Hearing the weights of weighted projective planes

Abstract

Which properties of an orbifold can we ``hear,'' i.e., which topological and geometric properties of an orbifold are determined by its Laplace spectrum? We consider this question for a class of four-dimensional K\"ahler orbifolds: weighted projective planes M:= P2(N1,N2,N3) with three isolated singularities. We show that the spectra of the Laplacian acting on 0- and 1-forms on M determine the weights N1, N2, and N3. The proof involves analysis of the heat invariants using several techniques, including localization in equivariant cohomology. We show that we can replace knowledge of the spectrum on 1-forms by knowledge of the Euler characteristic and obtain the same result. Finally, after determining the values of N1, N2, and N3, we can hear whether M is endowed with an extremal K\"ahler metric.

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