Kirpichnikova, Anna and Yaroslav, Kurylev (2012) Inverse boundary spectral problem for Riemannian polyhedra. Mathematische Annalen, 354 (3). pp. 1003-1028. ISSN 1432-1807Full text not available from this repository. (Request a copy)
We consider a Riemannian polyhedron of a special type with a piecewise smooth boundary. The associated Neumann Laplacian defines the boundary spectral data as the set of eigenvalues and restrictions to the boundary of the corresponding eigenfunctions. In this paper we prove that the boundary spectral data prescribed on an open subset of the polyhedron boundary determine this polyhedron uniquely, i.e. up to an isometry.
|Subjects:||Q Science > QA Mathematics > QA75 Electronic computers. Computer science|
|Faculty / Department:||Faculty of Science > Mathematics and Computer Science|
|Depositing User:||Users 3 not found.|
|Date Deposited:||26 Nov 2013 12:28|
|Last Modified:||05 Mar 2014 13:25|
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