Streets-Tian Conjecture holds for 2-step solvmanifolds

Abstract

A Hermitian-symplectic metric is a Hermitian metric whose K\"ahler form is given by the (1,1)-part of a closed 2-form. Streets-Tian Conjecture states that a compact complex manifold admitting a Hermitian-symplectic metric must be K\"ahlerian (i.e., admitting a K\"ahler metric). The conjecture is known to be true in dimension 2 but is still open in dimensions 3 or higher. In this article, we confirm the conjecture for all 2-step solvmanifolds, namely, compact quotients of 2-step solvable Lie groups by discrete subgroups. In the proofs, we adopted a method of using special non-unitary frames, which enabled us to squeeze out some hidden symmetries to make the proof go through. Hopefully the technique could be further applied.

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