arXiv: Quantum Algebra | 2019
Covariant connections on bicovariant differential calculus
Abstract
Given a bicovariant differential calculus $(\\mathcal{E}, d)$ such that the braiding map is diagonalisable in a certain sense, the bimodule of two-tensors admits a direct sum decomposition into symmetric and anti-symmetric tensors. This is used to prove the existence of a bicovariant torsionless connection on $\\mathcal{E}$. Following Heckenberger and Schm{\\ u}dgen, we study invariant metrics and the compatibility of covariant connections with such metrics. A sufficient condition for the existence and uniqueness of bicovariant Levi-Civita connections is derived. This condition is shown to hold for cocycle deformations of classical Lie groups.