Research Article Open Access

On the Prime Radical of a Hypergroupoid

Gürsel Yeşilot

Abstract

In this study, we give definitions of a prime ideal, a s-semiprime ideal and a w-semiprime ideal for a hypergroupoid K. For an ideal A of K we show that radical of A (R(A)) can be represented as the intersection of all prime ideals of K containing A and we define a strongly A-nilpotent element. For any ideal A of K, we prove that R(A)=∩(s-semiprime ideals of K containing A)= ∩(w-semiprime ideals of K containing A)={strongly A nilpotent elements}. For an ideal B of K put B(o)=B and B(n+1)=(B(n))2. If a hypergroupoid K satisfies the ascending chain condition for ideals then (R(A))(n)⊆A for some n. For an ideal A of K we give a definition of right radical of A (R+(A)). If K is associative then R(A)=R+(A)=R_(A).

Journal of Mathematics and Statistics
Volume 1 No. 3, 2005, 234-238

DOI: https://doi.org/10.3844/jmssp.2005.234.238

Published On: 30 September 2005

How to Cite: Yeşilot, G. (2005). On the Prime Radical of a Hypergroupoid. Journal of Mathematics and Statistics, 1(3), 234-238. https://doi.org/10.3844/jmssp.2005.234.238

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Keywords

  • Hypergroupoids
  • s-semiprime ideal
  • w-semiprime ideal
  • ascending chain