Suppose we are interested in the existence of a $u \in L^2(0,T;V)$ with $u' \in L^2(0,T;V^*)$ such that $$(u(T),\varphi(t))_H -\int_0^T \langle \varphi'(t), u(t) \rangle_{V^*,V} + \int_0^T a(u(t),\varphi(t)) = (u_0, \varphi(0))_H$$ holds for all $\varphi \in L^2(0,T;V)$ with $\varphi \in L^2(0,T;V^*)$.
What happens if instead look for solutions with requiring $\varphi' \in L^2(0,T;H)$, i.e., the weak formulation becomes: find $u \in L^2(0,T;V)$ with $u' \in L^2(0,T;V^*)$ such that $$(u(T),\varphi(t))_H -\int_0^T (\varphi'(t), u(t))_H + \int_0^T a(u(t),\varphi(t)) = (u_0, \varphi(0))_H$$ holds for all $\varphi \in L^2(0,T;V)$ with $\varphi' \in L^2(0,T;H)$.
The reason I want to do this because I consider an approximate problem $$(u_n(T),\varphi(t))_H -\int_0^T \langle \varphi'(t), A_nu_n(t) \rangle_{V^*,V} + \int_0^T a(u_n(t),\varphi(t)) = (u_0, \varphi(0))_H$$ where $u_n$ satisfies some estimates which allow us to pass to the limit in every term except the second one, where the only estimate I have is $Au_n \rightharpoonup u$ in $L^2(0,T;H)$. So this is why I want to change the test space, so that this estimate will suffice (the duality product turns into an inner product). Is there something bad about doing this?
