Let $R$ be a regular local ring in mixed characteristic. Moreover, I assume that $R$ is the local ring of a point on a smooth $\mathbb Z_p$-scheme and that $R/pR$ is regular. ($\mathbb Z_p$ is the localization of $\mathbb Z$ at $(p)$).
Let me call a projective model of $R$ a pair $(X,x)$, where $X$ is projective over $\mathbb Z_p$, $R\simeq\mathcal O_{X,x}$. Clearly, under my assumptions $R$ has a projective model.
Question: is it always possible to construct a model such that the special fiber $X_p$ is "good enough"? For example, is it always possible to have $X_p$ smooth away from codimension two? How about reduced away from codimension two?
