English

Matrix models for noncommutative algebraic manifolds

Quantum Algebra 2017-11-29 v2

Abstract

We discuss the notion of matrix model, π:C(X)MK(C(T))\pi:C(X)\to M_K(C(T)), for algebraic submanifolds of the free complex sphere, XSC,+N1X\subset S^{N-1}_{\mathbb C,+}. When KNK\in\mathbb N is fixed there is a universal such model, which factorizes as π:C(X)C(X(K))MK(C(T))\pi:C(X)\to C(X^{(K)})\subset M_K(C(T)). We have X(1)=XclassX^{(1)}=X_{class} and, under a mild assumption, inclusions X(1)X(2)X(3)XX^{(1)}\subset X^{(2)}\subset X^{(3)}\subset\ldots\subset X. Our main results concern X(2),X(3),X(4),X^{(2)},X^{(3)},X^{(4)},\ldots, their relation with various half-classical versions of XX, and lead to the construction of families of higher half-liberations of the complex spheres and of the unitary groups, all having faithful matrix models.

Keywords

Cite

@article{arxiv.1606.01115,
  title  = {Matrix models for noncommutative algebraic manifolds},
  author = {Teodor Banica and Julien Bichon},
  journal= {arXiv preprint arXiv:1606.01115},
  year   = {2017}
}

Comments

25 pages. Final version

R2 v1 2026-06-22T14:17:00.570Z