Geometry from the spectral point of view

The Hochschild class of the Chern character for semifinite spectral triples ⋮ Dixmier traces and non-commutative analysis ⋮ Bootstrapping Dirac ensembles ⋮ TWISTED ENTIRE CYCLIC COHOMOLOGY, J-L-O COCYCLES AND EQUIVARIANT SPECTRAL TRIPLES ⋮ NONUNITAL SPECTRAL TRIPLES ASSOCIATED TO DEGENERATE METRICS ⋮ Noncommutative spectral geometry of Riemannian foliations ⋮ Periods and motives in the spectral action of Robertson-Walker spacetimes ⋮ Spectral triples and manifolds with boundary ⋮ Pseudo-Riemannian spectral triples and the harmonic oscillator ⋮ Fractality in cosmic topology models with spectral action gravity ⋮ A noncommutative Tauberian theorem and Weyl asymptotics in noncommutative geometry ⋮ Noncommutative geometry for symmetric non-self-adjoint operators ⋮ Tensors and algebras: an algebraic spacetime interpretation for tensor models ⋮ Constructing KMS states from infinite-dimensional spectral triples ⋮ Early universe models from noncommutative geometry ⋮ On the spectral characterization of manifolds ⋮ Codes as fractals and noncommutative spaces ⋮ Michelangelo's stone: an argument against Platonism in mathematics ⋮ A reconstruction theorem for almost-commutative spectral triples ⋮ Noncommutative geometry of foliations ⋮ On the \(K\)-theory of graph \(C^{*}\)-algebras ⋮ Heat trace and spectral action on the standard Podleś sphere ⋮ Zeta functions that hear the shape of a Riemann surface ⋮ Advances in Dixmier traces and applications ⋮ Spectral triple and Sinai-Ruelle-Bowen measures ⋮ Fluctuating Commutative Geometry ⋮ The Egorov theorem for transverse Dirac-type operators on foliated manifolds ⋮ Quantum statistical mechanics in arithmetic topology ⋮ Gauge theory on noncommutative Riemannian principal bundles ⋮ The spectral length of a map between Riemannian manifolds ⋮ The Ricci flow on noncommutative two-tori ⋮ Graphs, spectral triples and Dirac zeta functions ⋮ Twisted spectral triples and quantum statistical mechanical systems ⋮ Euler characteristics and Gysin sequences for group actions on boundaries ⋮ REGULARIZED CALCULUS: AN APPLICATION OF ZETA REGULARIZATION TO INFINITE DIMENSIONAL GEOMETRY AND ANALYSIS ⋮ The local index formula in semifinite von Neumann algebras. I: Spectral flow ⋮ On boundary value problems for Dirac type operators. I: Regularity and self-adjointness ⋮ COMMUTATIVE GEOMETRIES ARE SPIN MANIFOLDS ⋮ Tadpoles and commutative spectral triples ⋮ The Dixmier trace and asymptotics of zeta functions ⋮ Untwisting twisted spectral triples ⋮ A UNITARY INVARIANT IN RIEMANNIAN GEOMETRY ⋮ Adinkras, dessins, origami, and supersymmetry spectral triples ⋮ Index theory for locally compact noncommutative geometries ⋮ Coupling of gravity to matter, spectral action and cosmic topology ⋮ Random walks on groups and KMS states ⋮ The notion of dimension in geometry and algebra ⋮ Bell polynomials and Brownian bridge in spectral gravity models on multifractal Robertson-Walker cosmologies ⋮ Spectral action on \(\mathrm{SU}_q(2)\) ⋮ BUILDING COSMOLOGICAL MODELS VIA NONCOMMUTATIVE GEOMETRY ⋮ Applications of Connes' geodesic flow to trace formulas in noncommutative geometry ⋮ Hecke operators in \(KK\)-theory and the \(K\)-homology of Bianchi groups ⋮ Egorov's theorem for transversally elliptic operators on foliated manifolds and noncommutative geodesic flow ⋮ Spectral triples in Arakelov geometry ⋮ On noncommutative and pseudo-Riemannian geometry ⋮ DIRAC OPERATORS ON NONCOMMUTATIVE PRINCIPAL CIRCLE BUNDLES ⋮ From noncommutative geometry to random matrix theory ⋮ Conformal Markov systems, Patterson-Sullivan measure on limit sets and spectral triples ⋮ Phase transition in random noncommutative geometries

• Groups of polynomial growth and expanding maps. Appendix by Jacques Tits
• Cyclic cohomology, the Novikov conjecture and hyperbolic groups
• The local index formula in noncommutative geometry
• Particle models and noncommutative geometry
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