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- Riemann–Roch_theorem_for_smooth_manifolds abstract "In mathematics, a Riemann–Roch theorem for smooth manifolds is a version of results such as the Hirzebruch–Riemann–Roch theorem or Grothendieck–Riemann–Roch theorem (GRR) without a hypothesis making the smooth manifolds involved carry a complex structure. Results of this kind were obtained by Michael Atiyah and Friedrich Hirzebruch in 1959, reducing the requirements to something like a spin structure.".
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageID "3011773".
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageLength "3257".
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageOutDegree "19".
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageRevisionID "647229730".
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Category:Algebraic_surfaces.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Category:Theorems_in_differential_geometry.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Chern_character.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Chern_class.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Closed_manifold.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Cohomology.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Cohomology_group.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Complex_manifold.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Differentiable_manifold.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Friedrich_Hirzebruch.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Grothendieck–Riemann–Roch_theorem.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Gysin_homomorphism.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Gysin_sequence.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Hirzebruch–Riemann–Roch_theorem.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink J-homomorphism.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink K-theory.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink K_theory.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Mathematics.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Michael_Atiyah.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Pontryagin_class.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Smooth_manifold.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Spin_structure.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Splitting_principle.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLink Thom_space.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageWikiLinkText "Riemann–Roch theorem for smooth manifolds".
- Riemann–Roch_theorem_for_smooth_manifolds hasPhotoCollection Riemann–Roch_theorem_for_smooth_manifolds.
- Riemann–Roch_theorem_for_smooth_manifolds wikiPageUsesTemplate Template:Reflist.
- Riemann–Roch_theorem_for_smooth_manifolds subject Category:Algebraic_surfaces.
- Riemann–Roch_theorem_for_smooth_manifolds subject Category:Theorems_in_differential_geometry.
- Riemann–Roch_theorem_for_smooth_manifolds comment "In mathematics, a Riemann–Roch theorem for smooth manifolds is a version of results such as the Hirzebruch–Riemann–Roch theorem or Grothendieck–Riemann–Roch theorem (GRR) without a hypothesis making the smooth manifolds involved carry a complex structure. Results of this kind were obtained by Michael Atiyah and Friedrich Hirzebruch in 1959, reducing the requirements to something like a spin structure.".
- Riemann–Roch_theorem_for_smooth_manifolds label "Riemann–Roch theorem for smooth manifolds".
- Riemann–Roch_theorem_for_smooth_manifolds sameAs m.08kgnn.
- Riemann–Roch_theorem_for_smooth_manifolds sameAs Q17102744.
- Riemann–Roch_theorem_for_smooth_manifolds sameAs Q17102744.
- Riemann–Roch_theorem_for_smooth_manifolds wasDerivedFrom Riemann–Roch_theorem_for_smooth_manifolds?oldid=647229730.
- Riemann–Roch_theorem_for_smooth_manifolds isPrimaryTopicOf Riemann–Roch_theorem_for_smooth_manifolds.