On the S-spectrum of Krasner hypermodules

Authors

  • Yıldız Aydın Department of Management and Information Systems, İstanbul Gelişim University, Turkey
  • Burcu Nişancı Türkmen Department of Mathematics, Amasya University, Turkey

DOI:

https://doi.org/10.3842/umzh.v77i10.8348

Keywords:

Commutative hyperring, S-prime spectrum, S-Zariski topology.

Abstract

UDC 512.5

We study S-prime hyperideals by relating them to prime hyperideals. The S-prime hyperideals are studied in the hyperfield of fractions in the Krasner hyperring. The characterization of S-prime hyperideals is determined under a strong homomorphism. With the help of strong epimorphisms, the conditions for one-to-one correspondence between the S-prime hyperideals in the hyperring and S-prime hyperideals in the hyperfield of fractions of these hyperrings are investigated. The concept of S-prime subhypermodules of Krasner hypermodules is introduced. In particular, the S-spectrum ${\rm Spec}_{S}$ of the S-Zariski topology is obtained, which is based on the element of S-prime subhypermodules of a class of these hypermodules. Moreover, characterizations of S-prime subhypermodules are given in the perspective of the S-spectrum.

References

The full version of this paper will be published in Ukrainian Mathematical Journal, Vol. 77, No. 10, 2025.

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Published

30.09.2025

Issue

Vol. 77 No. 10 (2025)

Section

Research articles

License

Copyright (c) 2025 Yıldız Aydın, Burcu Nişancı Türkmen

Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.

How to Cite

Aydın, Yıldız, and Burcu Nişancı Türkmen. “On the S-Spectrum of Krasner Hypermodules”. Ukrains’kyi Matematychnyi Zhurnal, vol. 77, no. 10, Sept. 2025, pp. 640–641, https://doi.org/10.3842/umzh.v77i10.8348.