Characterization of singular graphs can be reduced to the non-trivial solutions of a system of linear homogeneous equations Ax = 0 for the 0-1 adjacency matrix A. A graph G is singular of nullity η(G) ≥ 1, if the dimension of the nullspace ker(A) of its adjacency matrix A is η(G). Necessary and sufficient conditions are determined for a graph to be singular in terms of admissible induced subgraphs.peer-reviewe
AbstractLet G be a simple graph of order n and A(G) be its adjacency matrix. The nullity of a graph ...
A real symmetric matrix G with zero diagonal encodes the adjacencies of the vertices of a graph G wi...
A graph is singular if its adjacency matrix is singular. In this note a parameter T(G), termed the c...
AbstractThis paper studies singular graphs by considering minimal singular induced subgraphs of smal...
AbstractFor acyclic and unicyclic graphs we determine a necessary and sufficient condition for a gra...
A graph G is singular if the zero-one adjacency matrix has the eigenvalue zero. The multiplicity of ...
Let Γ be a simple graph on a finite vertex set V and let A be its adjacency matrix. Then Γ is said to...
A graph G is singular of nullity η if the nullspace of its adjacency matrix G has dimension η. Such ...
A nut graph has a non-invertible (singular) 0-1 adjacency matrix with non-zero entries in every kern...
A graph is said to be singular if the determinant of its adjacency matrix is equal to zero. Otherwis...
This paper is an exposition of the Singular graphs: The Cartesian Product of Two Graphs, from the st...
A singular graph, with adjacency matrix A and one zero eigenvalue, has a corresponding eigenvector v...
AbstractLet G be a graph without loops and multiple edges. If V(G) = (V[in1]), V2, …, vn, we define ...
AbstractA graph G is singular of nullity η(>0), if its adjacency matrix A is singular, with the eige...
A graph is singular of nullity n if zero is an eigenvalue of its adjacency matrix with multiplicity ...
AbstractLet G be a simple graph of order n and A(G) be its adjacency matrix. The nullity of a graph ...
A real symmetric matrix G with zero diagonal encodes the adjacencies of the vertices of a graph G wi...
A graph is singular if its adjacency matrix is singular. In this note a parameter T(G), termed the c...
AbstractThis paper studies singular graphs by considering minimal singular induced subgraphs of smal...
AbstractFor acyclic and unicyclic graphs we determine a necessary and sufficient condition for a gra...
A graph G is singular if the zero-one adjacency matrix has the eigenvalue zero. The multiplicity of ...
Let Γ be a simple graph on a finite vertex set V and let A be its adjacency matrix. Then Γ is said to...
A graph G is singular of nullity η if the nullspace of its adjacency matrix G has dimension η. Such ...
A nut graph has a non-invertible (singular) 0-1 adjacency matrix with non-zero entries in every kern...
A graph is said to be singular if the determinant of its adjacency matrix is equal to zero. Otherwis...
This paper is an exposition of the Singular graphs: The Cartesian Product of Two Graphs, from the st...
A singular graph, with adjacency matrix A and one zero eigenvalue, has a corresponding eigenvector v...
AbstractLet G be a graph without loops and multiple edges. If V(G) = (V[in1]), V2, …, vn, we define ...
AbstractA graph G is singular of nullity η(>0), if its adjacency matrix A is singular, with the eige...
A graph is singular of nullity n if zero is an eigenvalue of its adjacency matrix with multiplicity ...
AbstractLet G be a simple graph of order n and A(G) be its adjacency matrix. The nullity of a graph ...
A real symmetric matrix G with zero diagonal encodes the adjacencies of the vertices of a graph G wi...
A graph is singular if its adjacency matrix is singular. In this note a parameter T(G), termed the c...