A removal singularity theorem of the Donaldson–Thomas instanton on compact Kähler threefolds

We consider a perturbed Hermitian–Einstein equation, which we call the Donaldson–Thomas equation, on compact Kähler threefolds. In [12], we analysed some analytic properties of solutions to the equation, in particular, we proved that a sequence of solutions to the Donaldson–Thomas equation has a subsequence which smoothly converges to a solution to the Donaldson–Thomas equation outside a closed subset of the Hausdorff dimension two. In this article, we prove that some of these singularities can be removed.