Pseudo-Laplacian on a cuspidal end with a flat unitary line bundle: Dirichlet boundary conditions
Abstract
A cuspidal end is a type of metric singularity, described as a product S1 × ] a, +∞ [ with the Poincar\'e metric. The underlying set can also be seen as R × ] a, +∞ [ subject to the action of the translation T : ( x,y ) ( x+1, y ). On it, one may consider a holomorphic line bundle L, coming from a unitary character of the group generated by T. The complex modulus induces a flat metric on L, and a pseudo-Laplacian L,0 can be associated to the Chern connection, with Dirichlet boundary conditions. The aim of this paper is to find the asymptotic behavior of the zeta-regularized determinant ( L,0 + μ ), as μ > 0 goes to infinity for any a, and also as a goes to infinity for μ = 0.
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