Your search keyword '"Homomorphism"' showing total 3,297 results

1. Homomorphisms of quantum hypergraphs

Author

Hoefer, Gage and Todorov, Ivan G.

Published

2025

2. Ordered Kernels of OBCI-Algebras in the Homomorphism Environment.

Author

Yang, Eunsuk, Roh, Eun-Hwan, and Jun, Young-Bae

Abstract

Yang, Roh and Jun recently introduced kernels of homomorphisms in OBCI-algebras and left an ordered generalization of those kernels as a future work. As its answer, we introduce the concept of ordered kernels of OBCI-algebras in the homomorphism environment. To be more concrete, first of all, the notion of ordered kernels of OBCI-algebras is intruduced. Next, properties of those ordered kernels related to (ordered) subalgebras, (ordered) filters and functional compositions are discussed in homomorphisms of OBCI-algebras. [ABSTRACT FROM AUTHOR]

Published

2025

3. Homomorphism of complex neutrosophic set extended to cubic Q neutrosophic set concept via subbisemiring of bisemirings.

Author

Aiyared Iampan and Murugan Palanikumar

Subjects

NEUTROSOPHIC logic, HOMOMORPHISMS, SET theory, MATHEMATICS, STATISTICS

Abstract

We introduce the concept of complex cubic Q neutrosophic subbisemiring (CCQNSBS) is a new extension of cubic Q neutrosophic subbisemiring. We examine the characteristics and homomorphic features of CCQNSBS. We communicate the CCQNSBS level sets for bisemirings. A cubic complex Q neutrosophic subset Γ of bisemiring S if and only if each non-empty level set R(ℓ,♭), where ... is a CCQNSBS of S. We show that the intersection of all CCQNSBSs yields a CCQNSBS of S. If Θ1, Θ2, ..., Θn be the finite collection of CCQNSBSs of S1, S2, ..., Sn respectively. Then Θ1 x Θ2 x ... x Θn is a CCQNSBS of S1 x S2 x ... x Sn. If F : S1 → S2 is a homomorphism, then ... is a subbisemiring of CCQNSBS ... of S2. Examples are provided to show how our findings are used. [ABSTRACT FROM AUTHOR]

Published

2025

4. Characterization of bipolar neutrosophic sets to novel concept of complex Q bipolar neutrosophic sets using bisemirings.

Author

Balaji, R., Palanikumar, Murugan, and Aiyared Iampan

Subjects

NEUTROSOPHIC logic, FUZZY sets, ORDERED algebraic structures, HOMOMORPHISMS, MATHEMATICS

Abstract

The notion of the complex Q bipolar neutrosophic subbisemiring (CQBNSBS) is a fundamental notion to be considered for tackling tricky and intricate information. Here, in this study, we want to expand the notion of CQBNSBS by giving a general algebraic structure for tackling bipolar complex fuzzy (BCF) data by fusing the conception of CQBNSBS and subbisemiring. Keeping in view the importance of fuzzy algebraic structures, in this manuscript, we develop the concept of CQBNSBS.We analyze the important properties and homomorphic aspects of CQBNSBS. For bisemirings, we propose the CQBNSBS level sets. We also develop the notions of homomorphic images of all CQBNSBSs is also CQBNSBS and homomorphic pre-images of all CQBNSBSs is also CQBNSBS. Examples are provided to demonstrate our findings. [ABSTRACT FROM AUTHOR]

Published

2025

5. Complex cubic neutrosophic set applied to subbisemiring and its extension of bisemiring.

Author

Vrioni, Brikena, Kausar, Nasreen, Palanikumar, Murugan, and Hoxha, Ervin

Subjects

NEUTROSOPHIC logic, SET theory, STATISTICS, MATHEMATICS, DISTRIBUTION (Probability theory)

Abstract

We construct the concept of complex cubic neutrosophic subbisemiring (ComCNSBS). We analyze the important properties and homomorphic aspects of ComCNSBS. For bisemirings, we propose the ComCNSBS level sets. A complex neutrosophic subset Γ if and only if each non-empty level set R(℘,κ), where ... is a ComCNSBS. We show that homomorphic images of all ComCNSBSs are ComCNSBSs, and homomorphic pre-images of all ComCNSBSs are ComCNSBSs. We illustrate the practical significance of our findings. [ABSTRACT FROM AUTHOR]

Published

2025

6. New approach for subbisemiring of bisemiring is applied to complex cubic anti neutrosophic set and its extension.

Author

Aiyared Iampan and Palanikumar, Murugan

Subjects

NEUTROSOPHIC logic, STATISTICS, FUZZY sets, HOMOMORPHISMS, MATHEMATICS

Abstract

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 S is represented by the symbol Γ if and only if each non-empty level set R(℘,κ), where ... is a ComCANSBS of S. Let Y be a ComCANSBS of bisemiring S. If and only if Y is a ComCANSBS of S x S, then Γ is a ComCANSBS of bisemiring S. Let Γ be the strongest complex anti neutrosophic relation of bisemiring S. 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. [ABSTRACT FROM AUTHOR]

Published

2025

7. ALGEBRA FUZZY NORMS GENERATED BY HOMOMORPHISMS.

Author

KHODDAMI, A. R. and KOUHSARI, F.

Abstract

As a new approach, for a nonzero normed algebra A, we will define some different classes of algebra fuzzy norms on A generated by homomorphisms and continuous homomorphisms. Also as a source of examples and counterexamples in the field of fuzzy normed algebras, separate continuity of the elements within each class are investigated. [ABSTRACT FROM AUTHOR]

Published

2025

8. The utility of homomorphism concepts in simulation: building families of models from base-lumped model pairs.

Author

Zeigler, Bernard P, Koertje, Christian, and Zanni, Cole

Subjects

*DISCRETE systems, *HOMOMORPHISMS, *STOCHASTIC systems, *SPACE exploration, *MATHEMATICAL optimization, *KRIGING

Abstract

In this tutorial review paper we explain the concept of homomorphism and identify some principles that justify homomorphism construction based on the homogeneity of structure and coupling in systems with multiple components. We discuss some simple examples to show how these underlying justifying conditions can arise. Examples include brain simulation, combat attrition, and the greatly reduced computational complexity represented by Pascal's triangle. Homomorphism is also shown to be fundamental for constructing approximate low-resolution models. Models that simplify complex time-demanding simulation models are often used as surrogate or metamodels in system optimization. However, such models are fitted typically to computationally derived response surfaces and not structurally related directly to the originals using homomorphisms as described here. Along these lines, we show how homomorphism plays an essential role in a novel approach being developed to strongly control tree expansion in state space explorations of stochastic system simulation. [ABSTRACT FROM AUTHOR]

