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Zeta-invariants of the Steklov spectrum for a planar domain

Published 8 Apr 2014 in math.DG | (1404.2117v1)

Abstract: The classical inverse problem of recovering a simply connected smooth planar domain from the Steklov spectrum \cite{E} is equivalent to the problem of recovering, up to a conformal equivalence, a positive function $a\in C\infty({\mathbb S})$ on the unit circle ${\mathbb S}={e{i\theta}}$ from the eigenvalue spectrum of the operator $a\Lambda_e$, where $\Lambda_e=(-d2/d\theta2){1/2}$. We introduce $2k$-forms $Z_k(a)\ (k=1,2,\dots)$ in Fourier coefficients of the function $a$ which are called zeta-invariants. They are uniquely determined by the eigenvalue spectrum of $a\Lambda_e$. We study some properties of $Z_k(a)$, in particular, their invariance under the conformal group. Some open questions on zeta-invariants are posed at the end of the paper.

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