Hypercomplex structures on special linear groups

Abstract

The purpose of this article is twofold. First, we prove that the 8-dimensional Lie group SL(3,R) does not admit a left-invariant hypercomplex structure. To accomplish this we revise the classification of left-invariant complex structures on SL(3,R) due to Sasaki. Second, we exhibit a left-invariant hypercomplex structure on SL(2n+1,C), which arises from a complex product structure on SL(2n+1,R), for all n∈ N. We then show that there are no HKT metrics compatible with this hypercomplex structure. Additionally, we determine the associated Obata connection and we compute explicitly its holonomy group, providing thus a new example of an Obata holonomy group properly contained in GL(m,H) and not contained in SL(m,H), where 4m=R SL(2n+1,C).