Geometric invariants of spectrum of the Navier-Lam\'e operator

Abstract

For a compact connected Riemannian n-manifold (,g) with smooth boundary, we explicitly calculate the first two coefficients a0 and a1 of the asymptotic expansion of Σk=1∞ e-t τk= a0t-n/2 a1 t-(n-1)/2+a2 t-(n-2)/2 +·s+ am t-(n-m)/2 +O(t-(n-m-1)/2) as t 0+, where τ-k (respectively, τ+k) is the k-th Navier-Lam\'e eigenvalue on with Dirichlet (respectively, Neumann) boundary condition. These two coefficients provide precise information for the volume of the elastic body and the surface area of the boundary ∂ in terms of the spectrum of the Navier-Lam\'e operator. This gives an answer to an interesting and open problem mentioned by Avramidi in Avr10. More importantly, our method is valid to explicitly calculate all the coefficients al, 2 l m, in the above asymptotic expansion. As an application, we show that an n-dimensional ball is uniquely determined by its Navier-Lam\'e spectrum among all bounded elastic bodies with smooth boundary.