1304.4315 (Aktito Suzuki)

Spectrum of the Laplacian on a covering graph with pendant edges I: The
one-dimensional lattice and beyond    [PDF]

Aktito Suzuki

In this paper, we examine covering graphs that are obtained from the $d$-dimensional integer lattice by adding pendant edges. In the case of $d=1$, we show that the Laplacian on the graph has a spectral gap and establish a necessary and sufficient condition under which the Laplacian has no eigenvalues. In the case of $d=2$, we show that there exists an arrangement of the pendant edges such that the Laplacian has no spectral gap.

View original: http://arxiv.org/abs/1304.4315