Some counterexamples in the theory of quantum isometry groups

Abstract

By considering spectral triples on S2μ, c (c>0) constructed by Chakraborty and Pal (chakpal), we show that in general the quantum group of volume and orientation preserving isometries (in the sense of goswami2) for a spectral triple of compact type may not have a C*-action, and moreover, it can fail to be a matrix quantum group. It is also proved that the category with objects consisting of those volume and orientation preserving quantum isometries which induce C*-action on the C* algebra underlying the given spectral triple, may not have a universal object.