Published

2024

9. Linear Maps Which Are Homomorphisms or Jordan Homomorphisms at a Point.

Author

Zivari-Kazempour, Abbas

Abstract

We study linear maps between unital Banach algebras which are homomorphisms at zero or identity products. We show under special hypotheses that every such linear map is a homomorphism multiplied by a central invertible element. Zero and identity Jordan products preserving linear maps, and a more restrictive version of zero product preservers are also discussed. [ABSTRACT FROM AUTHOR]

Published

2024

10. Homomorphisms of OBCI-algebras: Homomorphisms of OBCI-algebras: E. Yang et al.

Author

Yang, Eunsuk, Roh, Eun Hwan, and Jun, Young Bae

Abstract

Recently Yang–Roh–Jun introduced the notion of OBCI-algebras as a generalization of BCI-algebras. Here we introduce homomorphisms and kernels of OBCI-algebras and investigate related properties. More exactly, we first define the homomorphism and kernel of OBCI-algebras. We then investigate properties related to (ordered) subalgebras, (ordered) filters and direct products of OBCI-algebras. [ABSTRACT FROM AUTHOR]

Published

2025

11. Bipolar fuzzy INK-subalgebras of INK-algebras

Author

Remala Mounikalakshmi, Tamma Eswarlal, and Chiranjibe Jana

Subjects

ink-algebra, fuzzy ink sub-algebra, bipolar fuzzy ink sub-algebra, homomorphism, Mathematics, QA1-939

Abstract

This article presents a new idea for an extension of the fuzzy INK algebra called bipolar fuzzy INK subalgebra. The objective of this study is to define the features that distinguish bipolar fuzzy INK-subalgebras of INK-algebras. The algebraic operations on these sub-algebras are also studied. The thorough examination allows us to prove a number of theorems that shed light on the connections between the higher and lower-level sets related to these ideas. In addition, several related topics are thoroughly examined, and the idea of homomorphism for bipolar fuzzy INK sub-algebras is introduced.

Published

2024

12. Degree-Constrained Steiner Problem in Graphs with Capacity Constraints.

Author

Molnar, Miklos

Subjects

*GRAPH theory, *NP-hard problems, *HOMOMORPHISMS, *INTEGERS, *TREES, *SPANNING trees

Abstract

The degree-constrained Steiner problem in graphs is well known in the literature. In an undirected graph, positive integer degree bounds are associated with nodes and positive costs with the edges. The goal is to find the minimum cost tree spanning a given node set while respecting the degree bounds. As it is known, finding a tree satisfying the constraints is not always possible. The problem differs when the nodes can participate multiple times in the coverage and the constraints represent a limited degree (a capacity) for each occurrence of the nodes. The optimum corresponds to a graph-related structure, i.e., to a hierarchy. Finding the solution to this particular Steiner problem is NP-hard. We investigate the conditions of its existence and its exact computation. The gain of the hierarchies is demonstrated by solving ILPs to compute hierarchies and trees. The advantages of the spanning hierarchies are conclusive: (1) spanning hierarchies can be found in some cases where spanning trees matching the degree constraints do not exist; (2) the cost of the hierarchy can be lower even if the Steiner tree satisfying the constraints exists. [ABSTRACT FROM AUTHOR]

Published

2024

13. On definition of group homomorphism graph.

Author

Barman, Bikash and Rajkhowa, Kukil Kalpa

Subjects

*CYCLIC groups, *UNDIRECTED graphs, *HOMOMORPHISMS, *DIAMETER, *DEFINITIONS

Abstract

In this paper, the group homomorphism graph is introduced and investigated. The group homomorphism graph, denoted by H I (G , G ′) , is an undirected graph in which the vertex set contains all homomorphisms excluding the monomorphisms and the zero homomorphism from the group G to the group G ′ , and two distinct vertices are adjacent if and only if the intersection of their kernels is non-trivial. We investigate the interplay between the graph-theoretic properties of this graph with algebraic properties of the groups. In this work, connectedness, diameter, clique number, chromatic number, domination number, independence number, etc. are found. [ABSTRACT FROM AUTHOR]

Published

2024

14. Polynomials Counting Nowhere-Zero Chains Associated with Homomorphisms.

Author

Kochol, Martin

Subjects

*MATRICES (Mathematics), *POLYNOMIALS, *MULTIPLICATION, *COUNTING, *ADDITIVES, *HOMOMORPHISMS

Abstract

A regular matroid M on a finite set E is represented by a totally unimodular matrix. The set of vectors from Z E orthogonal to rows of the matrix form a regular chain group N. Assume that ψ is a homomorphism from N into a finite additive Abelian group A and let A ψ [ N ] be the set of vectors g from (A − 0) E , such that ∑ e ∈ E g (e) · f (e) = ψ (f) for each f ∈ N (where · is a scalar multiplication). We show that | A ψ [ N ] | can be evaluated by a polynomial function of | A | . In particular, if ψ (f) = 0 for each f ∈ N , then the corresponding assigning polynomial is the classical characteristic polynomial of M. [ABSTRACT FROM AUTHOR]

Published

2024

15. IDEAL THEORY OF (m, n)-NEAR RINGS.

Author

MOHAMMADI, Fahimeh and DAVVAZ, Bijan

Subjects

*PRIME ideals, *ALGEBRA, *RESPECT

Abstract

The aim of this research work is to define and characterize a new class of n-ary algebras that we call (m, n)-near rings. We investigate the notions of i-R-groups, i-(m, n)-near field, prime ideals, primary ideals and subtractive ideals of (m, n)-near rings. We describe the concept of homomorphisms between (m, n)-near rings that preserve the (m, n)-near ring structure, and give some results in this respect. [ABSTRACT FROM AUTHOR]

Published

2024

16. Degree-Constrained Minimum Spanning Hierarchies in Graphs.

Author

Molnar, Miklos

Subjects

*GRAPH theory, *TREE graphs, *NP-hard problems, *HEURISTIC algorithms, *HOMOMORPHISMS

