Linear continuous surjections of C_(p)-spaces over compacta

Let $X$ and $Y$ be compact Hausdorff spaces and suppose that there exists a linear continuous surjection $T:C_{p}(X) \to C_{p}(Y)$, where $C_{p}(X)$ denotes the space of all real-valued continuous functions on $X$ endowed with the pointwise convergence topology. We prove that $\dim X=0$ implies $\dim Y = 0$. This generalizes a previous theorem \cite[Theorem 3.4]{LLP} for compact metrizable spaces. Also we point out that the function space $C_{p}(P)$ over the pseudo-arc $P$ admits no densely defined linear continuous operator $C_{p}(P) \to C_{p}([0,1])$ with a dense image.