We present the importance of the pseudo-Riemannian structure in the spectral triple formalism that is used to describe the Standard Model of Particle Physics. The filnite case is briefly described and its role in the context of leptoquarks is presented. The proposal for the reverse engineering program for the Standard Model is also described, together with recent results
An interesting feature of the finite-dimensional real spectral triple (A,H,D,J) of the Standard Mode...
This is a review of recent results regarding the application of Connes' noncommutative geometry to t...
We introduce the notion of a pseudo-Riemannian spectral triple which gen-eralizes the notion of spec...
We present the importance of the pseudo-Riemannian structure in the spectral triple formalism that i...
We present the importance of the pseudo-Riemannian structure in the spectral triple formalism that i...
We present the importance of the pseudo-Riemannian structure in the spectral triple formalism that i...
We give an overview of the approach to the Standard Model of Particle Physics and its extensions bas...
Alain Connes discovered an algebraic approach to geometry where he replaced ordinary Riemannian spin...
Alain Connes discovered an algebraic approach to geometry where he replaced ordinary Riemannian spin...
We discuss the role of the pseudo-Riemannian structure of the finite spectral triple for the family ...
Abstract We introduce a new formulation of the real-spectral-triple formalism in non-commutative geo...
We give an overview of the approach to the Standard Model of Particle Physics and its extensions bas...
We give an overview of the approach to the Standard Model of Particle Physics and its extensions bas...
We show how twisting the spectral triple of the Standard Model of elementary particles naturally yie...
It is extended to twisted spectral triples the fluctuations of the metric as bounded perturbations o...
An interesting feature of the finite-dimensional real spectral triple (A,H,D,J) of the Standard Mode...
This is a review of recent results regarding the application of Connes' noncommutative geometry to t...
We introduce the notion of a pseudo-Riemannian spectral triple which gen-eralizes the notion of spec...
We present the importance of the pseudo-Riemannian structure in the spectral triple formalism that i...
We present the importance of the pseudo-Riemannian structure in the spectral triple formalism that i...
We present the importance of the pseudo-Riemannian structure in the spectral triple formalism that i...
We give an overview of the approach to the Standard Model of Particle Physics and its extensions bas...
Alain Connes discovered an algebraic approach to geometry where he replaced ordinary Riemannian spin...
Alain Connes discovered an algebraic approach to geometry where he replaced ordinary Riemannian spin...
We discuss the role of the pseudo-Riemannian structure of the finite spectral triple for the family ...
Abstract We introduce a new formulation of the real-spectral-triple formalism in non-commutative geo...
We give an overview of the approach to the Standard Model of Particle Physics and its extensions bas...
We give an overview of the approach to the Standard Model of Particle Physics and its extensions bas...
We show how twisting the spectral triple of the Standard Model of elementary particles naturally yie...
It is extended to twisted spectral triples the fluctuations of the metric as bounded perturbations o...
An interesting feature of the finite-dimensional real spectral triple (A,H,D,J) of the Standard Mode...
This is a review of recent results regarding the application of Connes' noncommutative geometry to t...
We introduce the notion of a pseudo-Riemannian spectral triple which gen-eralizes the notion of spec...
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