Quantum Gravity and Riemannian Geometry on the Fuzzy Sphere

Abstract

We study the quantum geometry of the fuzzy sphere defined as the angular momentum algebra [xi,xj]=2λp εijkxk modulo setting Σi xi2 to a constant, using a recently introduced 3D rotationally invariant differential structure. Metrics are given by symmetric 3 × 3 matrices g and we show that for each metric there is a unique quantum Levi-Civita connection with constant coefficients, with scalar curvature 12( Tr(g2)-12 Tr(g)2)/(g). As an application, we construct Euclidean quantum gravity on the fuzzy unit sphere. We also calculate the charge 1 monopole for the 3D differential structure.