Refine your search
Collections
Journals
A B C D E F G H I J K L M N O P Q R S T U V W X Y Z All
Pradeep Kumar, T. V.
- A Note on Fuzzy Ideals in Near-Rings and its Anti-Homomorphism
Abstract Views :248 |
PDF Views:1
Authors
Affiliations
1 DVR & Dr. HS MIC College of Engineering and Technology, Kanchikacherla, IN
2 ANU College of Engineering and Technology, Acharya Nagarjuna University, Guntur, AP, IN
1 DVR & Dr. HS MIC College of Engineering and Technology, Kanchikacherla, IN
2 ANU College of Engineering and Technology, Acharya Nagarjuna University, Guntur, AP, IN
Source
International Journal of Innovative Research and Development, Vol 5, No 6 (2016), Pagination: 14-18Abstract
The Theory of Fuzzy sets introduced in 1964 by Zadeh [10]. The study of Fuzzy algebraic structures has started by Rosen field [9] in 1970. In this paper we investigate anti-homomorphic images and pre-images of semi prime, strongly primary, irreducible, strongly irreducible Fuzzy ideals and f-invariant, semi prime Fuzzy ideals of a Near-Ring N.
Mathematics Subject Classification: 08A72, 13A15, 03E72, 13C12
Keywords
Near-Ring, Fuzzy Ideal, Prime Fuzzy Ideal, (Strongly) Primary Fuzzy Ideal, F-Invariant, Semi-Prime Fuzzy Ideal, Anti-Homomorphism.- Sufficient Condition for Complete Graphs and Hamiltonian Graphs
Abstract Views :131 |
PDF Views:0
Authors
Affiliations
1 Dept. of Mathematics, K.L University, Vaddeswaram Post, Guntur District, Andhra Pradesh, IN
2 Dept. of Mathematics, A.N.U. College of Engineering, Acharya Nagarjuna University, Guntur, Andhra Pradesh, IN
1 Dept. of Mathematics, K.L University, Vaddeswaram Post, Guntur District, Andhra Pradesh, IN
2 Dept. of Mathematics, A.N.U. College of Engineering, Acharya Nagarjuna University, Guntur, Andhra Pradesh, IN
Source
International Journal of Scientific Engineering and Technology, Vol 4, No 2 (2015), Pagination: 61-65Abstract
In 1856, Hamiltonian introduced the Hamiltonian Graph where a Graph which is covered all the vertices without repetition and end with starting vertex. In this paper I would like to prove that every Complete Graph 'G' having n≥5 vertices, such that n is odd. If for all pairs of nonadjacent vertices u, v one has du+dv≥n-2, then G has a Hamiltonian path.Keywords
Graph, Complete Graph, Bipartite Graph Hamiltonian Graph.- 2-Absorbing Primary Subsemimodules Over Partial Semirings
Abstract Views :312 |
PDF Views:0
Authors
Affiliations
1 Department of Basic Science and Humanities, Narasaraopet Engineering College, Narasaraopet - 522601, Andhra Pradesh, IN
2 Department of Science and Humanities, ANU College of Engineering, Acharya Nagarjuna University, Nagarjuna Nagar, Guntur - 522510, Andhra Pradesh, IN
3 Department of Basic Engineering, DVR and Dr. HS MIC College of Technology, Kanchikacherla - 521180, Andhra Pradesh, IN
1 Department of Basic Science and Humanities, Narasaraopet Engineering College, Narasaraopet - 522601, Andhra Pradesh, IN
2 Department of Science and Humanities, ANU College of Engineering, Acharya Nagarjuna University, Nagarjuna Nagar, Guntur - 522510, Andhra Pradesh, IN
3 Department of Basic Engineering, DVR and Dr. HS MIC College of Technology, Kanchikacherla - 521180, Andhra Pradesh, IN
Source
The Journal of the Indian Mathematical Society, Vol 88, No 1-2 (2021), Pagination: 23–32Abstract
A partial semiring is a structure possessing an infinitary partial addition and a binary multiplication, subject to a set of axioms. The partial functions under disjoint-domain sums and functional compo- sition is a partial semiring. In this paper we obtain the characteristics of 2-absorbing primary subsemimodules and weakly 2-absorbing primary subsemimodules in partial semirings.Keywords
Semimodule, 2-absorbing primary subsemimodule, weakly 2-absorbing primary subsemimodule, commutative partial semiringReferences
- G. V. S. Acharyulu, Matrix representable So-rings, Semigroup Forum, Springer-Verlag, 46 (1993), 31-47. (DOI: 10.1007/BF02573542)
- D. D. Anderson and A. R. Badawi, On n-absorbing ideals of commutative rings, Comm. Algebra, 39(5) (2011), 1646-1672. (DOI: 10.1080/00927871003738998)
- M. A. Arbib & E. G. Manes, Partially Additive Categories and Flow-diagram Semantics, J. Algebra, 62. (1980), 203-227.
- A. R. Badawi, On 2-absorbing ideals of commutative rings, Bull. Aust. Math. Soc., 75(3). (2007), 417-429.
- A. R. Badawi, U. Tekir and E. Yetkin, On 2-absorbing primary ideals in commutative rings, Bull. Korean Math. Soc., 51(4). (2014), 1163 - 1173. (DOI: 10.4134/BKMS.2014.51.4.1163)
- A.R. Badawi, U. Tekir and E. Yetkin, On weakly 2-absorbing primary ideals of commutative rings, J. Korean Math. Soc., 52(1). (2015), 97-111. (DOI: 10.4134/JKMS.2015.52.1.097)
- E. G. Manes and D. B. Benson, The Inverse Semigroup of a Sum-Ordered Partial Semirings, Semigroup Forum, 31. (1985), 129-152. (DOI: 10.1007/BF02572645)
- N. Ravi Babu, T. V. Pradeep Kumar and P.V. Srinivasa Rao, 2-absorbing primary ideals of so-rings, Jordan J. Math. Stat., 11(3) (2018), 229-241.
- P. V. Srinivasa Rao and M. Siva Mala, Primary subsemimodules of Partial Semimodules, Advances in Algebra, 5(3) (2012), 125-133.
- P.V. Srinivasa Rao, Ideal Theory of Sum-ordered Partial Semirings, Doctoral thesis, Acharya Nagarjuna University, 2011.
- M. Srinivasa Reddy, V. Amarendra Babu and P. V. Srinivasa Rao, 2-absorbing Subsemimodules of Partial Semimodules, Gen.Math.Notes, 23(2). (2014), 43-50.
- M. E. Streenstrup, Sum-ordered Partial Semirings, Doctoral thesis, Graduate school of the University of Massachusetts, 1985.