Principal spectral rigidity implies subprincipal spectral rigidity
Abstract
We study the inverse spectral problem of jointly recovering a radially symmetric Riemannian metric and an additional coefficient from the Dirichlet spectrum of a perturbed Laplace-Beltrami operator on a bounded domain. Specifically, we consider the elliptic operator \[ La,b := ea-b ∇ · eb ∇ \] on the unit ball B ⊂ R3 , where the scalar functions a = a(|x|) and b = b(|x|) are spherically symmetric and satisfy certain geometric conditions. While the function a influences the principal symbol of L , the function b appears in its first-order terms. We investigate the extent to which the Dirichlet eigenvalues of La,b uniquely determine the pair (a, b) and establish spectral rigidity results under suitable assumptions.
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