$O(D)-$equivariant fuzzy hyperspheres
Abstract
Fuzzy hyperspheres of dimension are constructed here generalizing the procedure adopted in [G. Fiore, F. Pisacane, J. Geom. Phys. 132 (2018), 423-451] for . The starting point is an ordinary quantum particle in , , subject to a rotation invariant potential well with a very sharp minimum on the sphere of radius . The subsequent imposition of a sufficiently low energy cutoff `freezes' the radial excitations, this makes only a finite-dimensional Hilbert subspace accessible and on it the coordinates noncommutative {\it \`a la Snyder}. In addition, the coordinate operators generate the whole algebra of observables which turns out to be realizable through a suitable irreducible vector representation of . This construction is equivariant not only under , but under the full orthogonal group , and making the cutoff and the depth of the well grow with a natural number , the result is a sequence of fuzzy spheres converging to as (where one recovers ordinary quantum mechanics on ).
Keywords
Cite
@article{arxiv.2002.01901,
title = {$O(D)-$equivariant fuzzy hyperspheres},
author = {Francesco Pisacane},
journal= {arXiv preprint arXiv:2002.01901},
year = {2020}
}
Comments
71 pages, 2 figures