Abstract

The minimum spanning tree problem in graphs under budget-type degree constraints (DCMST) is a well-known NP-hard problem. Spanning trees do not always exist, and the optimum can not be approximated within a constant factor. Recently, solutions have been proposed to solve degree-constrained spanning problems in the case of limited momentary capacities of the nodes. For a given node, the constraint represents a limited degree of the node for each visit. Finding the solution with minimum cost is NP-hard and the related algorithms are not trivial. This paper focuses on this new spanning problem with heterogeneous capacity-like degree bounds. The minimum cost solution corresponds to a graph-related structure, i.e., a hierarchy. We study the conditions of its existence, and we propose its exact computation, a heuristic algorithm, and its approximation. [ABSTRACT FROM AUTHOR]

Published

2024

17. A Note on Neutrosophic Soft Set over Hyperalgebras.

Author

Onar, Serkan

Subjects

*SOFT sets, *SENSITIVITY analysis, *HOMOMORPHISMS, *ARTIFICIAL intelligence, *DECISION making

Abstract

This research aims to introduce and explore the theory of neutrosophic soft hyperalgebras (N S H A s), focusing on their core principles and potential applications in decision-making under uncertainty. By defining key operations such as intersection and union, we clarify the foundational characteristics of N S H A s and their relationship to soft hyperalgebras. The concepts of ξ β -identity N S H A and ξ -absolute N S H A are also examined to better understand their properties. The practical relevance of N S H A is demonstrated through applications in various fields, highlighting its adaptability in addressing complex decision-making scenarios. This approach offers a novel, more precise method for navigating uncertainty in areas such as project methodology selection, sensitivity analysis, and AI chatbot selection. [ABSTRACT FROM AUTHOR]

Published

2024

18. MORPHISMS ON MIDDLE GRAPH OF SEMIRING VALUED GRAPHS.

Author

TAMILSELVI, A.

Subjects

AUTOMORPHISM groups, INTERSECTION graph theory, HOMOMORPHISMS

Abstract

The middle graph M(G) of a graph G is an intersection graph on the vertex set V (G) of any graph G. Let E(G) be an edge set of G and F = V 0(G) [ E(G), where V 0(G) indicates the family of all one vertex subsets of the set V (G). This concept was introduced by T. Hamada and I. Yoshimura [4]. M. Chandramouleeswaran et al., studied isomorphism and automorphism groups for semiring valued graph (S-valued graph). In this paper, we study the morphisms and its properties of middle graph of S-valued graphs. [ABSTRACT FROM AUTHOR]

Published

2024

19. Bipolar fuzzy INK-subalgebras of INK-algebras.

Author

Mounikalakshmi, Remala, Eswarlal, Tamma, and Jana, Chiranjibe

Subjects

HOMOMORPHISMS, INK, ALGEBRA

Abstract

This article presents a new idea for an extension of the fuzzy INK algebra called bipolar fuzzy INK subalgebra. The objective of this study is to define the features that distinguish bipolar fuzzy INK-subalgebras of INK-algebras. The algebraic operations on these sub-algebras are also studied. The thorough examination allows us to prove a number of theorems that shed light on the connections between the higher and lower-level sets related to these ideas. In addition, several related topics are thoroughly examined, and the idea of homomorphism for bipolar fuzzy INK sub-algebras is introduced. [ABSTRACT FROM AUTHOR]

Published

2024

20. Density of 3‐critical signed graphs.

Author

Beaudou, Laurent, Haxell, Penny, Nurse, Kathryn, Sen, Sagnik, and Wang, Zhouningxin

Subjects

*PLANAR graphs, *HOMOMORPHISMS, *DENSITY, *SUBGRAPHS

Abstract

We say that a signed graph is k $k$‐critical if it is not k $k$‐colorable but every one of its proper subgraphs is k $k$‐colorable. Using the definition of colorability due to Naserasr, Wang, and Zhu that extends the notion of circular colorability, we prove that every 3‐critical signed graph on n $n$ vertices has at least 3n−12 $\frac{3n-1}{2}$ edges, and that this bound is asymptotically tight. It follows that every signed planar or projective‐planar graph of girth at least 6 is (circular) 3‐colorable, and for the projective‐planar case, this girth condition is best possible. To prove our main result, we reformulate it in terms of the existence of a homomorphism to the signed graph C3* ${C}_{3}^{* }$, which is the positive triangle augmented with a negative loop on each vertex. [ABSTRACT FROM AUTHOR]

Published

2024

21. Applying the Diamond Product of Graphs to the Round Robin Tournament Scheduling Problem.

Author

Rutjanisarakul, T. and Sumetthapiwat, S.

Subjects

*COMPLETE graphs, *GRAPH theory, *HOMOMORPHISMS, *TOURNAMENTS, *DIAMONDS

Abstract

The diamond product of a graph G(V, E) with a graph H(V',E') denoted by G ◊ H is a graph whose a vertex set V(G ◊ H) is a Hom(G,H) and an edge set E(G ◊ H) = {{f,g}\f,g ∈ Hom(G,H) and {f (x),g(x)} ∈ E', for all x ∈ V(G)}. A round robin tournament problem involves creating a schedule where each participant plays against every other participant exactly once. This research represents the application of the diamond product of path graph and complete graph to 2n-participants round robin tournament problem. Moreover, the research also represents an algorithm to find a solution of 2n-participants round robin tournament problem. [ABSTRACT FROM AUTHOR]

Published

2024

22. ON SHEFFER STROKE BH-ALGEBRAS.

Author

ÖNER, TAHSIN, KALKAN, TUĞÇE, SAEID, ARSHAM BORUMAND, and TARMAN, AKIN

Subjects

FUNCTION algebras, SET theory, HOMOMORPHISMS, AXIOMS, GROUP theory

Abstract

In this study, a Sheffer stroke BH-algebra is introduced and its features are examined. After showing that the axioms of a Sheffer stroke BH-algebra are independent, the connection between a Sheffer stroke BH-algebra and a BH-algebra is stated. After describing a subalgebra and a normal subset of a Sheffer stroke BH-algebra, the relationship between these structures is shown. A filter of a Sheffer stroke BH-algebra is defined and the quotient of a Sheffer stroke BH-algebra is constructed. Then a homomorphism between Sheffer stroke BH-algebras is introduced and its properties are studied. [ABSTRACT FROM AUTHOR]

Published

2024

23. Generating Symmetric Group Representations for Network Dynamics and Groupoid Formalism.

Author

Samaila, D. and Agah, M. P.

