Let $f_n$ be bounded uniformly in the $H^1$ norm, so we have (weak convergence) $$f_n \rightharpoonup f \qquad \text{in} \qquad H^1(\Omega\times [0,T]).$$ Then by compact embedding, we have strong convergence $$f_n \to f \qquad \text{in}\qquad L^2(\Omega \times [0,T]).$$
How can I show that $$\frac{d}{dt}\int_{\Omega(t)}f_n\phi \to \frac{d}{dt}\int_{\Omega(t)}f\phi$$ for $\phi \in H^1$?
How to approach this problem? What conditions do I need? Obviously the statement is true if the derivatives weren't there but I'm not sure what to do. I can't take the absolute value of the difference and put the absolute value into the integral either.