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- Dirac_spectrum abstract "In mathematics, a Dirac spectrum, named after Paul Dirac, is the spectrum of eigenvalues of a Dirac operator on a Riemannian manifold with a spin structure. The isospectral problem for the Dirac spectrum asks whether two Riemannian spin manifolds have identical spectra. The Dirac spectrum depends on the spin structure in the sense that there exists a Riemannian manifold with two different spin structures that have different Dirac spectra.".
- Dirac_spectrum wikiPageID "28925553".
- Dirac_spectrum wikiPageLength "952".
- Dirac_spectrum wikiPageOutDegree "14".
- Dirac_spectrum wikiPageRevisionID "387234907".
- Dirac_spectrum wikiPageWikiLink Angle-resolved_photoemission_spectroscopy.
- Dirac_spectrum wikiPageWikiLink Category:Quantum_mechanics.
- Dirac_spectrum wikiPageWikiLink Category:Spectral_theory.
- Dirac_spectrum wikiPageWikiLink Dirac_operator.
- Dirac_spectrum wikiPageWikiLink Dirichlet_eigenvalue.
- Dirac_spectrum wikiPageWikiLink Eigenvalues_and_eigenvectors.
- Dirac_spectrum wikiPageWikiLink Hearing_the_shape_of_a_drum.
- Dirac_spectrum wikiPageWikiLink Isospectral.
- Dirac_spectrum wikiPageWikiLink Mathematics.
- Dirac_spectrum wikiPageWikiLink Paul_Dirac.
- Dirac_spectrum wikiPageWikiLink Riemannian_manifold.
- Dirac_spectrum wikiPageWikiLink Spectral_asymmetry.
- Dirac_spectrum wikiPageWikiLink Spin_structure.
- Dirac_spectrum wikiPageWikiLinkText "Dirac spectrum".
- Dirac_spectrum wikiPageUsesTemplate Template:Mathanalysis-stub.
- Dirac_spectrum wikiPageUsesTemplate Template:Quantum-stub.
- Dirac_spectrum wikiPageUsesTemplate Template:Reflist.
- Dirac_spectrum subject Category:Quantum_mechanics.
- Dirac_spectrum subject Category:Spectral_theory.
- Dirac_spectrum hypernym Spectrum.
- Dirac_spectrum type Disease.
- Dirac_spectrum type Algebra.
- Dirac_spectrum type Mechanic.
- Dirac_spectrum type Physic.
- Dirac_spectrum comment "In mathematics, a Dirac spectrum, named after Paul Dirac, is the spectrum of eigenvalues of a Dirac operator on a Riemannian manifold with a spin structure. The isospectral problem for the Dirac spectrum asks whether two Riemannian spin manifolds have identical spectra. The Dirac spectrum depends on the spin structure in the sense that there exists a Riemannian manifold with two different spin structures that have different Dirac spectra.".
- Dirac_spectrum label "Dirac spectrum".
- Dirac_spectrum sameAs Q5280162.
- Dirac_spectrum sameAs m.0dgpgry.
- Dirac_spectrum sameAs Q5280162.
- Dirac_spectrum wasDerivedFrom Dirac_spectrum?oldid=387234907.
- Dirac_spectrum isPrimaryTopicOf Dirac_spectrum.