Given a smooth projective curve $X/\mathbb{Q}_{p}$, there is an induced monodromy action of the Galois group on the $\ell$-adic cohomology of
$$X \otimes \bar{\mathbb{Q_{p}}}.$$
What is an explicit example where the action of wild inertia is non-trivial?
By ``explicit," I meant I would like an example that is not, say, a modular curve. Ideally, $X$ would be, say, presented as an effective divisor on smooth surface.
(Here $\ell \ne p$ is a prime.)