Let's consider a control system described by the implicit equation F (x, ˙ x) = 0. If this system is differentially flat, then the following criterion is satisfied : For some integer r, there exists a function ϕ(y0, y1, .., yr) satisfying the following conditions: (1) The map (y0, .., yr+1) → (ϕ(y0, y1, .., yr), ∂ϕ/ ∂y0 y1 + ∂ϕ/ ∂y1 y2 + .. + ∂ϕ/ ∂yr yr+1) is a submersion on the variety F (x, p) = 0. (2) The map y0 → x0 = ϕ(y0, 0, .., 0) is a diffeomorphism on the equilibrium variety F (x, 0) = 0. Inversely, if a control system satifies this flatness criterion, then it is locally controllable at equilibrium points.