Local index formulae on noncommutative orbifolds and equivariant zeta functions for the affine metaplectic group

Publikation: Beitrag in FachzeitschriftArtikelForschungPeer-Review

Autoren

  • Anton Savin
  • Elmar Schrohe

Organisationseinheiten

Externe Organisationen

  • Peoples' Friendship University of Russia (RUDN)
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Details

OriginalspracheEnglisch
Aufsatznummer108624
FachzeitschriftAdvances in mathematics
Jahrgang409
AusgabenummerA
Frühes Online-Datum18 Aug. 2022
PublikationsstatusVeröffentlicht - 19 Nov. 2022

Abstract

We consider the algebra \(A\) of bounded operators on \(L^2(\mathbb{R}^n)\) generated by quantizations of isometric affine canonical transformations. The algebra \(A\) includes as subalgebras all noncommutative tori and toric orbifolds. We define the spectral triple \((A, H, D)\) with \(H=L^2(\mathbb R^n, \Lambda(\mathbb R^n))\) and the Euler operator \(D\), a first order differential operator of index \(1\). We show that this spectral triple has simple dimension spectrum: For every operator \(B\) in the algebra \(\Psi(A,H,D)\) generated by the Shubin type pseudodifferential operators and the elements of \(A\), the zeta function \({\zeta}_B(z) = {\rm Tr} (B|D|^{-2z})\) has a meromorphic extension to \(\mathbb C\) with at most simple poles. Our main result then is an explicit algebraic expression for the Connes-Moscovici cyclic cocycle. As a corollary we obtain local index formulae for noncommutative tori and toric orbifolds.

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Local index formulae on noncommutative orbifolds and equivariant zeta functions for the affine metaplectic group. / Savin, Anton; Schrohe, Elmar.
in: Advances in mathematics, Jahrgang 409, Nr. A, 108624, 19.11.2022.

Publikation: Beitrag in FachzeitschriftArtikelForschungPeer-Review

Savin A, Schrohe E. Local index formulae on noncommutative orbifolds and equivariant zeta functions for the affine metaplectic group. Advances in mathematics. 2022 Nov 19;409(A):108624. Epub 2022 Aug 18. doi: 10.48550/arXiv.2008.11075, 10.1016/j.aim.2022.108624
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abstract = " We consider the algebra \(A\) of bounded operators on \(L^2(\mathbb{R}^n)\) generated by quantizations of isometric affine canonical transformations. The algebra \(A\) includes as subalgebras all noncommutative tori and toric orbifolds. We define the spectral triple \((A, H, D)\) with \(H=L^2(\mathbb R^n, \Lambda(\mathbb R^n))\) and the Euler operator \(D\), a first order differential operator of index \(1\). We show that this spectral triple has simple dimension spectrum: For every operator \(B\) in the algebra \(\Psi(A,H,D)\) generated by the Shubin type pseudodifferential operators and the elements of \(A\), the zeta function \({\zeta}_B(z) = {\rm Tr} (B|D|^{-2z})\) has a meromorphic extension to \(\mathbb C\) with at most simple poles. Our main result then is an explicit algebraic expression for the Connes-Moscovici cyclic cocycle. As a corollary we obtain local index formulae for noncommutative tori and toric orbifolds. ",
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N2 - We consider the algebra \(A\) of bounded operators on \(L^2(\mathbb{R}^n)\) generated by quantizations of isometric affine canonical transformations. The algebra \(A\) includes as subalgebras all noncommutative tori and toric orbifolds. We define the spectral triple \((A, H, D)\) with \(H=L^2(\mathbb R^n, \Lambda(\mathbb R^n))\) and the Euler operator \(D\), a first order differential operator of index \(1\). We show that this spectral triple has simple dimension spectrum: For every operator \(B\) in the algebra \(\Psi(A,H,D)\) generated by the Shubin type pseudodifferential operators and the elements of \(A\), the zeta function \({\zeta}_B(z) = {\rm Tr} (B|D|^{-2z})\) has a meromorphic extension to \(\mathbb C\) with at most simple poles. Our main result then is an explicit algebraic expression for the Connes-Moscovici cyclic cocycle. As a corollary we obtain local index formulae for noncommutative tori and toric orbifolds.

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