Abstract We show that the pluripotential Cauchy-Dirichlet problem for the complex Monge-Ampère flow is solvable for the right-hand side of the form dt d d t ∧ d μ where d d μ is dominated by a Monge-Ampère measure of a bounded plurisubharmonic function. In particular, we remove the strict positivity assumption on d d μ. We use this result to prove the parabolic version of the bounded subsolution theorem due to Kołodziej in pluripotential theory.
B.H. Kang (Thu,) studied this question.