Subjects

HOMOMORPHISMS, FINITE groups, GRAPH theory, UNDERGRADUATES

Abstract

Understanding the concept of group theory and to apply it in other field of sciences has been a problem among undergraduate students. Although there are some attempt by Dubinsky et al, [1], where some finite groups were discussed among students, the paper was limited to theoretical aspect of the topic. This research is therefore designed to explore clearly the procedure for constructing finite groups for better understanding of the subject area in the given domain. The research is channeled towards the use of group theory in Network Dynamics, which serves as concrete application of finite groups to the students. Some minor open problems with regards to algebraic graph theory was discussed which lead to network dynamics and groupoid formalism. [ABSTRACT FROM AUTHOR]

Published

2024

24. Hybrid norm structures applied to hemirings.

Author

Keerthika, V., Muhiuddin, G., Al-Kadi, D., and Elavarasan, B.

Subjects

*SET theory, *TRIANGULAR norms, *PROBABILITY theory, *STATISTICS, *HOMOMORPHISMS, *FUZZY sets

Abstract

An essential and quite different class of functions is the triangular norm and its related operators (uninorms, nullnorms, and associative copulas). They are used widely in many disciplines, including fuzzy set theory, probability and statistics, decision sciences, and others. This paper proposes the notion of hybrid Ξ -norm and defines the concepts of Ξ -hybrid ideals, Ξ -hybrid h -ideals in a hemiring . Some equivalent conditions are obtained for a hybrid structure to be a Ξ -hybrid left h -ideal, and it is proved that every imaginable Ξ -hybrid left h -ideal of hemiring is a hybrid left h -ideal, but not conversely by an example. [ABSTRACT FROM AUTHOR]

Published

2024

25. An analysis of Fermatean fuzzy graph and its application in a car company.

Author

Giri, Prabuddha, Amanathulla, Sk, and Das, Kalyani Maity

Abstract

Fuzzy graphs find numerous applications in real life. One of the extensions of fuzzy graphs is Fermatean fuzzy graphs. Here, we introduce the concepts of Fermatean fuzzy set to the domain of graph theory and obtain a novel type of graph, referred to as Fermatean fuzzy graph (FFG ). The article establishes fundamental terms such as strong FFG , complete FFG , regular FFG , path, degree, total degree, homomorphism, and isomorphism of FFG , as well as the complement of FFG . Alongside the introduction of these concepts, their important properties, theorems, and illustrative examples are defined and discussed. Finally, an application has surfaced suggesting the utilization of FFG s to scrutinize the key factors affecting the productivity of Tata Motors, paving the way for a comprehensive analysis of the company's operational efficiency using score function. [ABSTRACT FROM AUTHOR]

Published

2024

26. New algebraic structures approach towards complex interval valued Q-neutrosophic subbisemiring of bisemiring.

Author

Syed ahmad, Sharifah Sakinah, Kausar, Nasreen, and Palanikumar, Murugan

Subjects

SEMIRINGS (Mathematics), NEUTROSOPHIC logic, HOMOMORPHISMS, SUBSET selection, IMAGE analysis

Abstract

The notion of complex interval-valued q-neutrosophic subbisemiring (CIVqNSBS) is developed and examined. Additionally, we examine the homomorphic features and significant attributes of CIVqNSBS. We suggest the CIVqNSBS level sets for bisemirings. Consider a complex neutrosophic subset of bisemiring Δ, denoted as-→ℵ, if and only if every non-empty level set--→Z(∂,♭) is a subbisemiring, where ∂, ♭ ∈ D[0, 1], then-→Z = (-→Z⊺ℵ,-→Z גℵ,-→ZℲℵ) is a CIVqNSBS of Δ. Let-→ℵ be the strongest complex neutrosophic relation of bisemiring Δ, and let -→Ψ be a CIVqNSBS of bisemiring Δ, if and only if -→Ψ is a CIVqNSBS of Δ × Δ, then -→ℵ is a CIVqNSBS of bisemiring Δ. We show that homomorphic images of all CIVqNSBSs are CIVqNSBSs, and homomorphic pre-images of all CIVqNSBSs are CIVqNSBSs. There are examples given to illustrate our results. [ABSTRACT FROM AUTHOR]

Published

2024

27. Circular flows in mono‐directed signed graphs.

Author

Li, Jiaao, Naserasr, Reza, Wang, Zhouningxin, and Zhu, Xuding

Subjects

*DIRECTED graphs, *EULERIAN graphs, *PLANAR graphs, *GRAPH coloring, *FLOWGRAPHS, *BIPARTITE graphs, *HOMOMORPHISMS

Abstract

In this paper, the concept of circular r $r$‐flow in a mono‐directed signed graph (G,σ) $(G,\sigma)$ is introduced. That is a pair (D,f) $(D,f)$, where D $D$ is an orientation on G $G$ and f:E(G)→(−r,r) $f:E(G)\to (-r,r)$ satisfies that ∣f(e)∣∈[1,r−1] $| f(e)| \in [1,r-1]$ for each positive edge e $e$ and ∣f(e)∣∈[0,r2−1]∪[r2+1,r) $| f(e)| \in [0,\frac{r}{2}-1]\cup [\frac{r}{2}+1,r)$ for each negative edge e $e$, and the total in‐flow equals the total out‐flow at each vertex. This is the dual notion of circular colorings of signed graphs and is distinct from the concept of circular flows in bi‐directed graphs associated with signed graphs studied in the literature. We first explore the connection between circular 2kk−1 $\frac{2k}{k-1}$‐flows and modulo k $k$‐orientations in signed graphs. Then we focus on the upper bounds for the circular flow indices of signed graphs in terms of the edge‐connectivity, where the circular flow index of a signed graph is the minimum value r $r$ such that it admits a circular r $r$‐flow. We prove that every 3‐edge‐connected signed graph admits a circular 6‐flow and every 4‐edge‐connected signed graph admits a circular 4‐flow. More generally, for k≥2 $k\ge 2$, we show that every (3k−1) $(3k-1)$‐edge‐connected signed graph admits a circular 2kk−1 $\frac{2k}{k-1}$‐flow, every 3k $3k$‐edge‐connected signed graph has a circular r $r$‐flow with r<2kk−1 $r\lt \frac{2k}{k-1}$, and every (3k+1) $(3k+1)$‐edge‐connected signed graph admits a circular 4k+22k−1 $\frac{4k+2}{2k-1}$‐flow. Moreover, the (6k−2) $(6k-2)$‐edge‐connectivity condition is shown to be sufficient for a signed Eulerian graph to admit a circular 4k2k−1 $\frac{4k}{2k-1}$‐flow, and applying this result to planar graphs, we conclude that every signed bipartite planar graph of negative girth at least 6k−2 $6k-2$ admits a homomorphism to the negative even cycles C−2k ${C}_{-2k}$. [ABSTRACT FROM AUTHOR]

Published

2024

28. OFF-DIAGONAL COMMONALITY OF GRAPHS VIA ENTROPY.

Author

BEHAGUE, NATALIE, MORRISON, NATASHA, and NOEL, JONATHAN A.

