A note on the pluriclosed flow on balanced manifolds with c1=0

Abstract

We conjecture that on any compact balanced manifold (M, ωB) with c1(M)=0, the pluriclosed flow admits long-time solutions ωt for every initial pluriclosed metric, and that ωt converges smoothly to a Kähler metric as t ∞. We verify that this phenomenon occurs when M is a compact quotient of a Lie group by a discrete subgroup, the background metric ωB is invariant with vanishing Chern--Ricci form, and the initial metric ω0 is invariant. In particular, this provides new evidences for the Fino-Vezzoni conjecture.