Maximizing the Smallest Eigenvalue of Grounded Laplacian Matrix

Abstract: For a connected graph G = (V, E) with n nodes, m edges, and Laplacian matrix L, a grounded Laplacian matrix L(S) of G is a (n − k) × (n − k) principal submatrix of L, obtained from L by deleting k rows and columns corresponding to k selected nodes forming a set S ⊆ V . The smallest eigenvalue λ(S) of L(S) plays a pivotal role in various dynamics defined on G. For example, λ(S) characterizes the convergence rate of leader-follower consensus, as well as the effectiveness of a pinning scheme for the pinning contr… Show more

“…To demonstrate and compare the efficiency of the proposed methods we compare them with the two algorithms proposed by Wang et al [14]. We implemented all the algorithms in Julia 1.7.0 using the package JuMP 0.22.1.…”

“…As a simple demonstration, by applying the idea on the Laplacian matrix in Figure 1 with k = 2 we obtained λ(S) = 1.27, the output represented in Figure 2. In contrast, the greedy-type Naïve algorithm of [14] gives the set S = {2, 4} for which we obtain λ(S) = 1.2. Note that none of these methods were able to obtain the optimal solution, that is λ(S) = 1.47 with S = {1, 5}, for this simple problem.…”

“…Finding L(S) with the maximum possible λ(S) has been shown to be an NPhard problem [14]. Thus, solution methods based on heuristics are desired.…”

“…Thus, solution methods based on heuristics are desired. The authors in [14] introduced two greedy-type algorithms. The first one, referred as the Naïve algorithm, involves k iterations.…”

New methods for maximizing the smallest eigenvalue of the grounded Laplacian matrix

“…To demonstrate and compare the efficiency of the proposed methods we compare them with the two algorithms proposed by Wang et al [14]. We implemented all the algorithms in Julia 1.7.0 using the package JuMP 0.22.1.…”

“…As a simple demonstration, by applying the idea on the Laplacian matrix in Figure 1 with k = 2 we obtained λ(S) = 1.27, the output represented in Figure 2. In contrast, the greedy-type Naïve algorithm of [14] gives the set S = {2, 4} for which we obtain λ(S) = 1.2. Note that none of these methods were able to obtain the optimal solution, that is λ(S) = 1.47 with S = {1, 5}, for this simple problem.…”

“…Finding L(S) with the maximum possible λ(S) has been shown to be an NPhard problem [14]. Thus, solution methods based on heuristics are desired.…”

“…Thus, solution methods based on heuristics are desired. The authors in [14] introduced two greedy-type algorithms. The first one, referred as the Naïve algorithm, involves k iterations.…”

New methods for maximizing the smallest eigenvalue of the grounded Laplacian matrix