This paper proposes a push and pull search method in the framework of differential evolution (PPS-DE) to solve constrained singleobjective optimization problems (CSOPs). More specifically, two sub-populations, including the top and bottom sub-populations, are collaborated with each other to search global optimal solutions efficiently. The top sub-population adopts the pull and pull search (PPS) mechanism to deal with constraints, while the bottom sub-population use the superiority of feasible solutions (SF) technique to deal with constraints. In the top sub-population, the search process is divided into two different stages -push and pull stages. In the push stage, a CSOP is optimized without considering any constraints, which can help to get across to infeasible regions. In the pull stage, the CSOP is optimized with an improved epsilon constraint-handling method, which can help the population to search for feasible solutions. An adaptive DE variant with three trial vector generation strategies -DE /rand/1, DE/current-to-rand/1, and DE/current-to-pbest/1 is employed in the proposed PPS-DE. In the top sub-population, all the three trial vector generation strategies are used to generate offsprings, just like in CoDE. In the bottom sub-population, a strategy adaptation, in which the trial vector generation strategies are periodically self-adapted by learning from their experiences in generating promising solutions in the top sub-population, is used to choose a suitable trial vector generation strategy to generate one offspring. Furthermore, a parameter adaptation strategy from LSHADE44 is employed in both sup-populations to generate scale factor F and crossover rate CR for each trial vector generation strategy. Twenty-eight CSOPs with 10-, 30-, and 50-dimensional decision variables provided in the CEC2018 competition on real parameter single objective optimization are optimized by the proposed PPS-DE. The experimental results demonstrate that the proposed PPS-DE has the best performance compared with the other seven state-of-the-art algorithms, including AGA-PPS, LSHADE44, LSHADE44+IDE, UDE, IUDE, ǫMAg-ES and C 2 oDE.
