In order to provide an optimal model for solving practical problems, many researchers are interested in
graph theory. We know that graphs serve as mathematical tools to analyze many distinguished and concrete real-world problems successfully.
A fuzzy graph has ability to solve uncertain problems in a range of fields that's why fuzzy
graph theory has been growing rapidly and consider it in numerous applications of various fields.
Many appealing and attractive problems in
graph theory are about deducing graph orientations with particular properties.
Focusing on the mathematics, the authors discuss the question "Are there de Bruijn sequences for every k?" and show how
graph theory can be used to answer this.
Editors Gross, Yellen, and Zhang offer this broad-based review of
graph theory presented in thirteen in-depth chapters, each with a glossary.
24 ( ANI ): A new approach to understanding a basic concept in
graph theory, known as "vertex connectivity," could lead to communications protocols - the rules that govern how digital messages are exchanged - that coax as much bandwidth as possible from networks, researchers have claimed.
The psychologists analyzed the "network properties" of the subjects' brains using a branch of mathematics known as
graph theory. The finding showed that consciousness does not "live" in a particular place in our brain but rather arises from the mode in which billions of neurons communicate with one another.
Coloring is a important research area of
graph theory. Some new colorings of graphs are produced from applied areas of computer science, information science and light transmission, such as vertex distinguishing proper edge coloring [1], adjacent vertex distinguishing proper edge coloring [2] and adjacent vertex distinguishing total coloring [3, 4] and so on, those problems are very difficult.