Quantum Kaluza-Klein theory with $M_2(\mathbb{C})$
Abstract
Following steps analogous to classical Kaluza-Klein theory, we solve for the quantum Riemannian geometry on in terms of classical Riemannian geometry on a smooth manifold , a finite quantum geometry on the algebra of matrices, and a quantum metric cross term. Fixing a standard form of quantum metric on , we show that this cross term data amounts in the simplest case to a 1-form on , which we regard as like a gauge-fixed background field. We show in this case that a real scalar field on the product algebra with its noncommutative Laplacian decomposes on into two real neutral fields and one complex charged field minimally coupled to . We show further that the quantum Ricci scalar on the product decomposes into a classical Ricci scalar on , the Ricci scalar on , the Maxwell action of and a higher order term. Another solution of the QRG on the product has and a dynamical real scalar field on which imparts mass-splitting to some of the components of a scalar field on the product as in previous work.
Cite
@article{arxiv.2303.06239,
title = {Quantum Kaluza-Klein theory with $M_2(\mathbb{C})$},
author = {Chengcheng Liu and Shahn Majid},
journal= {arXiv preprint arXiv:2303.06239},
year = {2023}
}