Spectral extremal problems for degenerate graphs
Abstract
A family of graphs is called degenerate if it contains at least one bipartite graph. In this paper, we investigate the spectral extremal problems for a degenerate family of graphs F. By employing covering and independent covering of graphs, we establish a spectral stability result for F. Using this stability result, we prove two general theorems that characterize spectral extremal graphs for a broad class of graph families F and imply several new and known results. Meanwhile, we establish the correlation between extremal graphs and spectral extremal graphs for F.
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