Listening to the shape of a drum

Abstract

The aim of this work is to link the quasiconformal geometry of a Euclidean domain U to the spectral properties of its Dirichlet integral , through the algebra of multipliers (H1,2(U)) of the Sobolev space. In the main result we prove that a homeomorphism γ:Uγ(U) between Euclidean domains, giving rise to an algebraic isomorphism a aγ between (H1,2(γ(V))) and (H1,2(V)) for any relatively compact domain V⊂eq U and leaving invariant the corresponding fundamental tones (first non zero eigenvalues) of \[ μ1(γ(V),a)=μ1(V,aγ)\, , \] is quasiconformal. A companion characterization hold true for bounded distortion maps. In the converse direction we prove that for n 3\\ i) the M\"obius group G(n) acts isometrically on the algebra of multipliers (H1,2e(n)) of the extended space H1,2e(n)\\ ii) (,H1,2(n)) is a closable quadratic form on L2(n,[a]) with respect to the energy measure [a]=|∇ a|2\, dx of any a∈ (H1,2e(n))\\ iii) for any γ∈ G(n), the form closure (,a) of (,H1,2(n)) is a Dirichlet form on L2(n,[a]), unitarily equivalent to (,aγ) on L2(n,[aγ]). The results are based on connections between fundamental tones and ergodic properties of multipliers: in particular, it is shown that the fundamental tone of (,a) on L2(U,[a]) is non vanishing μ1(U,a)>0 for any fully supported a∈(H1,2(U)), provided there exists a spectral gap for the usual Laplacian.