• Preface (5)
• Contents (7)
• Abbreviations and Symbols (11)
• 1 Introduction (17)
  • References (21)
• Part INoncommutative Geometric Spaces (22)
• 2 Finite Noncommutative Spaces (23)
  • 2.1 Finite Spaces and Matrix Algebras (23)
    • 2.1.1 Commutative Matrix Algebras (27)
    • 2.1.2 Noncommutative Matrix Algebras (27)
  • 2.2 Noncommutative Geometric Finite Spaces (32)
    • 2.2.1 Morphisms Between Finite Spectral Triples (37)
  • 2.3 Classification of Finite Spectral Triples (39)
  • References (43)
• 3 Finite Real Noncommutative Spaces (45)
  • 3.1 Finite Real Spectral Triples (45)
    • 3.1.1 Morphisms Between Finite Real Spectral Triples (47)
  • 3.2 Classification of Finite Real Spectral Triples (49)
  • 3.3 Real Algebras and Krajewski Diagrams (56)
  • 3.4 Classification of Irreducible Geometries (59)
  • References (61)
• 4 Noncommutative Riemannian Spin Manifolds (62)
  • 4.1 Clifford Algebras (62)
    • 4.1.1 Representation Theory of Clifford Algebras (66)
  • 4.2 Riemannian Spin Geometry (68)
    • 4.2.1 Spin Manifolds (69)
    • 4.2.2 Spin Connection and Dirac Operator (72)
    • 4.2.3 Lichnerowicz Formula (76)
  • 4.3 Noncommutative Riemannian Spin Manifolds: Spectral Triples (77)
    • 4.3.1 Commutative Subalgebra (83)
  • References (86)
• 5 The Local Index Formula in Noncommutative Geometry (88)
  • 5.1 Local Index Formula on the Circle and on the Torus (88)
    • 5.1.1 The Winding Number on the Circle (88)
    • 5.1.2 The Winding Number on the Torus (90)
  • 5.2 Hochschild and Cyclic Cohomology (94)
  • 5.3 Abstract Differential Calculus (98)
  • 5.4 Residues and the Local (b,B)-Cocycle (103)
  • 5.5 The Local Index Formula (106)
  • References (111)
• Part IINoncommutative Geometryand Gauge Theories (113)
• 6 Gauge Theories from Noncommutative Manifolds (114)
  • 6.1 `Inner' Unitary Equivalences as the Gauge Group (114)
    • 6.1.1 The Gauge Algebra (117)
  • 6.2 Morita Self-Equivalences as Gauge Fields (118)
    • 6.2.1 Morita Equivalence (118)
    • 6.2.2 Morita Equivalence and Spectral Triples (123)
  • 6.3 Localization (125)
    • 6.3.1 Localization of Gauge Fields (128)
  • References (130)
• 7 Spectral Invariants (131)
  • 7.1 Spectral Action Functional (131)
  • 7.2 Expansions of the Spectral Action (133)
    • 7.2.1 Asymptotic Expansion (133)
    • 7.2.2 Perturbative Expansion in the Gauge Field (135)
  • 7.A Divided Differences (140)
  • References (144)
• 8 Almost-Commutative Manifolds and Gauge Theories (146)
  • 8.1 Gauge Symmetries of AC Manifolds (146)
    • 8.1.1 Unimodularity (148)
  • 8.2 Gauge Fields and Scalar Fields (150)
    • 8.2.1 Gauge Transformations (152)
  • 8.3 The Heat Expansion of the Spectral Action (153)
    • 8.3.1 A Generalized Lichnerowicz Formula (153)
    • 8.3.2 The Heat Expansion (157)
  • 8.4 The Spectral Action on AC Manifolds (160)
  • References (166)
• 9 The Noncommutative Geometry of Electrodynamics (168)
  • 9.1 The Two-Point Space (168)
    • 9.1.1 The Product Space (169)
    • 9.1.2 U(1) Gauge Theory (171)
  • 9.2 Electrodynamics (172)
    • 9.2.1 The Finite Space (173)
    • 9.2.2 A Non-trivial Finite Dirac Operator (174)
    • 9.2.3 The Almost-Commutative Manifold (175)
    • 9.2.4 The Spectral Action (176)
    • 9.2.5 The Fermionic Action (177)
    • 9.2.6 Fermionic Degrees of Freedom (179)
  • 9.A Grassmann Variables, Grassmann Integration and Pfaffians (180)
  • References (182)
• 10 The Noncommutative Geometry of Yang--Mills Fields (184)
  • 10.1 Spectral Triple Obtained from an Algebra Bundle (184)
  • 10.2 Yang--Mills Theory as a Noncommutative Manifold (188)
    • 10.2.1 From Algebra Bundles to Principal Bundles (188)
    • 10.2.2 Inner Fluctuations and Spectral Action (189)
    • 10.2.3 Topological Spectral Action (192)
  • References (193)
• 11 The Noncommutative Geometry of the Standard Model (194)
  • 11.1 The Finite Space (194)
  • 11.2 The Gauge Theory (198)
    • 11.2.1 The Gauge Group (198)
    • 11.2.2 The Gauge and Scalar Fields (200)
  • 11.3 The Spectral Action (203)
    • 11.3.1 Coupling Constants and Unification (209)
    • 11.3.2 The Higgs Mechanism (210)
  • 11.4 The Fermionic Action (214)
  • References (221)
• 12 Phenomenology of the Noncommutative Standard Model (222)
  • 12.1 Mass Relations (222)
    • 12.1.1 Fermion Masses (222)
    • 12.1.2 The Higgs Mass (223)
    • 12.1.3 The Seesaw Mechanism (224)
  • 12.2 Renormalization Group Flow (225)
    • 12.2.1 Coupling Constants (225)
    • 12.2.2 Renormalization Group Equations (227)
    • 12.2.3 Running Masses (228)
  • 12.3 Higgs Mass: Comparison to Experimental Results (231)
  • 12.4 Noncommutative Geometry Beyond the Standard Model (233)
  • References (237)
• Subject Index (240)
• Notation Index (244)