Subjects

*COMMONS, *HOMOMORPHISMS, *GLUE, *ENTROPY, *DENSITY

Abstract

A graph H is common if the limit as n → ∞ of the minimum density of monochro-matic labelled copies of H in an edge colouring of Kn with red and blue is attained by a sequence of quasirandom colourings. We apply an information-theoretic approach to show that certain graphs obtained from odd cycles and paths via gluing operations are common. In fact, for every pair (H1, H2) of such graphs, there exists p ∈ (0, 1) such that an appropriate linear combination of red copies of H1 and blue copies of H2 is minimized by a quasirandom colouring in which ... edges are red; such a pair (H1, H2) is said to be (p, 1 - p)-common. Our approach exploits a strengthening of the common graph property for odd cycles that was recently proved using Schur convexity. We also exhibit a (p, 1 - p)-common pair (H1, H2) such that H2 is uncommon. [ABSTRACT FROM AUTHOR]

Published

2024

29. FUNCTORS ON RELATIONAL STRUCTURES WHICH ADMIT BOTH LEFT AND RIGHT ADJOINTS.

Author

DALMAU, VÍCTOR, KROKHIN, ANDREI, and OPRŠAL, JAKUB

Subjects

*CONSTRAINT satisfaction, *HOMOMORPHISMS, *TREES

Abstract

This paper describes several cases of adjunction in the homomorphism preorder of relational structures. We say that two functors Λ and Γ between thin categories of relational structures are adjoint if for all structures A and B, we have that Λ⁢(A) maps homomorphically to B if and only if A maps homomorphically to Γ⁢(𝐁). If this is the case, Λ is called the left adjoint to Γ and Γ the right adjoint to Λ. In 2015, Foniok and Tardif described some functors on the category of digraphs that allow both left and right adjoints. The main contribution of Foniok and Tardif is a construction of right adjoints to some of the functors identified as right adjoints by Pultr in 1970. We generalise results of Foniok and Tardif to arbitrary relational structures, and coincidently, we also provide more right adjoints on digraphs, and since these constructions are connected to finite duality, we also provide a new construction of duals to trees. Our results are inspired by an application in promise constraint satisfaction -- it has been shown that such functors can be used as efficient reductions between these problems. [ABSTRACT FROM AUTHOR]

Published

2024

30. Random homomorphisms into the orthogonality graph.

Author

Kunszenti-Kovács, Dávid, Lovász, László, and Szegedy, Balázs

Subjects

*REPRESENTATIONS of graphs, *HOMOMORPHISMS, *DENSE graphs, *SUBGRAPHS

Abstract

Subgraph densities have been defined, and served as basic tools, both in the case of graphons (limits of dense graph sequences) and graphings (limits of bounded-degree graph sequences). While limit objects have been described for the "middle ranges", the notion of subgraph densities in these limit objects remains elusive. We define subgraph densities in the orthogonality graphs on the unit spheres in dimension d , under an appropriate sparsity condition on the subgraphs. These orthogonality graphs exhibit the main difficulties of defining subgraphs in the "middle" range, and so we expect their study to serve as a key example to defining subgraph densities in more general Markov spaces. Interest in studying homomorphisms of a finite graph G into orthogonality graphs is supported by the fact that such homomorphisms are just the orthonormal representations of the complementary graph. [ABSTRACT FROM AUTHOR]

Published

2024

31. A NOTE ON n-JORDAN HOMOMORPHISMS.

Author

EL AZHARI, M.

Subjects

HOMOMORPHISMS, INTEGERS, COMMUTATIVE rings, GENERALIZATION, MATHEMATICAL functions

Abstract

Let A,B be two rings and n ⩾ 2 be an integer. An additive map h: A → B is called an n-Jordan homomorphism if h(xn) = h(x)n for all x ∈ A; h is called an n-homomorphism or an anti-n-homomorphism if h(Πni=1 xi) = Πn i=1 h(xi) or h(Πni=1 xi) = Πn i=0 h(xn-i ∈ A. We give the following variation of a theorem on n-Jordan homomorphisms due to I.N. Herstein: Let n ≥ 2 be an integer and h be an n-Jordan homomorphism from a ring A into a ring B of characteristic greater than n. Suppose further that A has a unit e, then h = h(e)τ, where h(e) is in the centralizer of h(A) and τ is a Jordan homomorphism. By using this variation, we deduce the following result of G. An: Let A and B be two rings, where A has a unit and B is of characteristic greater than an integer n ≥ 2. If every Jordan homomorphism from A into B is a homomorphism (anti-homomorphism), then every n-Jordan homomorphism from A into B is an n-homomorphism (anti-n-homomorphism). As a consequence of an appropriate lemma, we also obtain the following result of E. Gselmann: Let A,B be two commutative rings and B is of characteristic greater than an integer n ≥ 2. Then every n-Jordan homomorphism from A into B is an n-homomorphism. [ABSTRACT FROM AUTHOR]1, ..., xn ∈ A. We give the following variation of a theorem on n-Jordan homomorphisms due to I.N. Herstein: Let n ≥ 2 be an integer and h be an n-Jordan homomorphism from a ring A into a ring B of characteristic greater than n. Suppose further that A has a unit e, then h = h(e)τ, where h(e) is in the centralizer of h(A) and τ is a Jordan homomorphism. By using this variation, we deduce the following result of G. An: Let A and B be two rings, where A has a unit and B is of characteristic greater than an integer n ≥ 2. If every Jordan homomorphism from A into B is a homomorphism (anti-homomorphism), then every n-Jordan homomorphism from A into B is an n-homomorphism (anti-n-homomorphism). As a consequence of an appropriate lemma, we also obtain the following result of E. Gselmann: Let A,B be two commutative rings and B is of characteristic greater than an integer n ≥ 2. Then every n-Jordan homomorphism from A into B is an n-homomorphism. [ABSTRACT FROM AUTHOR]

