Emily B. Dryden scite author profile

We study the relationship between the geometry and the Laplace spectrum of a Riemannian orbifold O via its heat kernel; as in the manifold case, the time-zero asymptotic expansion of the heat kernel furnishes geometric information about O. In the case of a good Riemannian orbifold (i.e., an orbifold arising as the orbit space of a manifold under the action of a discrete group of isometries), H. Donnelly [10] proved the existence of the heat kernel and constructed the asymptotic expansion for the heat trace. We extend Donnelly's work to the case of general compact orbifolds. Moreover, in both the good case and the general case, we express the heat invariants in a form that clarifies the asymptotic contribution of each part of the singular set of the orbifold. We calculate several terms in the asymptotic expansion explicitly in the case of two-dimensional orbifolds; we use these terms to prove that the spectrum distinguishes elements within various classes of two-dimensional orbifolds.

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Bounding the eigenvalues of the Laplace-Beltrami operator on compact submanifolds

Colbois¹,

Dryden

Soufi³

2009

Bulletin of the London Mathematical Society

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Abstract. We give upper bounds for the eigenvalues of the Laplace-Beltrami operator of a compact m-dimensional submanifold M of R m+p . Besides the dimension and the volume of the submanifold and the order of the eigenvalue, these bounds depend on either the maximal number of intersection points of M with a pplane in a generic position (transverse to M ), or an invariant which measures the concentration of the volume of M in R m+p . These bounds are asymptotically optimal in the sense of the Weyl law. On the other hand, we show that even for hypersurfaces (i.e., when p = 1), the first positive eigenvalue cannot be controlled only in terms of the volume, the dimension and (for m ≥ 3) the differential structure.

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Semi-classical weights and equivariant spectral theory

Dryden

Guillemin

Sena-Dias³

2016

Advances in Mathematics

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We prove inverse spectral results for differential operators on manifolds and orbifolds invariant under a torus action. These inverse spectral results involve the asymptotic equivariant spectrum, which is the spectrum itself together with "very large" weights of the torus action on eigenspaces. More precisely, we show that the asymptotic equivariant spectrum of the Laplace operator of any toric metric on a generic toric orbifold determines the equivariant biholomorphism class of the orbifold; we also show that the asymptotic equivariant spectrum of a T n -invariant Schrödinger operator on R n determines its potential in some suitably convex cases. In addition, we prove that the asymptotic equivariant spectrum of an S 1 -invariant metric on S 2 determines the metric itself in many cases. Finally, we obtain an asymptotic equivariant inverse spectral result for weighted projective spaces. As a crucial ingredient in these inverse results, we derive a surprisingly simple formula for the asymptotic equivariant trace of a family of semi-classical differential operators invariant under a torus action.

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Semi-classical weights and equivariant spectral theory

Dryden¹,

Guillemin²,

Sena-Dias³

2014

Preprint

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Collars and partitions of hyperbolic cone-surfaces

Dryden

Parlier

2007

Geom Dedicata

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Emily B. Dryden

Asymptotic expansion of the heat kernel for orbifolds

Bounding the eigenvalues of the Laplace-Beltrami operator on compact submanifolds

Semi-classical weights and equivariant spectral theory

Semi-classical weights and equivariant spectral theory

Collars and partitions of hyperbolic cone-surfaces

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