A refinement of strong multiplicity one for spectra of hyperbolic manifolds
classification
🧮 math.SP
math.NT
keywords
calmmanifoldseigenvaluesexceptionalhyperboliclengthsmultiplicitiesrespectively
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Let $\calM_1$ and $\calM_2$ denote two compact hyperbolic manifolds. Assume that the multiplicities of eigenvalues of the Laplacian acting on $L^2(\calM_1)$ and $L^2(\calM_2)$ (respectively, multiplicities of lengths of closed geodesics in $\calM_1$ and $\calM_2$) are the same, except for a possibly infinite exceptional set of eigenvalues (respectively lengths). We define a notion of density for the exceptional set and show that if it is below a certain threshold, the two manifolds must be iso-spectral.
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