Add to ORKGWe introduce gauge networks as generalizations of spin networks and lattice gauge fields to almost-commutative manifolds. The configuration space of quiver representations (modulo equivalence) in the category of finite spectral triples is studied; gauge networks appear as an orthonormal basis in a corresponding Hilbert space. We give many examples of gauge networks, also beyond the well-known spin network examples. We find a Hamiltonian operator on this Hilbert space, inducing a time evolution on the C^∗-algebra of gauge network correspondences. Given a representation in the category of spectral triples of a quiver embedded in a spin manifold, we define a discretized Dirac operator on the quiver. We compute the spectral action of this Di...
We continue the study of fuzzy geometries inside Connes' spectral formalism and their relation to mu...
We present a new, general approach to gauge theory on principal $G$-spectral triples, where $G$ is a...
International audienceWe investigate the representation of diffeomorphisms in Connes’ spectral tripl...
We introduce gauge networks as generalizations of spin networks and lattice gauge fields to almost-c...
Abstract. We introduce gauge networks as generalizations of spin networks and lattice gauge fields t...
Abstract. We introduce gauge networks as generalizations of spin networks and lattice gauge fields t...
We explore factorizations of noncommutative Riemannian spin geometries over commutative base manifol...
We are unable to formulate lattice gauge theories in the framework of Connes' spectral triples
Gauge theories on graphs and networks are attracting increasing attention not only as approaches to ...
It is extended to twisted spectral triples the fluctuations of the metric as bounded perturbations o...
We study the relation between Donaldson–Thomas theory of Calabi–Yau threefolds and a six-dimensional...
Recently, we have found the supersymmetric counterpart of the spectral triple. When we restrict the ...
Motivated by the quantum measurement problem, we develop an algebro-geometric formulation using nonc...
A review of the relationships between matrix models and noncommutative gauge theory is presented. A ...
AbstractGiven a real-analytic manifoldM, a compact connected Lie groupGand a principalG-bundleP→M, t...
We continue the study of fuzzy geometries inside Connes' spectral formalism and their relation to mu...
We present a new, general approach to gauge theory on principal $G$-spectral triples, where $G$ is a...
International audienceWe investigate the representation of diffeomorphisms in Connes’ spectral tripl...
We introduce gauge networks as generalizations of spin networks and lattice gauge fields to almost-c...
Abstract. We introduce gauge networks as generalizations of spin networks and lattice gauge fields t...
Abstract. We introduce gauge networks as generalizations of spin networks and lattice gauge fields t...
We explore factorizations of noncommutative Riemannian spin geometries over commutative base manifol...
We are unable to formulate lattice gauge theories in the framework of Connes' spectral triples
Gauge theories on graphs and networks are attracting increasing attention not only as approaches to ...
It is extended to twisted spectral triples the fluctuations of the metric as bounded perturbations o...
We study the relation between Donaldson–Thomas theory of Calabi–Yau threefolds and a six-dimensional...
Recently, we have found the supersymmetric counterpart of the spectral triple. When we restrict the ...
Motivated by the quantum measurement problem, we develop an algebro-geometric formulation using nonc...
A review of the relationships between matrix models and noncommutative gauge theory is presented. A ...
AbstractGiven a real-analytic manifoldM, a compact connected Lie groupGand a principalG-bundleP→M, t...
We continue the study of fuzzy geometries inside Connes' spectral formalism and their relation to mu...
We present a new, general approach to gauge theory on principal $G$-spectral triples, where $G$ is a...
International audienceWe investigate the representation of diffeomorphisms in Connes’ spectral tripl...