English

Algebraic Cuntz-Pimsner rings

Rings and Algebras 2012-03-09 v4 Operator Algebras

Abstract

From a system consisting of a right non-degenerate ring RR, a pair of RR-bimodules QQ and PP and an RR-bimodule homomorphism ψ:PQR\psi:P\otimes Q\longrightarrow R we construct a Z\Z-graded ring T(P,Q,ψ)\mathcal{T}_{(P,Q,\psi)} called the Toeplitz ring and (for certain systems) a Z\Z-graded quotient O(P,Q,ψ)\mathcal{O}_{(P,Q,\psi)} of T(P,Q,ψ)\mathcal{T}_{(P,Q,\psi)} called the Cuntz-Pimsner ring. These rings are the algebraic analogs of the Toeplitz CC^*-algebra and the Cuntz-Pimsner CC^*-algebra associated to a CC^*-correspondence (also called a Hilbert bimodule). This new construction generalizes for example the algebraic crossed product by a single automorphism, corner skew Laurent polynomial ring by a single corner automorphism and Leavitt path algebras. We also describe the structure of the graded ideals of our graded rings in terms of pairs of ideals of the coefficient ring.

Keywords

Cite

@article{arxiv.0810.3254,
  title  = {Algebraic Cuntz-Pimsner rings},
  author = {Toke Meier Carlsen and Eduard Ortega},
  journal= {arXiv preprint arXiv:0810.3254},
  year   = {2012}
}

Comments

55 pages. Version 3 is a complete rewrite of version 2. In version 4 Def. 3.14, Def. 4.6, Def. 4.8 and Remark 4.9 have been added and some minor adjustments have been made

R2 v1 2026-06-21T11:32:15.075Z