Determinants of Laplacians in exterior domains Determinants of Laplacians in exterior domains
Andrew Hassell and Steve Zelditch
Abstract:
We consider classes of simply connected planar domains which are
isophasal, ie, have the same scattering phase s(l) for all
l > 0. This is a scattering-theoretic analogue of isospectral
domains. Using the heat invariants and the determinant of the
Laplacian, Osgood, Phillips and Sarnak showed that each isospectral
class is sequentially compact in a natural C\infty topology.
This followed earlier work of Melrose who showed that the set of
curvature functions k(s) is compact in C\infty.
In this paper, we show sequential compactness of each isophasal
class of domains. To do this we define the determinant of the
exterior Laplacian and use it together with the heat invariants
(the heat invariants and the determinant being isophasal
invariants). We show that the determinant of the interior and
exterior Laplacians satisfy a Burghelea-Friedlander-Kappeler type
surgery formula. This allows a reduction to a problem on bounded
domains for which the methods of Osgood, Phillips and Sarnak can be
adapted.
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