The Matrix Chern-Simons One-form as a Universal Chern-Simons Theory

Abstract

We consider different large N limits of the one-dimensional Chern-Simons action i∫ dt~ (0 +A0) where A0 is an N× N antihermitian matrix. The Hilbert space on which A0 acts as a linear transformation is taken as the quantization of a 2k-dimensional phase space M with different gauge field backgrounds. For slowly varying fields, the large N limit of the one-dimensional CS action is equal to the (2k+1)-dimensional CS theory on M× R. Different large N limits are parametrized by the gauge fields and the dimension 2k. The result is related to the bulk action for quantum Hall droplets in higher dimensions. Since the isometries of M are gauged, this has implications for gravity on fuzzy spaces. This is also briefly discussed.