Published

2024

32. The Fine-Grained Complexity of Graph Homomorphism Parameterized by Clique-Width.

Author

Ganian, Robert, Hamm, Thekla, Korchemna, Viktoriia, Okrasa, Karolina, and Simonov, Kirill

Subjects

HOMOMORPHISMS, FACTORIZATION, ALGORITHMS, CLASSIFICATION, LOGICAL prediction

Abstract

The generic homomorphism problem, which asks whether an input graph \(G\) admits a homomorphism into a fixed target graph \(H\) , has been widely studied in the literature. In this article, we provide a fine-grained complexity classification of the running time of the homomorphism problem with respect to the clique-width of \(G\) (denoted \({\operatorname{cw}}\)) for virtually all choices of \(H\) under the Strong Exponential Time Hypothesis. In particular, we identify a property of \(H\) called the signature number \(s(H)\) and show that for each \(H\) , the homomorphism problem can be solved in time \(\mathcal{O^{*}}(s(H)^{{\operatorname{cw}}})\). Crucially, we then show that this algorithm can be used to obtain essentially tight upper bounds. Specifically, we provide a reduction that yields matching lower bounds for each \(H\) that is either a projective core or a graph admitting a factorization with additional properties—allowing us to cover all possible target graphs under long-standing conjectures. [ABSTRACT FROM AUTHOR]

Published

2024

33. New approach to bisemiring via the q-neutrosophic cubic vague subbisemiring.

Author

Selvaraj, S., Palanikumar, M., Al-Sharqi, Faisal, Al-Quran, Ashraf, Bany Awad, Ali M. A., Kumaran, K. Lenin Muthu, and Geethalakshmi, M.

Subjects

SEMIRINGS (Mathematics), CUBIC equations, NEUTROSOPHIC logic, HOMOMORPHISMS, SUBSET selection

Abstract

We introduce the notion of q-neutrosophic cubic vague subbisemiring (q-NSCVSBS) and level set of q-NSCVSBS of a bisemiring. The q-NSCVSBS is a new concept of subbisemirings of bisemirings. Let Ξ be a neutrosophic vague subset of Λ. Then 0 = ([T-Ξ, T+Ξ ], [I-Ξ, I+Ξ ], [F-Ξ, F+Ξ ]) is a q-NSCVSBS of Λ if and only if all non empty level set 0(ϱ1,ϱ2,s) is also a SBS of Λ for every ϱ1, ϱ2, s ∈ [0, 1]. Let Ξ be the q-NSCVSBS of Λ and Υ be the strongest cubic q-neutrosophic vague relation of Λ. Then Ξ is a q-NSCVSBS of Λ × Λ. Let Ξ be the q-NSCVSBS of Λ, show that pseudo cubic q-neutrosophic vague coset (ςΞ)p is also a q-NSCVSBS of Λ, for all ς ∈ Λ. Let Ξ1,Ξ2, ...,Ξn be the any family of q - NSCV SBSs of Λ1,Λ2, ...,Λn respectively, then Ξ1 × Ξ2 × ... × Ξn is also a q-NSCVSBS of Λ1 × Λ2 × ... × Λn. The homomorphic image of every q-NSCVSBS is also a q-NSCVSBS. The homomorphic pre-image of every q-NSCVSBS is also a q-NSCVSBS. [ABSTRACT FROM AUTHOR]

Published

2024

34. Fredholm Theory Relative to Any Algebra Homomorphisms.

Author

Kong, Yingying, Wang, Yabo, and Yang, Jingen

Subjects

*ALGEBRA, *HOMOMORPHISMS, *DEFINITIONS

Abstract

In this paper, we give another definition of Ruston elements and almost Ruston elements, which is equivalent to the definitions given by Mouton and Raubenheimer in the case that the homomorphism has a closed range and Riesz property. For two homomorphisms, we consider the preserver problems of Fredholm theory and Fredholm spectrum theory. In addition, we study the spectral mapping theorems of Fredholm (Weyl, Browder, Ruston, and almost Ruston) elements relative to a homomorphism. Last but not least, the dependence of Fredholm theory on three homomorphisms is considered, and meanwhile, the transitivity of Fredholm theory relative to three homomorphisms is illustrated. Furthermore, we consider the Fredholm theory relative to more homomorphisms. [ABSTRACT FROM AUTHOR]

Published

2024

35. The application of homomorphism in cryptography

Author

A. Z. Lunkes and F. Borges

Subjects

Cryptography, Homomorphism, Computing, Privacy, Security, Mathematics, QA1-939

Abstract

The use of new technologies and the internet has been growing, so the privacy and security of users have be guaranteed when browsing the web. For this purpose, the encryption scheme depends on the sharing of a key between the peers involved in the exchange of a message. The concept of homomorphism was used as a possible solution for computing without the need to decipher the data. Homomorphic Cryptography is the encryption scheme that preserves the privacy and security of encrypted data.

Published

2024

36. Generalized Polynomials on Semigroups

Author

Ebanks Bruce

Subjects

homomorphism, semigroup, multi-homomorphism, multi-additive function, generalized polynomial, extension, 39b52, 39b82, Mathematics, QA1-939

Abstract

This article has two main parts. In the first part we show that some of the basic theory of generalized polynomials on commutative semi-groups can be extended to all semigroups. In the second part we show that if a sub-semigroup S of a group G generates G in the sense that G = S · S−1, then a generalized polynomial on S with values in an Abelian group H can be extended to a generalized polynomial on G into H. Finally there is a short discussion of the extendability of exponential functions and generalized exponential polynomials.

Published

2024

37. Neutrosophic Doubt Fuzzy Bi-ideal of BS-Algebras

Author

P. Ayesha Parveen and M. Himaya Jaleela Begum

Subjects

bs-algebras, neutrosophic doubt fuzzy bi-ideal, homomorphism, Mathematics, QA1-939, Electronic computers. Computer science, QA75.5-76.95

Abstract

In this research paper, our aim is to introduce the new concept of neutrosophic doubt fuzzy bi-ideal of BS-algebras as an extension of doubt fuzzy bi-ideal of BS-algebras and investigated its algebraic nature. Neutrosophic doubt fuzzy bi-ideal of BS-algebras is also applied in Cartesian product. Finally, we also provide the homomorphic behaviour of Neutrosophic doubt fuzzy bi-ideal of BS-algebras.

