On strong nodal domains for eigenfunctions of Hamming graphs
Abstract
The Laplacian matrix of the n-dimensional hypercube has n+1 distinct eigenvalues 2i, where 0≤ i≤ n. In 2004, B y koglu, Hordijk, Leydold, Pisanski and Stadler initiated the study of eigenfunctions of hypercubes with the minimum number of weak and strong nodal domains. In particular, they proved that for every 1≤ i≤ n2 there is an eigenfunction of the hypercube with eigenvalue 2i that have exactly two strong nodal domains. Based on computational experiments, they conjectured that the result also holds for all 1≤ i≤ n-2. In this work, we confirm their conjecture for i≤ 23(n-12) if i is odd and for i≤ 23(n-1) if i is even. We also consider this problem for the Hamming graph H(n,q), q≥ 3 (for q=2, this graph coincides with the n-dimensional hypercube), and obtain even stronger results for all q≥ 3.
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