Abstract: We generalize the inverse Monge-Ampere flow, which was introduced by Collins, Hisamoto and Takahashi. We provide conditions that guarantee the convergence of the flow without a priori assumption that X has a Kähler-Einstein metric. We also show that if the underlying manifold does not admit Kähler-Einstein metric, then the flow develops Nadel multiplier ideal sheaves. In addition, we establish the linear lower bound for the infinum of the solution and the theorem of Darvas and He for the inverse Monge-Ampere flow.