Geometric Reductions of the G2-Hilbert Functional via Circle Actions

Abstract

In this paper, we study critical points and gradient flows of the G2--Hilbert functional on a manifolds with free S1--actions. We analyze S1--invariant G2--structures under the constant fiber-length non-K\"ahler transverse ansatz, reducing the variational problem to the 6--dimensional quotient and we also consider a Gibbons--Hawking-type ansatz with varying fiber length and derive the formal negative L2--gradient flow. We conclude that the unnormalized flow admits only trivial stationary configurations: flat connection, scalar-flat base metric, and constant fiber length.