Extremal results on degree powers in some classes of graphs
Abstract
Let G be a simple graph of order n with degree sequence (d1,d2,·s,dn). For an integer p>1, let ep(G)=Σi=1n dpi and let exp(n,H) be the maximum value of ep(G) among all graphs with n vertices that do not contain H as a subgraph (known as H-free graphs). Caro and Yuster proposed the problem of determining the exact value of ex2(n,C4), where C4 is the cycle of length 4. In this paper, we show that if G is a C4-free graph having n≥ 4 vertices and m≤ 3(n-1)/2 edges and no isolated vertices, then ep(G)≤ ep(Fn), with equality if and only if G is the friendship graph Fn. This yields that for n≥ 4, exp(n,C*)=ep(Fn) and Fn is the unique extremal graph, which is an improved complement of Caro and Yuster's result on exp(n,C*), where C* denotes the family of cycles of even lengths. We also determine the maximum value of ep(·) among all minimally t-(edge)-connected graphs with small t or among all k-degenerate graphs, and characterize the corresponding extremal graphs. A key tool in our approach is majorization.
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