Eigenvalue location in graphs of small clique-width
Abstract
Finding a diagonal matrix congruent to A - cI for constants c, where A is the adjacency matrix of a graph G allows us to quickly tell the number of eigenvalues in a given interval. If G has clique-width k and a corresponding k-expression is known, then diagonalization can be done in time O(poly(k) n) where n is the order of G.
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