scientific article; zbMATH DE number 1890155
From MaRDI portal
Publication:4800134
zbMath1026.05081MaRDI QIDQ4800134
Publication date: 1 April 2003
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Applications of graph theory (05C90) Graphs and linear algebra (matrices, eigenvalues, etc.) (05C50) Molecular structure (graph-theoretic methods, methods of differential topology, etc.) (92E10)
Related Items (23)
Graphs whose characteristic and permanental polynomials have coefficients of the same magnitude ⋮ Graphs determined by the (signless) Laplacian permanental polynomials ⋮ Per-spectral characterizations of some bipartite graphs ⋮ On the characterizing properties of the permanental polynomials of graphs ⋮ A study on determination of some graphs by Laplacian and signless Laplacian permanental polynomials ⋮ The graphs whose permanental polynomials are symmetric ⋮ Computing the permanental polynomials of bipartite graphs by Pfaffian orientation ⋮ A note on the permanental roots of bipartite graphs ⋮ Extremal hexagonal chains with respect to the coefficients sum of the permanental polynomial ⋮ Computing the permanental polynomials of graphs ⋮ Per-spectral characterizations of graphs with extremal per-nullity ⋮ Constructing graphs which are permanental cospectral and adjacency cospectral ⋮ Extremal octagonal chains with respect to the coefficients sum of the permanental polynomial ⋮ An efficient algorithm for computing permanental polynomials of graphs ⋮ Some extremal graphs with respect to permanental sum ⋮ Enumeration of permanental sums of lattice graphs ⋮ On the permanental nullity and matching number of graphs ⋮ On the matching and permanental polynomials of graphs ⋮ On the permanental polynomials of matrices ⋮ Sharp bounds on the permanental sum of a graph ⋮ On the normalized Laplacian permanental polynomial of a graph ⋮ On the permanental sum of graphs ⋮ Per-spectral and adjacency spectral characterizations of a complete graph removing six edges
This page was built for publication:
