On compact Hermitian manifolds with flat Gauduchon connections

Abstract

Given a Hermitian manifold (Mn,g), the Gauduchon connections are the one parameter family of Hermitian connections joining the Chern connection and the Bismut connection. We will call ∇s = (1-s2)∇c + s2∇b the s-Gauduchon connection of M, where ∇c and ∇b are respectively the Chern and Bismut connections. It is natural to ask when a compact Hermitian manifold could admit a flat s-Gauduchon connection. This is related to a question asked by Yau Yau. The cases with s=0 (a flat Chern connection) or s=2 (a flat Bismut connection) are classified respectively by Boothby Boothby in the 1950s or by Q. Wang and the authors recently WYZ. In this article, we observe that if either s≥ 4+23 ≈ 7.46 or s≤ 4-23≈ 0.54 and s≠ 0, then g is K\"ahler. We also show that, when n=2, g is always K\"ahler unless s=2. Note that non-K\"ahler compact Bismut flat surfaces are exactly those isosceles Hopf surfaces by WYZ.