Homogeneous non-degenerate $3$-$(α,δ)$-Sasaki manifolds and submersions over quaternionic Kähler spaces

Published 26 Nov 2020 in math.DG, math-ph, and math.MP | (2011.13434v2)

Abstract: We show that every $3$-$(\alpha,\delta)$-Sasaki manifold of dimension $4n + 3$ admits a locally defined Riemannian submersion over a quaternionic K\"ahler manifold of scalar curvature $16n(n+2)\alpha\delta$. In the non-degenerate case ($\delta\neq 0$) we describe all homogeneous $3$-$(\alpha,\delta)$-Sasaki manifolds fibering over symmetric Wolf spaces (case $\alpha\delta> 0$) and over their the noncompact dual symmetric spaces (case $\alpha\delta< 0$). If $\alpha\delta> 0$, this yields a complete classification of homogeneous $3$-$(\alpha,\delta)$-Sasaki manifolds; for $\alpha\delta< 0$, we provide a general construction of homogeneous $3$-$(\alpha,\delta)$-Sasaki manifolds fibering over nonsymmetric Alekseevsky spaces, the lowest possible dimension of such a manifold being $19$.