In this paper, we consider the existence theorem of solutions for the well-known equilibrium problem EP(f,K) in LC-metric spaces. First, we establish an intersection theorem on C-spaces via a generalized HKKM mapping. Then we prove our main existence result for EP(f,K), where the constraint region K is compact. Without compactness, we also improve our main theorem under an usual coercive condition. As well, we can substitute HKKM mapping and continuity of f by the concept of C-property and g-monotonicity, respectively. Finally, based on the dual equilibrium problem DEP(f,K), we try to find a link to make sure of the existence of solutions to EP(f,K). In addition, when the bifunction f is equipped with pseudomonotonicity or quasimonotonicity, we further compare a kind of coercive condition C_s and a weaker condition C_w to see the influence on the solution set of EP(f,K).