Volume 25 , Issue 2 , PP: 93-116, 2025 | Cite this article as | XML | Html | PDF | Full Length Article
Aiyared Iampan 1 * , Murugan Palanikumar 2
Doi: https://doi.org/10.54216/IJNS.250209
We construct and analyze the concept of complex cubic anti neutrosophic subbisemiring (ComCANSBS). We analyze the important properties and homomorphic aspects of ComCANSBS. For bisemirings, we propose the ComCANSBS level sets. A complex neutrosophic subset of bisemiring Ⓢ is represented by the symbol Γ if and only if each non-empty level set R(℘,κ), where R) = |ℜ⊤Γ ·eiθ z}|{ℑ⊤Γ ,z}|{ℜ גΓ ·eiθz}|{ℑ גΓ ,z}|{ℜΓ ·eiθz}|{ℑΓ ,ℜ⊤Γ ·eiθℑ⊤Γ ,ℜ גΓ · eiθℑ גΓ,ℜΓ · eiθℑΓ ) is a ComCANSBS of Ⓢ. Let Υ be a ComCANSBS of bisemiring Ⓢ. If and only if Υ is a ComCANSBS of Ⓢ × Ⓢ, then Γ is a ComCANSBS of bisemiring Ⓢ. Let Γ be the strongest complex anti neutrosophic relation of bisemiring Ⓢ. We show that homomorphic images of all ComCANSBSs are ComCANSBSs, and homomorphic pre-images of all ComCANSBSs are ComCANSBSs. There are examples given to illustrate our results.
ComCANSBS , ComCNANSBS , SBS , homomorphism
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