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We study homogeneous instantons on the seven dimensional Stiefel manifold V in the context of G2 and Sasakian geometry. According to the reductive decomposition of V we provide an explicit description of all invariant G2 and Sasakian structures. In particular, we characterise the invariant G2- structures inducing a Sasakian metric, among which the well known nearly parallel G2-structure (Sasaki- Einstein) is included. As a consequence, we classify the invariant connections on homogeneous principal bundles over V with gauge group U(1) and SO(3), satisfying either the G2 or the Sasakian instanton condition. Finally, we analyse the Yang Mills condition for those invariant connections.
Moreno et al. (Mon,) studied this question.