Published

2024

38. Polynomial equations for additive functions II. The mixed parameter case.

Author

Gselmann, Eszter and Kiss, Gergely

Abstract

In this sequence of work we investigate polynomial equations of additive functions. This is the continuation of the paper [5] entitled Polynomial equations for additive functions I. We consider here the solutions of the equation ∑ i = 1 n f i (x p i) g i (x) q i = 0 x ∈ F , where n is a positive integer, F ⊂ C is a field, f i , g i : F → C are additive functions and p i , q i are positive integers for all i = 1 , … , n . Using the theory of decomposable functions we describe the solutions as compositions of higher-order derivations and field homomorphisms. In many cases, we also give a tight upper bound for the order of the involved derivations. Moreover, we present the full description of the solutions in some important special cases, too. [ABSTRACT FROM AUTHOR]

Published

2024

39. On the Duality in the Theory of Smooth Manifolds.

Author

Ovchinnikov, A. V.

Subjects

*DUALITY theory (Mathematics), *SMOOTHNESS of functions, *ALGEBRA, *HOMOMORPHISMS

Abstract

In this paper, we discuss an important and nontrivial theorem on evaluation homomorphisms. We state this theorem as a canonical duality between the family of all smooth mappings f ∈ Hom(M,M′) of a smooth real finite-dimensional manifold M into a similar manifold M′ and the family of homomorphisms φ of the algebra C∞ (M′) of smooth scalar-valued functions on M′ into the analogous algebra C∞ (M) on M, φ ∈ Hom (C∞ (M′), C∞ (M)). This formulation possesses the maximum natural generality and, at the same time, allows it to be used in applications in the standard canonical form. [ABSTRACT FROM AUTHOR]

Published

2024

40. Neutrosophic Doubt Fuzzy Bi-ideal of BS-Algebras.

Author

Parveen, P. Ayesha and Begum, M. Himaya Jaleela

Subjects

*HOMOMORPHISMS, *IDEALS (Algebra)

Abstract

In this research paper, our aim is to introduce the new concept of neutrosophic doubt fuzzy bi-ideal of BSalgebras as an extension of doubt fuzzy bi-ideal of BS-algebras and investigated its algebraic nature. Neutrosophic doubt fuzzy bi-ideal of BS-algebras is also applied in Cartesian product. Finally, we also provide the homomorphic behaviour of Neutrosophic doubt fuzzy bi-ideal of BS-algebras. [ABSTRACT FROM AUTHOR]

Published

2024

41. 罗巴李代数同态的形变理论.

Author

张静茹, 杜磊, and 赵志兵

Abstract

Copyright of Journal of Jilin University (Science Edition) / Jilin Daxue Xuebao (Lixue Ban) is the property of Zhongguo Xue shu qi Kan (Guang Pan Ban) Dian zi Za zhi She and its content may not be copied or emailed to multiple sites or posted to a listserv without the copyright holder's express written permission. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract. (Copyright applies to all Abstracts.)

Published

2024

42. Rainbow subdivisions of cliques.

Author

Jiang, Tao, Letzter, Shoham, Methuku, Abhishek, and Yepremyan, Liana

Subjects

RAINBOWS, RANDOM walks, SUBDIVISION surfaces (Geometry), INTEGERS

Abstract

We show that for every integer m≥2$$ m\ge 2 $$ and large n$$ n $$, every properly edge‐colored graph on n$$ n $$ vertices with at least n(logn)53$$ n{\left(\log n\right)}^{53} $$ edges contains a rainbow subdivision of Km$$ {K}_m $$. This is sharp up to a polylogarithmic factor. Our proof method exploits the connection between the mixing time of random walks and expansion in graphs. [ABSTRACT FROM AUTHOR]

Published

2024

43. Secure monitoring model for smart agriculture using an optimized attribute-based access control centralized authority system.

Author

Mahalingam, Nagarajan and Sharma, Priyanka

Subjects

ACCESS control, TIME complexity, DATA integrity, CHIMPANZEES, HOMOMORPHISMS, PRECISION farming

Abstract

An attribute-based authority system helps in providing file/system access to only authorized users. However, they face specific challenges in securing the dataset from attacks. Hence, a novel hybrid Chimp Optimization -based Elliptical Curve Cryptosystem Model (CbECCM) was designed in this article. The main objective of this model is to overcome these demerits of the existing system and to provide file access to the authorized user. The chimp fitness in the user authorization module improves the system's confidentiality. The presented work was validated with a crop-recommendation dataset, and the outcomes are estimated. Moreover, the homomorphism algorithm increases the data integrity and reduces the time complexity. Finally, the robustness of the developed model was checked by launching the Denial of Service (DoS) attack on the cloud servers. The performance of the designed model is estimated and validated with a comparative analysis. The performance analysis shows that the developed model attained a high confidential rate of 100%. The comparative analysis proves that the developed model achieved better outcomes than others. [ABSTRACT FROM AUTHOR]

Published

2024

44. The C-prime Fuzzy Graph of a Nearring with respect to a Level Ideal.

Author

B., Jagadeesha, Srinivas, K. B., and Prasad, K. S.

Subjects

HOMOMORPHISMS, SYMMETRY, FUZZY graphs

Abstract

In this paper, we introduce a c-prime fuzzy graph of a nearring with respect to a level ideal of a fuzzy ideal. We find a relation between properties of the fuzzy ideal and properties of the fuzzy graph. We introduce ideal symmetry of the fuzzy graph and obtain conditions under which the graph is ideal symmetric. We find a relation between nearring homomorphisms and graph homomorphisms. We investigate conditions required for the homomorphic image of a c-prime fuzzy ideal to be a c-prime fuzzy ideal. [ABSTRACT FROM AUTHOR]

Published

2024

45. Relations Between Derivations and Homomorphisms of Ordered Hyperrings.

Author

Cai, Ruiqi, Alsaeedi, Mashaer, and Akhoundi, Maryam

Subjects

*HOMOMORPHISMS

Abstract

The present study investigates the relation between derivations and hyperideals on ordered hyperrings with no zero divisors. Also, we identify some results for the ordered hyperrings induced by the homomorphism of the ordered hyperrings by derivations. The present work explores some aspects of derivations in ordered hyperrings. Also, we establish some results in connection with homomorphisms and hyperideals. Furthermore, we describe prime hyperideals associated to a derivation d on an ordered hyperring T and derive several results about homomorphisms and derivations on ordered hyperrings. [ABSTRACT FROM AUTHOR]

Published

2024

46. New algebraic approach towards interval-valued neutrosophic cubic vague set based on subbisemiring over bisemiring.

Author

Selvaraj, S., Gharib, Gharib, Al-Husban, Abdallah, Al Soudi, Maha, Kumaran, K. Lenin Muthu, Palanikumar, Murugan, and Sundareswari, K.

