Let Ω⊂ Cⁿ be a bounded smooth pseudoconvex domain, and let f=(f₁,..., f_n):\overline{Ω}⊂Cⁿ be an n-tuple of holomorphic functions on \overline{Ω}. In this paper we study commutants of the corresponding multiplication operators {T_f1, ..., T_fn}=T_f on the Bergman space A²(Ω). One of our main results is a geometric description of the algebra of commutants of {T_f, T_f*}, generalizing a result by Douglas, Sun and Zheng, 2011.