Interval valued anti-fuzzy soft subhemiring of a hemiring
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DOI:
https://doi.org/10.26637/MJM0601/0028Abstract
In this paper, we have studied the various operations of interval valued anti fuzzy soft subhemirings of a hemiring to establish their basic properties. We have discussed different algebraic structures of interval valued anti-fuzzy soft subhemirings of a hemiring under the restricted and extended operations. Product and strongest relation have also been made in order to give a complete overview of these structures.
Keywords:
Interval valued anti-fuzzy soft subhemiring of a hemiring, product of Interval valued anti-fuzzy soft subhemiring of a hemiring, strongest relation of Interval valued anti-fuzzy soft subhemiring of a hemiringMathematics Subject Classification:
Mathematics- Pages: 236-241
- Date Published: 01-01-2018
- Vol. 6 No. 01 (2018): Malaya Journal of Matematik (MJM)
M. Akram and K.H.Dar On fuzzy d-algebras, Punjab University Journal of Mathematics, 37, 61$76(2005)$.
Azriel Rosenfeld, Fuzzy Groups, Journal of Mathematical Analysis and Applications, 35, 512-517 (1971).
$mathrm{K}$. Atanassov, Operators over interval valued intuitionistic fuzzy sets, Fuzzy Sets and Systems, 64 (1994) $159-174$.
R. Biswas, Fuzzy subgroups and anti-fuzzy subgroups, Fuzzy Sets and Systems, 35(1990), 121-124.
M. Borah, T. J. Neog and D. K. Sut, A study on some operations of fuzzy soft sets, International Journal of Modern Engineering Research (IJMER), 2(2)(2012), 219-225.
D. Chen, E. C. C. Tsang, D. S. Yeung and X. Wang, The parameterization reduction of soft sets and its applications, Comput. Math. Appl. 49 (2005) 757763.
F. Feng, C. Li, B. Davvaz and M. I. Ali, Soft sets combined with fuzzy sets and Rough sets, tentative Approach, Soft Computing, 14(2010), 899-911.
Kumud Borgohain and Chittaranjan Gohain, Some New operations on Fuzzy Soft Sets, International Journal of Modern Engineering Research (IJMER), $4(4)(2014), 65-68$
P. K. Maji, R. Biswas and A.R. Roy, Fuzzy soft sets, The J. Fuzzy Math., 9(2001), 589-602.
P. K. Maji, A. R. Roy and R. Biswas, An application of soft sets in decision making problem, Comput. Math. Appl., 44 (8-9) (2002).
P. K. Maji, R. Biswas and A. R. Roy Soft set theory, Comput. Math. Appl., 45 (2003) 555-562.
D. Molodtsov, Soft set theory results, Comput. Math. Appl., 37 (4-5) (1999), 19-31.
T. J. Neog and D. K. Sut, On Union and Intersection of Fuzzy Soft Sets, Int.J. Comp. Tec. Appl., 2 (5) $1160-1176$.
Osman kazanci, sultan yamark and serife yilmaz On intuitionistic fuzzy - Subgroups of near rings,International Mathematical Forum, $2(59)(2001), 2899-2910$.
A. Sezgin and A. O. Atagun, on operations of soft sets, Comput. Math. Appl., 61 (2011), 1467-1475.
A. Solairaju and R.Nagarajan, Charactarization of interval valued Anti fuzzy Left h-ideals over Hemirings, Advances in Fuzzy Mathematics, 4(2), 129$136(2006)$.
A. Solairaju and R.Nagarajan, fuzzy left $R$ subgroups of near rings w.r.t $T$-norms, Antarctica Journal of Mathematics, 5(2008)1-2.
A. Solairaju and R.Nagarajan, A new structure and construction of fuzzy groups, Advances in Fuzzy Mathematics, 4(1)(2009), 23-29.
L. A. Zadeh, Fuzzy Sets, Information and Control, 8 (1965) 338-353.
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