If G is a graph with n vertices, $$L_G$$ is its Laplacian matrix, and $$\mathbf {b}$$ is a binary vector of length n, then the pair $$(L_G, \mathbf {b})$$ is said to be controllable, and we also say that G is Laplacian controllable for $$\mathbf {b}$$ , if $$\mathbf {b}$$ is non-orthogonal to any of the eigenvectors of $$L_G$$ . It is known that if G is Laplacian controllable, then it has no repeated Laplacian eigenvalues. If G has no repeated Laplacian eigenvalues and each of them is an integer, then G is decomposable into a (dominate) induced subgraph, say H, and another induced subgraph with at most three vertices. We express the Laplacian controllability of G in terms of that of H. In this way, we address the question on the Laplacian controllability of cographs and, in particular, threshold graphs.