Semihypergroup-Based Graph for Modeling International Spread of COVID-n in Social Systems

Abstract: Graph theoretic techniques have been widely applied to model many types of links in social systems. Also, algebraic hypercompositional structure theory has demonstrated its systematic application in some problems. Influenced by these mathematical notions, a novel semihypergroup-based graph (SBG) of G=H,E is constructed through the fundamental relation γn on H, where semihypergroup H is appointed as the set of vertices and E is addressed as the set of edges on SBG. Indeed, two arbitrary vertices x and y are adj… Show more

“…We conclude this section with a description of the third group of manuscripts, presenting different relationships between algebraic structures and graph theory. The first paper [21] introduces a construction of a new graph associated with a semihypergroup, using the fundamental relation γ * . Several properties such as completeness, regularity, being Eulerian or Hamiltonian, and Cartesian products are studied.…”

Preface to the Special Issue “Algebraic Structures and Graph Theory”

“…We conclude this section with a description of the third group of manuscripts, presenting different relationships between algebraic structures and graph theory. The first paper [21] introduces a construction of a new graph associated with a semihypergroup, using the fundamental relation γ * . Several properties such as completeness, regularity, being Eulerian or Hamiltonian, and Cartesian products are studied.…”

Preface to the Special Issue “Algebraic Structures and Graph Theory”