This paper presents new methods on robust set invariance, set stabilizability, and set stabilization of Boolean control networks (BCNs) subject to arbitrary disturbance inputs. We approach these problems from a novel algorithmic perspective and develop more efficient algorithms that scale to moderately large networks. The predecessor concept in graph theory is first generalized to a robust predecessor (RP) of a state set to handle nondeterministic state transitions. A direct connection between RPs and a robust control invariant set (RCIS) is established. After that, a simple recursive elimination algorithm is developed to identify the largest RCIS quickly. A faster method is then proposed to check robust set stabilizability and attain time-optimal robust set stabilization. Compared with existing methods, our algorithms feature lower time complexity and reduce the running time dramatically, as demonstrated by case studies for two biological networks.