Euclidean random matrix

This article provides insufficient context for those unfamiliar with the subject. Please help improve the article by providing more context for the reader. (Learn how and when to remove this message)

An N×N Euclidean random matrix  is defined with the help of an arbitrary deterministic function f(r, r′) and of N points {r_i} randomly distributed in a region V of d-dimensional Euclidean space. The element A_ij of the matrix is equal to f(r_i, r_j): A_ij = f(r_i, r_j).

Euclidean random matrices were first introduced in 1999.^[1] They studied a special case of functions f that depend only on the distances between the pairs of points: f(r, r′) = f(r - r′) and imposed an additional condition on the diagonal elements A_ii,
A_ij = f(r_i - r_j) - u δ_ij∑_kf(r_i - r_k),
motivated by the physical context in which they studied the matrix. Euclidean distance matrix is a particular example of Euclidean matrix with either f(r_i - r_j) = |r_i - r_j|² (as on the Wikipedia page about Euclidean distance matrices) or f(r_i - r_j) = |r_i - r_j|.^[2]

Because the positions of the points {r_i} are random, the matrix elements A_ij are random too. Moreover, because the N×N elements are completely determined by only N points and, typically, one is interested in N≫d, strong correlations exist between different elements.

Hermitian Euclidean random matrices appear in various physical contexts, including supercooled liquids,^[3] phonons in disordered systems,^[4] and waves in random media.^[5]

Example 1: Consider the matrix  generated by the function f(r, r′) = sin(k₀|r-r′|)/(k₀|r-r′|), with k₀ = 2π/λ₀. This matrix is Hermitian and its eigenvalues Λ are real. For N points distributed randomly in a cube of side L and volume V = L³, one can show^[5] that the probability distribution of Λ is approximately given by the Marchenko-Pastur law, if the density of points ρ = N/V obeys ρλ₀³ ≤ 1 and 2.8N/(k₀ L)² < 1 (see figure).

A theory for the eigenvalue density of large (N≫1) non-Hermitian Euclidean random matrices has been developed^[6] and has been applied to study the problem of random laser.^[7]

Example 2: Consider the matrix  generated by the function f(r, r′) = exp(ik₀|r-r′|)/(k₀|r-r′|), with k₀ = 2π/λ₀ and f(r= r′) = 0. This matrix is not Hermitian and its eigenvalues Λ are complex. The probability distribution of Λ can be found analytically^[6] if the density of point ρ = N/V obeys ρλ₀³ ≤ 1 and 9N/(8k₀ R)² < 1 (see figure).