Let $(R,\mathfrak{m},k)$ be a discrete valuation ring with fraction field $K$. Let $X/K$ be a smooth projective variety.
Let $\mathcal{X},\mathcal{X}'$ be smooth projective models of $X$ over $R$. Let $X_0,X'_0$ be special fibers of $\mathcal{X},\mathcal{X}'$.
(1) Are there examples that the chow rings $\mathrm{CH}^*(X_0)$ and $\mathrm{CH}^*(X_0')$ are not isomorphic?
(2) If $\mathrm{CH}^*(X_0)$ is isomorphic to $\mathrm{CH}^*(X_0')$, can we always choose an isomorphism that is compatible with the specialization maps $\rho\colon\mathrm{CH}^*(\mathcal{X})\to\mathrm{CH}^*(X_0)$ and $\rho'\colon\mathrm{CH}^*(\mathcal{X})\to\mathrm{CH}^*(X_0')$?