Subjects

NEUTROSOPHIC logic, TOPSIS method, ECUADORIANS, HERMENEUTICS, MATHEMATICS

Abstract

We introduce the concept of an interval-valued neutrosophic cubic vague subbisemiring (IVNCVSBS) and level set of IVNCVSBS of a bisemiring. An IVNCVSBS is the new extension of neutrosophic subbisemirings and SBS over bisemirings. Let ℵ be a neutrosophic vague subset in Ξ, we show that i = ([k - ℵ, k + ℵ ג], [ - ℵ ג, + ℵ ], [' - ℵ, ' + ℵ ]) is a IVNCVSBS of Ξ if and only if all non empty level set i ('1,'2,s) is a SBS of Ξ for all '1, '2, s ∈ [0, 1]. Let ℵ be the IVNCVSBS of Ξ and Υ be the strongest cubic neutrosophic vague relation of Ξ. To prove that ℵ is a IVNCVSBS of Ξ n Ξ. Let ℵ be any IVNCVSBS of Ξ, prove that pseudo cubic neutrosophic vague coset (ςℵ) p is a IVNCVSBS of Ξ, for all ς ∈ Ξ. Let ℵ1, ℵ2, ..., ℵn be the family of IV NCV SBSs of Ξ1, Ξ2, ..., Ξn respectively. To prove that ℵ1 nℵ2 n...nℵn is a IVNCVSBS of Ξ1 nΞ2 n...nΞn. The homomorphic image of every IVNCVSBS is a IVNCVSBS. The homomorphic pre-image of every IVNCVSBS is a IVNCVSBS. Examples are provided to strengthen our results. [ABSTRACT FROM AUTHOR]

Published

2024

47. Extending the concepts of complex interval valued neutrosophic subbisemiring of bisemiring.

Author

Palanikumar, M., Kausar, Nasreen, Özbilge, Emre, and Ozbilge, Ebru

Subjects

NEUTROSOPHIC logic, LEUKEMIA, MACHINE learning, CONVOLUTIONAL neural networks, DEEP learning

Abstract

The objective of this paper is to investigate the innovative concept of complex neutrosophic subbisemiring. The novelty of the complex neutrosophic subbisemiring lies in its wide range of truth, indeterminacy, and false function values. It goes beyond the range of [0; 1] in the complex plane in contrast to the traditional range [0; 1]. Therefore, these three functions can be described mathematically using a complex number in the complex neutrosophic subbisemiring. We develop and analyze the concept of complex interval-valued neutrosophic subbisemiring (CIVNSBS). Moreover, we study homomorphic characteristics and important properties of CIVNSBS. We propose the level sets of CIVNSBS and complex interval valued neutrosophic normal subbisemiring (CIVNNSBS) of bisemirings. Moreover, we introduce ... CIVNSBS of bisemiring S if and only if bV is a CIVNSBS of S x S. We illustrate that homomorphic images of every CIVNSBS is a CIVNSBS and homomorphic pre-images of every CIVNSBS is a CIVNSBS. Examples are provided to illustrate our results. [ABSTRACT FROM AUTHOR]

Published

2024

48. An embedding technique in the study of word-representability of graphs.

Author

Huang, Sumin, Kitaev, Sergey, and Pyatkin, Artem

Subjects

*DE Bruijn graph, *PERMUTATIONS, *HOMOMORPHISMS, *SUBGRAPHS, *PROOF of concept

Abstract

Word-representable graphs, which are the same as semi-transitively orientable graphs, generalize several fundamental classes of graphs. In this paper we propose a novel approach to study word-representability of graphs using a technique of homomorphisms. As a proof of concept, we apply our method to show word-representability of the simplified graph of overlapping permutations that we introduce in this paper. For another application, we obtain results on word-representability of certain subgraphs of simplified de Bruijn graphs that were introduced recently by Petyuk and studied in the context of word-representability. [ABSTRACT FROM AUTHOR]

Published

2024

49. Polynomial Equations for Additive Functions I: The Inner Parameter Case.

Author

Gselmann, Eszter and Kiss, Gergely

Subjects

POLYNOMIALS, EQUATIONS, ADDITIVE functions, HOMOMORPHISMS, INTEGERS

Abstract

The aim of this sequence of work is to investigate polynomial equations satisfied by additive functions. As a result of this, new characterization theorems for homomorphisms and derivations can be given. More exactly, in this paper the following type of equation is considered ∑ i = 1 n f i (x p i) g i (x q i) = 0 x ∈ F , where n is a positive integer, F ⊂ C is a field, f i , g i : F → C are additive functions and p i , q i are positive integers for all i = 1 , ... , n . [ABSTRACT FROM AUTHOR]

Published

2024

50. Extension for neutrosophic vague subbisemirings of bisemirings

Author

G. Manikandan, M. Palanikumar, P. Vijayalakshmi, G. Shanmugam, and Aiyared Iampan

Subjects

subbisemiring, neutrosophic subbisemiring, neutrosophic vague bisemiring, homomorphism, Mathematics, QA1-939, Electronic computers. Computer science, QA75.5-76.95

Abstract

Neutosophic vague subbisemirings (NSVSBS) are discussed here, as well as their level sets. Subbisemirings are a generalization of bisemirings, and NSVSBSs are a generalization of sub-bisemirings. A number of illustrative examples are provided to illustrate the theory for (ξ, τ )-NSVSBS over bisemiring theory. Following is an outline of the preliminary definitions and results presented in Section 2. The concept of a NSVSBS is introduced in Section 3.

Published

2024