The first eigenvector of a distance matrix is nearly constant
Abstract
Let x1, …, xn be points in a metric space and define the distance matrix D ∈ Rn × n by Dij = d(xi, xj). The Perron-Frobenius Theorem implies that there is an eigenvector v ∈ Rn with non-negative entries associated to the largest eigenvalue. We prove that this eigenvector is nearly constant in the sense that the inner product with the constant vector 1 ∈ Rn is large v, 1 ≥ 12 · \| v\|2 · \|1 \|2 and that each entry satisfies vi ≥ \|v\|2/4n. Both inequalities are sharp.
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