3-Sasakian Geometry, Nilpotent Orbits, and Exceptional Quotients
Abstract
Using 3-Sasakian reduction techniques we obtain infinite families of new 3-Sasakian manifolds M(p1,p2,p3) and M(p1,p2,p3,p4) in dimension 11 and 15 respectively. The metric cone on M(p1,p2,p3) is a generalization of the Kronheimer hyperk\"ahler metric on the regular maximal nilpotent orbit of s l(3,) whereas the cone on M(p1,p2,p3,p4) generalizes the hyperk\"ahler metric on the 16-dimensional orbit of s o(6,). These are first examples of 3-Sasakian metrics which are neither homogeneous nor toric. In addition we consider some further U(1)-reductions of M(p1,p2,p3). These yield examples of non-toric 3-Sasakian orbifold metrics in dimensions 7. As a result we obtain explicit families O() of compact self-dual positive scalar curvature Einstein metrics with orbifold singularities and with only one Killing vector field.
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