Add to ORKGWe show that a number of graph invariants are, even combined, insufficient to distinguish between nonisomorphic trees or general graphs. Among these are: the set of eigenvalues (equivalently, the characteristic polynomial), the number of independent sets of all sizes or the number of connected subgraphs of all sizes. We therefore extend the classical theorem of Schwenk that almost every tree has a cospectral mate, and we provide an answer to a question of Jamison on average subtree orders of trees. The simple construction that we apply for this purpose is based on finding graphs with two distinguished vertices (called pseudo-twins) that do not belong to the same orbit but whose removal yields isomorphic graphs
Properties of symmetries in random trees and tree-like graphs are explored. The primary structures s...
Graphs with the same spectrum are called cospectral. A graph is determined by its spectrum if every ...
We provide three infinite families of graphs in the Johnson and Grassmann schemes that are not uniqu...
We show that a number of graph invariants are, even combined, insufficient to distinguish between no...
We show that a number of graph invariants are, even combined, insufficient to distinguish between noni...
AbstractA tree which has exactly one vertex of degree greater than two is said to be starlike. In sp...
We will consider two questions proposed by R. Jamison in 1983 regarding the average subtree order of...
We will consider two questions proposed by R. Jamison in 1983 regarding the average subtree order of...
AbstractA tree is said to be starlike if exactly one of its vertices has degree greater than two. We...
Spectral graph theory studies the relation between structural properties of a graph and the eigenval...
AbstractWe have enumerated all graphs on at most 11 vertices and determined their spectra with respe...
We prove that no tree contains a set of three vertices which are pairwise strongly cospectral. This ...
Abstract. Let n be any positive integer and Fn be the friendship (or Dutch windmill) graph with 2n+1...
AbstractLet ϕ(G,λ) be the characteristic polynomial of a graph G. Two graphs G and H are cospectral,...
We present enumeration results on the number of connected graphs up to 10 vertices for which there i...
Properties of symmetries in random trees and tree-like graphs are explored. The primary structures s...
Graphs with the same spectrum are called cospectral. A graph is determined by its spectrum if every ...
We provide three infinite families of graphs in the Johnson and Grassmann schemes that are not uniqu...
We show that a number of graph invariants are, even combined, insufficient to distinguish between no...
We show that a number of graph invariants are, even combined, insufficient to distinguish between noni...
AbstractA tree which has exactly one vertex of degree greater than two is said to be starlike. In sp...
We will consider two questions proposed by R. Jamison in 1983 regarding the average subtree order of...
We will consider two questions proposed by R. Jamison in 1983 regarding the average subtree order of...
AbstractA tree is said to be starlike if exactly one of its vertices has degree greater than two. We...
Spectral graph theory studies the relation between structural properties of a graph and the eigenval...
AbstractWe have enumerated all graphs on at most 11 vertices and determined their spectra with respe...
We prove that no tree contains a set of three vertices which are pairwise strongly cospectral. This ...
Abstract. Let n be any positive integer and Fn be the friendship (or Dutch windmill) graph with 2n+1...
AbstractLet ϕ(G,λ) be the characteristic polynomial of a graph G. Two graphs G and H are cospectral,...
We present enumeration results on the number of connected graphs up to 10 vertices for which there i...
Properties of symmetries in random trees and tree-like graphs are explored. The primary structures s...
Graphs with the same spectrum are called cospectral. A graph is determined by its spectrum if every ...
We provide three infinite families of graphs in the Johnson and Grassmann schemes that are not uniqu...