On a fixed smooth compact Riemann surface with boundary $(M_0,g)$, we show that for the Schrödinger operator $\Delta +V$ with potential $V\in W^{1,\infty}(M_0)$, the Dirichlet-to-Neumann map $N|_{\Gamma}$ measured on an open set $\Gamma\subset \partial M_0$ determines uniquely the potential $V$. We also discuss briefly the corresponding consequences for potential scattering at $0$ frequency on Riemann surfaces with asymptotically Euclidean or asymptotically hyperbolic ends.