In the following we consider $\Omega\subset\mathbb{R}^n\ (n\geq2)$ to be open, bounded and with Lipshitz boundary. Consider the following regular variational integral:
\begin{equation*}
I[u]=\int_{\Omega}f(x, u, Du)\ \mathrm{d}x,
\end{equation*}for all $u$ in the admissible class $W^{1, n}\cap L^{\infty}(\Omega;\mathbb{R}^N)$. Here $N$ is at least $1$, the integral is at least Caratheodory, coercive and $|f(x, z, \zeta)|\leq K|\zeta|^n$ for some $K>0$ and all $(x, z, \zeta)\in\Omega\times\mathbb{R}^N\times\mathbb{R}^{Nn}$. 

There are clearly a wide number of problems framed in the above way. I was wondering if there is an example of a *variational problem* framed in the above way that has a *non-constant continuous minimiser, $v$* and a non-constant critical point (not necessarily, but preferably continuous) $u$, that is distinct from $v$. The admissible class can be made smaller if it suits the example. I am looking for explicit examples and not existence theorems.