Characterization, spectral invariance and the fredholm property of multi-quasi-elliptic operators

Publikation: Beitrag in FachzeitschriftArtikelForschungPeer-Review

Autoren

  • Paolo Boggiatto
  • Elmar Schrohe

Externe Organisationen

  • Università di Torino
  • Universität Potsdam
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Details

OriginalspracheEnglisch
Seiten (von - bis)229-242
Seitenumfang14
FachzeitschriftRendiconti del Seminario Matematico
Jahrgang59
Ausgabenummer4
PublikationsstatusVeröffentlicht - 2001
Extern publiziertJa

Abstract

The class L0ρ,Ρ(ℝn) of pseudodifferential operators of zero order, modelled on a multi-quasi-elliptic weight, is shown to be a Ψ *-algebra in the algebra Β(L 2(ℝn)) of all bounded operators on L 2(ℝn). Moreover, the Fredholm property is proven to characterize the elliptic elements in this algebra. This is achieved through a characterization of these operators in terms of the mapping properties between the Sobolev spaces Hs ρ(ℝn) of their iterated commutators with multiplication operators and vector fields. We also prove and make use of the fact that order reduction holds in the scale of the Hs ρ(ℝn)-Sobolev spaces, that is every Hs ρ(ℝn) is homeomorphic to L 2n) through a suitablemulti-quasielliptic operator of order s.

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Characterization, spectral invariance and the fredholm property of multi-quasi-elliptic operators. / Boggiatto, Paolo; Schrohe, Elmar.
in: Rendiconti del Seminario Matematico, Jahrgang 59, Nr. 4, 2001, S. 229-242.

Publikation: Beitrag in FachzeitschriftArtikelForschungPeer-Review

Boggiatto P, Schrohe E. Characterization, spectral invariance and the fredholm property of multi-quasi-elliptic operators. Rendiconti del Seminario Matematico. 2001;59(4):229-242.
Boggiatto, Paolo ; Schrohe, Elmar. / Characterization, spectral invariance and the fredholm property of multi-quasi-elliptic operators. in: Rendiconti del Seminario Matematico. 2001 ; Jahrgang 59, Nr. 4. S. 229-242.
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N2 - The class L0ρ,Ρ(ℝn) of pseudodifferential operators of zero order, modelled on a multi-quasi-elliptic weight, is shown to be a Ψ *-algebra in the algebra Β(L 2(ℝn)) of all bounded operators on L 2(ℝn). Moreover, the Fredholm property is proven to characterize the elliptic elements in this algebra. This is achieved through a characterization of these operators in terms of the mapping properties between the Sobolev spaces Hs ρ(ℝn) of their iterated commutators with multiplication operators and vector fields. We also prove and make use of the fact that order reduction holds in the scale of the Hs ρ(ℝn)-Sobolev spaces, that is every Hs ρ(ℝn) is homeomorphic to L 2(Ρn) through a suitablemulti-quasielliptic operator of order s.

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