Vertex Partitioning and p-Energy of Graphs

Abstract

For a Hermitian matrix A of order n with eigenvalues λ1(A) ·s λn(A), define \[ Ep+(A)=Σλi > 0 λip(A), Ep-(A)=Σλi<0 |λi(A)|p,\] to be the positive and the negative p-energy of A, respectively. In this note, first we show that if A=[Aij]i,j=1k, where Aii are square matrices, then \[ Ep+(A)≥ Σi=1k Ep+(Aii), Ep-(A)≥ Σi=1k Ep-(Aii),\] for any real number p≥ 1. We then apply the previous inequality to establish lower bounds for p-energy of the adjacency matrix of graphs.

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