On multimatrix models motivated by random noncommutative geometry. II: A Yang-Mills-Higgs matrix model
DOI10.1007/s00023-021-01138-wzbMath1497.81082arXiv2105.01025OpenAlexW3158550123MaRDI QIDQ2144560
Publication date: 14 June 2022
Published in: Annales Henri Poincaré (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2105.01025
Unified quantum theories (81V22) Theory of fuzzy sets, etc. (03E72) Spectrum, resolvent (47A10) Yang-Mills and other gauge theories in quantum field theory (81T13) Path integrals in quantum mechanics (81S40) Finite-dimensional groups and algebras motivated by physics and their representations (81R05) Noncommutative geometry in quantum theory (81R60) Canonical quantization (81S08)
Related Items (4)
Cites Work
- Blobbed topological recursion
- Gauge networks in noncommutative geometry
- Second moment fuzzy-field-theory-like matrix models
- Invariants of algebraic curves and topological expansion
- Noncommutative geometry, quantum fields and motives
- Classification of finite spectral triples
- The spectral action principle
- The standard model in noncommutative geometry: fundamental fermions as internal forms
- Vector bundles for ``matrix algebras converge to the sphere
- On the spectral characterization of manifolds
- Spectral truncations in noncommutative geometry and operator systems
- Riemannian geometry of a discretized circle and torus
- Second quantization and the spectral action
- Braided \(L_{\infty}\)-algebras, braided field theory and noncommutative gravity
- Reconstructing manifolds from truncations of spectral triples
- On multimatrix models motivated by random noncommutative geometry. I: The functional renormalization group as a flow in the free algebra
- Noncommutative geometry and particle physics
- Entropy and the spectral action
- Noncommutative geometry and the BV formalism: application to a matrix model
- Generalized fuzzy torus and its modular properties
- Spectral geometry with a cut-off: topological and metric aspects
- Gravity and the standard model with neutrino mixing
- A Combinatorial Perspective on Quantum Field Theory
- Schwinger-Dyson equations: classical and quantum
- Matrix geometries and fuzzy spaces as finite spectral triples
- Leibniz seminorms for "Matrix algebras converge to the sphere"
- Monte Carlo simulations of random non-commutative geometries
- A survey of spectral models of gravity coupled to matter
- Lorentzian version of the noncommutative geometry of the standard model of particle physics
- The algebra of grand unified theories
- The fuzzy sphere
- Gromov-Hausdorff distance for quantum metric spaces
- Higher spin gauge theory on fuzzy $\boldsymbol {S^4_N}$
- PARTICLE PHYSICS FROM ALMOST-COMMUTATIVE SPACETIMES
- Discrete spectral triples and their symmetries
- Spectral estimators for finite non-commutative geometries
- Understanding truncated non-commutative geometries through computer simulations
- Differentiable Manifolds
- A U(1)B−L-extension of the standard model from noncommutative geometry
- Scaling behaviour in random non-commutative geometries
- Almost-commutative geometries beyond the standard model
- Matricial bridges for “Matrix algebras converge to the sphere”
- Phase transition in random noncommutative geometries
- Quantum (matrix) geometry and quasi-coherent states
- From large \(N\) matrices to the noncommutative torus
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