Summary: A classical result of Aleksandrov allows us to estimate the size of a convex function $$\int_{\Omega} \det D^{2}u \, dx less than \infty. $$ This estimate plays a prominent role in the existence and regularity theory of the Monge-Ampere equation. Jerison proved an extension of Aleksandrov's result that provides a similar estimate, in some cases for which this integral is infinite. Gutierrez and Huang proved a variant of the Aleksandrov estimate, relevant to solutions of a parabolic Monge-Ampere equation. In this paper, we prove Jerison-like extensions to this parabolic estimate.