Denote $E = C([0, 1])$. I am consider a 1-dimensional stochastic heat equation on $h$:
$$\partial_tu(t, x) = \partial_x^2u(t, x) - V'(u(t, x)) + \dot{W}(t, x), \quad\text{ for all } (t, x) \in (0, \infty)\times(0, 1),$$
$$u(t, 0) = 0 \quad\text{for all }t > 0,\qquad u(0) = u \in E.$$
Here $W$ is the space-time white noise, $V$ is a bounded differentiable potential on $\mathbb{R}$ and $V'$ is its derivative.
We know that the mild solution $u(t) \in E$ forms an $E$-valued Markov process. If we denote its semigroup by $P_t$, then it should have a infinitesimal generator $L$ due to the Hille-Yoshida Theorem. We can write out the explicit form of $L$ on functions such as $F(u) = f(\langle u, \phi_1\rangle,..., \langle u, \phi_m\rangle)$ for $f$ and $\phi_j$ with good regularities. But such functions is not enough to form a core of $L$, as I guess.
I am wondering if there is any results on the core of generator of SPDE.
