Real McKay Correspondence: KR-Theory of Graded Kleinian Groups

Abstract

This project considers the finite symmetry subgroups of the orthogonal group O(3) ⊂ GL(3,R) and the index 2 containments G G. The special orthogonal group SO(3) ⊂ SL(3,R) admits a double cover from the spinor group Spin(3) SU(2) ⊂ SL(2,C), and lifting our subgroups up preserves the network of containments. Those subgroups not contained in SO(3) ⊂ O(3) are lifted to the pinor groups Pin(3) of which there are two choices. For the index 2 containments G G, we calculate the Real and complex Frobenius-Schur indicators, and apply Dyson's classification of antilinear block structures to produce decorated McKay graphs for each case. We then explore KR-theory as introduced by Atiyah in 1966, which is a variant of topological K-theory for working with topological spaces equipped with an involution. The GIT quotient spaces C2 // G, can be equipped by an involution via the action of G / G. In 1983, Gonzalez-Sprinberg and Verdier showed how one can view the McKay correspondence as an isomorphism between the G-equivariant K-theory KG(C2) and the K-theory of the minimal resolution of the singularity C2 // G. We use this to conjecture an analogous a form of the McKay correspondence for C2-graded groups and KR-theory.