A complex unit hypergraph is a hypergraph where each vertex-edge incidence is given a complex unit label. We define the adjacency, incidence, Kirchoff Laplacian and normalized Laplacian of a complex unit hypergraph and study each of them. Eigenvalue bounds for the adjacency, Kirchoff Laplacian and normalized Laplacian are also found. Complex unit hypergraphs naturally generalize several hypergraphic structures such as oriented hypergraphs, where vertex-edge incidences are labelled as either +1 or −1, as well as ordinary hypergraphs. Complex unit hypergraphs also generalize their graphic analogues, which are complex unit gain graphs, signed graphs, and ordinary graphs
In this paper, we are giving MATLAB program to find the energy and Wiener index of unit graphs. Our ...
Abstract. In this paper, some inequality relations between the Laplacian/signless Laplacian H-eigenv...
Let Γ = (G, σ_Γ ) be a signed graph, where G is the underlying simple graph and σ_Γ: E(G→{+1,−1} is ...
Abstract. A complex unit gain graph is a graph where each orientation of an edge is given a complex ...
AbstractA complex unit gain graph is a graph where each orientation of an edge is given a complex un...
Abstract. An oriented hypergraph is a hypergraph where each vertex-edge incidence is given a label o...
A quaternion unit gain graph is a graph where each orientation of an edge is given a quaternion unit...
Hypergraphs are a generalization of graphs in which edges can connect any number of vertices. They a...
AbstractTo a regular hypergraph we attach an operator, called its adjacency matrix, and study the se...
Chemical hypergraphs and their associated normalized Laplace operators are generalized and studied i...
Let 4 = {±1, ±i} be the subgroup of 4-th roots of unity inside , the multiplicative group of complex...
In the theory of (simple) graphs the concepts of the line and subdivision graph (as compound graphs)...
Complex network representing many real-world systems in nature and society have some common structur...
This paper presents some analytic methods for studying uniform hypergraphs. Its starting point is th...
AbstractAn oriented hypergraph is a hypergraph where each vertex-edge incidence is given a label of ...
In this paper, we are giving MATLAB program to find the energy and Wiener index of unit graphs. Our ...
Abstract. In this paper, some inequality relations between the Laplacian/signless Laplacian H-eigenv...
Let Γ = (G, σ_Γ ) be a signed graph, where G is the underlying simple graph and σ_Γ: E(G→{+1,−1} is ...
Abstract. A complex unit gain graph is a graph where each orientation of an edge is given a complex ...
AbstractA complex unit gain graph is a graph where each orientation of an edge is given a complex un...
Abstract. An oriented hypergraph is a hypergraph where each vertex-edge incidence is given a label o...
A quaternion unit gain graph is a graph where each orientation of an edge is given a quaternion unit...
Hypergraphs are a generalization of graphs in which edges can connect any number of vertices. They a...
AbstractTo a regular hypergraph we attach an operator, called its adjacency matrix, and study the se...
Chemical hypergraphs and their associated normalized Laplace operators are generalized and studied i...
Let 4 = {±1, ±i} be the subgroup of 4-th roots of unity inside , the multiplicative group of complex...
In the theory of (simple) graphs the concepts of the line and subdivision graph (as compound graphs)...
Complex network representing many real-world systems in nature and society have some common structur...
This paper presents some analytic methods for studying uniform hypergraphs. Its starting point is th...
AbstractAn oriented hypergraph is a hypergraph where each vertex-edge incidence is given a label of ...
In this paper, we are giving MATLAB program to find the energy and Wiener index of unit graphs. Our ...
Abstract. In this paper, some inequality relations between the Laplacian/signless Laplacian H-eigenv...
Let Γ = (G, σ_Γ ) be a signed graph, where G is the underlying simple graph and σ_Γ: E(G→{+1,−1} is ...