MBJ-Neutrosophic WI Ideals in Lattice Wajsberg Algebra

V. S. N.; M. Babu; Kothuru Bhagya; M. Aruna; M.

doi:https://doi.org/10.54216/IJNS.230311

Full Length Article

Volume 23 • Issue 3 • PP: 131-139 • 2024

MBJ-Neutrosophic WI Ideals in Lattice Wajsberg Algebra

V. S. N. Malleswari ^1*

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,

M. Babu Prasad ²

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,

Kothuru Bhagya Lakshmi ³

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,

M. Aruna kumari ³

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,

M. Sireesha ⁴

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¹Department of Freshman Engineering, PVP Siddhartha Institute of Technology, Vijayawada, India

²Department of Freshmen Engineering, NRI Institute of Technology, Pothavarappadu, Vijayawada, India.

³Department of Mathematics, KKR&KSR Institute of Technology&Sciences, Guntur, India

⁴Department of Mathematics, RV Institute of Technology,Chebrolu, Guntur Dt, India

* Corresponding Author.

DOI https://doi.org/10.54216/IJNS.230311

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Received: August 25, 2023 Revised: November 17, 2023 Accepted: January 27, 2024

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Abstract

In this study, we introduce the concepts of MBJ-Neutrosophic WI-ideal and MBJ-Neutrosophic lattice ideal of lattice Wajsberg algebras. We demonstrate that every MBJ-Neutrosophic WI-ideal of lattice Wajsberg algebra is an MBJ-Neutrosophic lattice ideal of lattice Wajsberg algebra. Additionally, we talk about its opposite. Furthermore, we discover that in lattice H-Wajsberg algebra, every MBJ-Neutrosophic lattice ideal is an MBJ-Neutrosophic WI-ideal.

Keywords

Wajsberg algebra (WA) Lattice Wajsberg algebra(LWA) WI-ideal MBJ-Neutrosophic WI-ideal MBJ-Neutrosophic lattice ideal.

References

[1] Wajsberg. M:Beitragezum Metaaussagenkalkul l, Monat. Mat. phys. 42(1935) page 240.

[2] Rose.A and Rosser. J. B, Fragments of many valued statement calculi, Transaction of American Mathematical Society87,(1958), 1-53.

[3] Font. J. M, Rodriguez. A. J and Torrens. A, Wajsberg algebras, STOCHASTICA VolVIII, No 1, (1984), 5-31.

[4] L. A. Zadeh, Fuzzy sets, Inform. Control 8 (1965), 338-353.

[5] K.T.Atanassov, Intuitionistic fuzzy sets, Fuzzy Sets and Systems, 20(1) (1986) 87-96.

[6] K.T.Atanassov, New operations defined over the intuitionistic fuzzy sets, Fuzzy Sets and Systems, 61(2) (1994) 137-142.

[7] M. Basheer Ahamed, A. Ibrahim, Fuzzy implicative filters of Lattice Wajsberg algebras, Advances in Fuzzy Mathematics,6, 235-243 (2011)

[8] A.Ibrahim and C.Shajitha Begum, On WI-Ideals Of lattice Wajsberg algebras, Global Journal of Pure and Applied Mathematics, 13(10) (2017) 7237-7254.

[9] A.Ibrahim and C.Shajitha Begum, Fuzzy and normal fuzzy WI-ideals of lattice Wajsberg algebras, International Journal of Mathematical Archive, 8(11) (2017) 122-130.

[10] C.C.Chang, Algebraic analysis of many-valued logics, Transactions of the Am. Math. Soc., 88 (1958) 467- 490.

[11] C.C.Chang, A new proof of the completeness of the Lukasiewicz axioms, Transactions of the Am. Math. Soc., 93 (1959) 74-80.

[12] Y.B.Jun and K.H.Kim, Intuitionistic fuzzy ideals in BCK-algebras, Internat. J. Math. and Math. Sci., 24(12) (2000) 839-849.

[13] Y.B.Jun and C.H.Park, Ideals of PSEUDO MV- algebras based on vague set theory, Iranian Journal Of Fuzzy Systems, 6(2) (2009) 31-45.

[14] F. Smarandache (2003), Definition of Neutrosophic Logic – A Generalization of the Intuitionistic Fuzzy Logic, Proceedings of the Third Conference of the European Society for Fuzzy Logic and Technology, EUSFLAT 2003, September 10-12, 2003, Zittau, Germany; University of Applied Sciences at Zittau/Goerlitz, 141-146.

[15] F. Smarandache (2002a), A Unifying Field in Logics: Neutrosophic Logic, in MultipleValued Logic/An International journal,Vol.8, No.3, 385-438, 2002.

[16] F. Smarandache (2002b), Neutrosophy, A New Branch of Philosophy, in MultipleValued Logic / An International Journal, Vol. 8, No. 3, 297-384, 2002.

[17] M. Mohseni Takallo, R.A. Borzooei, Y.B. Jun, MBJ-neutrosophic structures and its applications in BCK/BCI-algebras, Neutrosophic sets and systems Vol. 23, 2018.

[18] M.Basheer Ahamed and A.Ibrahim, Anti fuzzy implicative filters in lattice W-algebras, International Journal of Computational Science and Mathematics, 4(1) (2012) 49-56.

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Malleswari, V. S. N., Prasad, M. Babu, Lakshmi, Kothuru Bhagya, kumari, M. Aruna, Sireesha, M.. "MBJ-Neutrosophic WI Ideals in Lattice Wajsberg Algebra." International Journal of Neutrosophic Science, vol. Volume 23, no. Issue 3, 2024, pp. 131-139. DOI: https://doi.org/10.54216/IJNS.230311

Malleswari, V., Prasad, M., Lakshmi, K., kumari, M., Sireesha, M. (2024). MBJ-Neutrosophic WI Ideals in Lattice Wajsberg Algebra. International Journal of Neutrosophic Science, Volume 23(Issue 3), 131-139. DOI: https://doi.org/10.54216/IJNS.230311

Malleswari, V. S. N., Prasad, M. Babu, Lakshmi, Kothuru Bhagya, kumari, M. Aruna, Sireesha, M.. "MBJ-Neutrosophic WI Ideals in Lattice Wajsberg Algebra." International Journal of Neutrosophic Science Volume 23, no. Issue 3 (2024): 131-139. DOI: https://doi.org/10.54216/IJNS.230311

Malleswari, V., Prasad, M., Lakshmi, K., kumari, M., Sireesha, M. (2024) 'MBJ-Neutrosophic WI Ideals in Lattice Wajsberg Algebra', International Journal of Neutrosophic Science, Volume 23(Issue 3), pp. 131-139. DOI: https://doi.org/10.54216/IJNS.230311

Malleswari V, Prasad M, Lakshmi K, kumari M, Sireesha M. MBJ-Neutrosophic WI Ideals in Lattice Wajsberg Algebra. International Journal of Neutrosophic Science. 2024;Volume 23(Issue 3):131-139. DOI: https://doi.org/10.54216/IJNS.230311

V. Malleswari, M. Prasad, K. Lakshmi, M. kumari, M. Sireesha, "MBJ-Neutrosophic WI Ideals in Lattice Wajsberg Algebra," International Journal of Neutrosophic Science, vol. Volume 23, no. Issue 3, pp. 131-139, 2024. DOI: https://doi.org/10.54216/IJNS.230311

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