Introduction to Modern Economic Growth whenever k > k ∗ , k˙ < 0, so that the capital-effective labor ratio monotonically converges to the steady-state value k∗ Example 2.2 (Dynamics with the Cobb-Douglas Production Function) Let us return to the Cobb-Douglas production function introduced in Example 2.1 F [K, L, A] = AK α L1−α with < α < As noted above, the Cobb-Douglas production function is special, mainly because it has an elasticity of substitution between capital and labor equal to Recall that for a homothetic production function F (K, L), the elasticity of substitution is defined by ∙ ∂ ln (FK /FL ) σ≡− ∂ ln (K/L) (2.36) ¸−1 , where FK and FL denote the marginal products of capital and labor In addition, F is required to be homothetic, so that FK /FL is only a function of K/L For the Cobb-Douglas production function FK /FL = (α/ (1 − α)) · (L/K), thus σ = This feature implies that when the production function is Cobb-Douglas and factor markets are competitive, equilibrium factor shares will be constant irrespective of the capital-labor ratio In particular: R (t) K (t) Y (t) FK (K(t), L (t)) K (t) = Y (t) αK (t) = αA [K (t)]α−1 [L (t)]1−α K (t) A [K (t)]α [L (t)]1−α = α = Similarly, the share of labor is αL (t) = − α The reason for this is that with an elasticity of substitution equal to 1, as capital increases, its marginal product decreases proportionally, leaving the capital share (the amount of capital times its marginal product) constant Recall that with the Cobb-Douglas technology, the per capita production function takes the form f (k) = Ak α , so the steady state is given again from (2.33) (with 74