Note on von Neumann and R\'enyi entropies of a Graph
Abstract
We conjecture that all connected graphs of order n have von Neumann entropy at least as great as the star K1,n-1 and prove this for almost all graphs of order n. We show that connected graphs of order n have R\'enyi 2-entropy at least as great as K1,n-1 and for α>1, Kn maximizes R\'enyi α-entropy over graphs of order n. We show that adding an edge to a graph can lower its von Neumann entropy.
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