http://chineseinput.net/에서 pinyin(병음)방식으로 중국어를 변환할 수 있습니다.
변환된 중국어를 복사하여 사용하시면 됩니다.
NEW CONCEPTS OF PRODUCT INTERVAL-VALUED FUZZY GRAPH
TALEBI, A.A.,RASHMANLOU, HOSSEIN,AMERI, REZA The Korean Society for Computational and Applied M 2016 Journal of applied mathematics & informatics Vol.34 No.3
In this paper, we introduce product interval-valued fuzzy graphs and prove several results which are analogous to interval-valued fuzzy graphs. We conclude by giving properties for a product interval-valued fuzzy graph.
New Concepts of Product Interval-Valued Fuzzy Graph
A.A. Talebi,Hossein Rashmanlou,Reza Ameri 한국전산응용수학회 2016 Journal of applied mathematics & informatics Vol.34 No.3
In this paper, we introduce product interval-valued fuzzy graphs and prove several results which are analogous to interval-valued fuzzy graphs. We conclude by giving properties for a product interval-valued fuzzy graph.
Degree of Vertices in Vague Graphs
R.A. Borzooei,H. Rashmanlou 한국전산응용수학회 2015 Journal of applied mathematics & informatics Vol.33 No.5
A vague graph is a generalized structure of a fuzzy graph that gives more precision, flexibility and compatibility to a system when compared with systems that are designed using fuzzy graphs. In this paper, we define two new operation on vague graphs namely normal product and tensor product and study about the degree of a vertex in vague graphs which are obtained from two given vague graphs $G_1$ and $G_2$ using the operations cartesian product, composition, tensor product and normal product. These operations are highly utilized by computer science, geometry, algebra, number theory and operation research. In addition to the existing operations these properties will also be helpful to study large vague graph as a combination of small, vague graphs and to derive its properties from those of the smaller ones.
DEGREE OF VERTICES IN VAGUE GRAPHS
BORZOOEI, R.A.,RASHMANLOU, HOSSEIN The Korean Society for Computational and Applied M 2015 Journal of applied mathematics & informatics Vol.33 No.5
A vague graph is a generalized structure of a fuzzy graph that gives more precision, flexibility and compatibility to a system when compared with systems that are designed using fuzzy graphs. In this paper, we define two new operation on vague graphs namely normal product and tensor product and study about the degree of a vertex in vague graphs which are obtained from two given vague graphs G<sub>1</sub> and G<sub>2</sub> using the operations cartesian product, composition, tensor product and normal product. These operations are highly utilized by computer science, geometry, algebra, number theory and operation research. In addition to the existing operations these properties will also be helpful to study large vague graph as a combination of small, vague graphs and to derive its properties from those of the smaller ones.
NEW CONCEPTS OF REGULAR INTERVAL-VALUED FUZZY GRAPHS
TALEBI, A.A.,RASHMANLOU, HOSSEIN,DAVVAZ, BIJAN The Korean Society for Computational and Applied M 2017 Journal of applied mathematics & informatics Vol.35 No.1
Recently, interval-valued fuzzy graph is a growing research topic as it is the generalization of fuzzy graphs. The interval-valued fuzzy graphs are more flexible and compatible than fuzzy graphs due to the fact that they allowed the degree of membership of a vertex to an edge to be represented by interval values in [0.1] rather than the crisp values between 0 and 1. In this paper, we introduce the concepts of regular and totally regular interval-valued fuzzy graphs and discusses some properties of the ${\mu}$-complement of interval-valued fuzzy graph. Self ${\mu}$-complementary interval-valued fuzzy graphs and self-weak ${\mu}$-complementary interval-valued fuzzy graphs are defined and a necessary condition for an interval valued fuzzy graph to be self ${\mu}$-complementary is discussed. We define busy vertices and free vertices in interval valued fuzzy graph and study their image under an isomorphism.
NEW CONCEPTS OF REGULAR INTERVAL-VALUED FUZZY GRAPHS
A.A. TALEBI,HOSSEIN RASHMANLOU,Bijan Davvaz 한국전산응용수학회 2017 Journal of applied mathematics & informatics Vol.35 No.1
Recently, interval-valued fuzzy graph is a growing research topic as it is the generalization of fuzzy graphs. The interval-valued fuzzy graphs are more exible and compatible than fuzzy graphs due to the fact that they allowed the degree of membership of a vertex to an edge to be represented by interval values in [0:1] rather than the crisp values between 0 and 1. In this paper, we introduce the concepts of regular and totally regular interval-valued fuzzy graphs and discusses some properties of the - complement of interval-valued fuzzy graph. Self -complementary interval- valued fuzzy graphs and self-weak -complementary interval-valued fuzzy graphs are dened and a necessary condition for an interval valued fuzzy graph to be self -complementary is discussed. We dene busy vertices and free vertices in interval valued fuzzy graph and study their image under an isomorphism.