The holonomy of the Obata connection on Joyce hypercomplex manifolds
Abstract
We study the holonomy of the Obata connection on Joyce hypercomplex manifolds. For all such group manifolds except SU(2n+1), we show that the holonomy group is strictly contained in the quaternionic general linear group. The case of SU(2n+1) is more subtle: for every n>1, we show that there exist infinitely many Joyce hypercomplex structures with Obata holonomy strictly contained in GL(n(n+1),H). On the other hand, Soldatenkov showed that SU(3) has Obata holonomy equal to GL(2,H) Sol, and we present here a new example on SU(5) with holonomy equal to GL(6,H). Finally, we investigate Joyce hypercomplex manifolds whose restricted holonomy lie in SL(n, H), yielding new compact examples of twisted Calabi-Yau manifolds.
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