Algebraic Properties of the Ideal of Spectral Invariants for the Discrete Laplacian
Abstract
Let =q1Z q2 Z·s qdZ, with qj∈ Z+ for each j∈ \1,…,d\, and denote by the discrete Laplacian on 2( Zd). We describe various algebraic properties of the ideal of spectral invariants for the discrete Laplacian when d=1, including a construction of a Gr\"obner basis. We also present various collections of complex -periodic potentials V that are such that and + V are Floquet isospectral. We end with a discussion of the general setting, where the qi are taken to be vectors in Zd.
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