Estimates of the first Dirichlet eigenvalue of graphs
Abstract
Inspired by the Li--Yau eigenvalue-diameter estimates, we investigate lower bounds for the first Dirichlet eigenvalue in terms of the diameter (or inscribed radius) of a graph. Let G = (V, E) be a graph with boundary B. Assume that the interior = V B is connected. Let r be the inscribed radius of (G, B) and d be the maximum degree of G. We prove that λ1(G, B) ≥ d - 1r dr, which can be viewed as an analogue of the Lin--Yau bound and the Meng--Lin bound for normalized Dirichlet/Laplacian eigenvalues. We also derive the inequality λ1(G, B) ≥ 1r ||. In particular, for a tree T with at least 3 vertices, we show that λ1(T) ≥ 4 2 π4r + 6 ≥ 1(r + 1)2. Notably, both of the two preceding bounds are sharp up to a constant factor. We additionally examine upper bounds on the first Dirichlet eigenvalue under constraints on the numbers of interior and boundary vertices.
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