eq\" data-katex-display=\"false\">a \\in I<\/span> or <span class=\"katex-eq\" data-katex-display=\"false\">b \\in I<\/span> (resp., <span class=\"katex-eq\" data-katex-display=\"false\">a \\in I<\/span>). Whenever <span class=\"katex-eq\" data-katex-display=\"false\">J \\nsubseteq I<\/span> and <span class=\"katex-eq\" data-katex-display=\"false\">I<\/span> is a <span class=\"katex-eq\" data-katex-display=\"false\">J<\/span>-prime (resp., <span class=\"katex-eq\" data-katex-display=\"false\">J<\/span>-semiprime) ideal, the ideal <span class=\"katex-eq\" data-katex-display=\"false\">I<\/span> is said to be a relative prime (resp., semiprime) ideal, and moreover, the ideal <span class=\"katex-eq\" data-katex-display=\"false\">J<\/span> is a p (resp., sp)-factor of <span class=\"katex-eq\" data-katex-display=\"false\">I<\/span>. The class of relative semiprime ideals includes relative z-ideals in any commutative ring and all nonessential ideals in reduced commutative rings. In this article, first we characterize some properties of these two classes of ideals in any commutative ring. Next, we apply the theory of relative prime (resp., semiprime)-ideals in the ring of continuous functions.<\/p>\n\n\n\n<p><\/p>\n\n\n\n<p class=\"has-small-font-size\"><span style=\"color:#060182\" class=\"color\"><strong>Keywords<\/strong>:<\/span>&nbsp; Relative z-ideal, prime ideal, F-space.                 <\/p>\n\n\n\n<p class=\"has-small-font-size\"><span style=\"color:#060182\" class=\"color\"><strong>MSC numbers<\/strong>:<\/span> Primary 13A15; Secondary 54C40.<\/p>\n\n\n\n<p class=\"has-small-font-size\"><strong>Downloads:<\/strong> <a href=\"https:\/\/ced.fst-usmba.ac.ma\/p\/mjaga\/wp-content\/uploads\/2022\/12\/0102MJAGA428_441.pdf\" data-type=\"URL\" data-id=\"https:\/\/ced.fst-usmba.ac.ma\/p\/mjaga\/wp-content\/uploads\/2022\/12\/0102MJAGA428_441.pdf\">Full-text PDF<\/a>                                <\/p>\n<\/div>\n\n\n\n<div class=\"wp-block-column is-layout-flow wp-block-column-is-layout-flow\" style=\"flex-basis:25%\"><\/div>\n<\/div>\n\n\n\n<div 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IranDepartment of Mathematics, Yasouj University, Yasouj, Iran Pages 428-441 | Received 20 August 2022, Accepted 01 November 2022, Published 06 December 2022 Abstract Let and <a class=\"read-more-link\" href=\"https:\/\/ced.fst-usmba.ac.ma\/p\/mjaga\/relative-prime-resp-semiprime-ideals-with-applications-in-cx\/\">Read 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