Add to ORKGLet O-2n be a symplectic toric orbifold with a fixed T-n-action and with a tonic Kahler metric g. In [10] we explored whether, when O is a manifold, the equivariant spectrum of the Laplace Delta(g) operator on C-infinity(O) determines O up to symplectomorphism. In the setting of tonic orbifolds we shmilicantly improve upon our previous results and show that a generic tone orbifold is determined by its equivariant spectrum, up to two possibilities. This involves developing the asymptotic expansion of the heat trace on an orbifold in the presence of an isometry. We also show that the equivariant spectrum determines whether the toric Kahler metric has constant scalar curvature. (C) 2012 Elsevier Inc. All rights reserved
2. Line bundles over tori: construction and classification. 3 3. Inverse spectral results on rectang...
In this paper we consider a compact Riemannian manifold or submanifold M, with an involutive isometr...
spectral problems on hyperbolic manifolds and their applications to inverse boundary value problems ...
AbstractLet O2n be a symplectic toric orbifold with a fixed Tn-action and with a toric Kähler metric...
Original manuscript July 5, 2011Let O[superscript 2n] be a symplectic toric orbifold with a fixed T[...
Let M^{2n} be a symplectic toric manifold with a fixed T^n-action and with a toric K\ ahler metric g...
Author's final manuscript June 18, 2012Let M[superscript 2n] be a symplectic toric manifold with a f...
We prove an inverse spectral result for S1-invariant metrics on S2 based on the so-called asymptotic...
Die Spektralgeometrie untersucht inwiefern Eigenschaften von Differentialoperatoren und zugrunde lie...
Historically, inverse spectral theory has been concerned with the relationship between the geometry ...
24 pages. Added some more details and corrected an estimate. Fixed some typosInternational audienceI...
We answer Mark Kac’s famous question [K], “can one hear the shape of a drum?” in the positive for or...
Abstract Which properties of an orbifold can we “hear, ” i.e., which topological and geometric prope...
We examine the relationship between the singular set of a compact Riemann- ian orbifold and the spe...
Spectral theory is the study of Mark Kac's famous question [K], "can one hear the shape of a drum?" ...
2. Line bundles over tori: construction and classification. 3 3. Inverse spectral results on rectang...
In this paper we consider a compact Riemannian manifold or submanifold M, with an involutive isometr...
spectral problems on hyperbolic manifolds and their applications to inverse boundary value problems ...
AbstractLet O2n be a symplectic toric orbifold with a fixed Tn-action and with a toric Kähler metric...
Original manuscript July 5, 2011Let O[superscript 2n] be a symplectic toric orbifold with a fixed T[...
Let M^{2n} be a symplectic toric manifold with a fixed T^n-action and with a toric K\ ahler metric g...
Author's final manuscript June 18, 2012Let M[superscript 2n] be a symplectic toric manifold with a f...
We prove an inverse spectral result for S1-invariant metrics on S2 based on the so-called asymptotic...
Die Spektralgeometrie untersucht inwiefern Eigenschaften von Differentialoperatoren und zugrunde lie...
Historically, inverse spectral theory has been concerned with the relationship between the geometry ...
24 pages. Added some more details and corrected an estimate. Fixed some typosInternational audienceI...
We answer Mark Kac’s famous question [K], “can one hear the shape of a drum?” in the positive for or...
Abstract Which properties of an orbifold can we “hear, ” i.e., which topological and geometric prope...
We examine the relationship between the singular set of a compact Riemann- ian orbifold and the spe...
Spectral theory is the study of Mark Kac's famous question [K], "can one hear the shape of a drum?" ...
2. Line bundles over tori: construction and classification. 3 3. Inverse spectral results on rectang...
In this paper we consider a compact Riemannian manifold or submanifold M, with an involutive isometr...
spectral problems on hyperbolic manifolds and their applications to inverse boundary value problems ...
