On certain classes of Sp(2,R) symmetric G2 structures

Abstract

We find two different families of Sp(2,R) symmetric G2 structures in seven dimensions. These are G2 structures with G2 being the split real form of the simple exceptional complex Lie group G2. The first family has τ2 0, while the second family has τ1τ2 0. The families are different in the sense that the first one lives on a homogoneous space Sp(2,R)/SL(2,R)l, and the second one lives on a homogeneous space Sp(2,R)/Sl(2,R)s. Here SL(2,R)l is an SL(2,R) corresponding to the sl(2,R) related to the long roots in the root diagram of sp(2,R), and SL(2,R)s is an SL(2,R) corresponding to the sl(2,R) related to the short roots in the root diagram of sp(2,R).