Notes on quantum weighted projective spaces and multidimensional teardrops

Abstract

It is shown that the coordinate algebra of the quantum 2n+1-dimensional lens space O(L2n+1q(Πi=0n mi; m0,…, mn)) is a principal Z-comodule algebra or the coordinate algebra of a circle principal bundle over the weighted quantum projective space WPnq(m0,…, mn). Furthermore, the weighted U(1)-action or the CZ-coaction on the quantum odd dimensional sphere algebra O(S2n+1q) that defines WPnq(1,m1,…, mn) is free or principal. Analogous results are proven for quantum real weighted projective spaces RP2nq(m0,…, mn). The K-groups of WPnq(1,…, 1, m) and RP2nq(1,…, 1,m) and the K1-group of L2n+1q(N; m0,…, mn) are computed