On the multiplicity of the eigenvalues of discrete tori

Abstract

It is well known that the standard flat torus T2=R2/2 has arbitrarily large Laplacian-eigenvalue multiplicities. We prove, however, that 24 is the optimal upper bound for the multiplicities of the nonzero eigenvalues of a 2-dimensional discrete torus. For general higher dimension discrete tori, we characterize the eigenvalues with large multiplicities. As consequences, we get uniform boundedness results of the multiplicity for a long range and an optimal global bound for the multiplicity. Our main tool of proof is the theory of vanishing sums of roots of unity.

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