Upper bounds of Steklov eigenvalues on graphs
Abstract
Let and B be the maximum vertex degree and a subset of vertices in a graph G respectively. In this paper, we study the first (non-trivial) Steklov eigenvalue σ2 of G with boundary B. Using metrical deformation via flows, we first show that σ2 = O((g+1)3|B|) for graphs of orientable genus g if |B| ≥ \3 g,|V|14 + ε, 9\ for some ε > 0. This can be seen as a discrete analogue of Karpukhin's bound. Secondly, we prove that σ2 ≤ 8+4X|B| based on planar crossing number X. Thirdly, we show that σ2 ≤ |B||B|-1 · δB, where δB denotes the minimum degree for boundary vertices in B. At last, we compare several upper bounds on Laplacian eigenvalues and Steklov eigenvalues.
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