Chapter 13Growth Theory

With $f(k) = k^{1/3}$, $\rho = 0.04$, $\delta = 0.05$, $g = 0.02$, $\sigma = 2$:

$\dot{c} = 0$: $f'(k^*) = (1/3)k^{*-2/3} = 0.04 + 0.05 + 2(0.02) = 0.13$

$k^* = [(1/3)/0.13]^{3/2} = 4.11$,   $c^* = (4.11)^{1/3} - (0.09)(4.11) = 1.23$

Starting from $k_0 = 1 < k^* = 4.11$ (parameters from Example 13.1), characterize the saddle-path dynamics.

Step 1: At $k_0 = 1$, $f'(1) = 1/3 > 0.13 = \rho + \delta + \sigma g$, so $\dot{c}/c > 0$: consumption is rising.

Step 2: On the saddle path, $c_0$ must jump to the value where the trajectory converges to $(k^*, c^*)$. If $c_0$ is too high, consumption grows too fast, capital is depleted, and the economy hits $k = 0$. If $c_0$ is too low, capital accumulates forever, violating transversality.

Step 3: Along the saddle path, both $k$ and $c$ rise monotonically toward the steady state. The economy grows rapidly at first (high $f'(k)$) and decelerates as $k \to k^*$.

Key insight: The saddle path is the unique rational-expectations equilibrium. Forward-looking households must select $c_0$ perfectly to land on it.

An economy has $L = 1{,}000{,}000$ workers, R&D labor share $L_A/L = 0.05$, and R&D productivity $\delta_A = 0.0004$.

Step 1: Number of researchers: $L_A = 0.05 \times 1{,}000{,}000 = 50{,}000$.

Step 2: Growth rate of ideas: $g_A = \delta_A L_A = 0.0004 \times 50{,}000 = 20$ ... but we need to interpret units. With $\delta_A = 0.0004$ per researcher, $g_A = 0.0004 \times 50{,}000 = 20$? That gives 2000%/year. Let us re-calibrate: $\delta_A = 0.00004$, then $g_A = 0.00004 \times 50{,}000 = 2.0$, i.e., 2.0%/year.

Step 3: On the balanced growth path, $g_Y = g_A = 2.0\%$/year. Doubling time: $\ln 2 / 0.02 = 34.7$ years.

Step 4 (scale effects): If population doubles to 2M with the same R&D share, $L_A = 100{,}000$, and $g_A = 4.0\%$/year. The Romer model predicts that larger economies grow faster — a prediction that has been challenged empirically.

In the Romer model, derive the balanced growth path (BGP) where all growth rates are constant.

Step 1: Ideas production: $\dot{A}/A = \delta_A L_A$. On the BGP, $L_A$ is constant (fixed fraction of labor), so $g_A = \delta_A L_A$ is constant.

Step 2: Final goods production: $Y = A^\phi K^\alpha L_Y^{1-\alpha}$ (where $\phi$ captures the ideas externality). On the BGP, $g_Y = \phi g_A + \alpha g_K + (1-\alpha)g_{L_Y}$.

Step 3: Capital accumulates from saving: $g_K = sY/K - \delta$. On the BGP, $g_K = g_Y$ (constant $K/Y$ ratio).

Step 4: Substituting $g_K = g_Y$ and $g_{L_Y} = n$: $g_Y = \phi g_A + \alpha g_Y + (1-\alpha)n$, so $g_Y(1-\alpha) = \phi g_A + (1-\alpha)n$, giving $g_Y = \frac{\phi}{1-\alpha}g_A + n$.

Step 5: Per capita growth: $g_{Y/L} = g_Y - n = \frac{\phi}{1-\alpha}\delta_A L_A$. Growth in living standards is proportional to R&D effort.

In the Aghion-Howitt model with arrival rate $\lambda \phi(n) = \lambda n$ (linear in R&D labor $n$), quality step $\gamma = 1.2$, and interest rate $r = 0.05$:

Step 1: Growth rate: $g = \lambda n \ln\gamma$. With $\lambda = 0.5$ and $n = 0.10$: $g = 0.5 \times 0.10 \times \ln(1.2) = 0.5 \times 0.10 \times 0.182 = 0.0091$ or 0.91%/year.

Step 2: The social planner maximizes welfare considering that each innovation creates a knowledge spillover for future innovators. The private innovator ignores this externality.

Step 3: Business-stealing effect: the innovator captures the incumbent's rents (excess private incentive = $\pi_{old}$). Knowledge spillover: the innovator raises the quality frontier for future innovators (insufficient private incentive).

Step 4: If the spillover dominates (typical case), the social optimum has $n^* > n_{market}$, justifying R&D subsidies. If business-stealing dominates, the market over-invests in R&D.

Between 1966 and 1990, South Korea's GDP grew at 10.3%/year. Decompose this using growth accounting.

Data: Capital growth $g_K = 13.7\%$/year. Labor growth $g_L = 6.4\%$/year (including quality adjustment). Capital share $\alpha = 0.35$.

Step 1: Capital contribution: $\alpha \cdot g_K = 0.35 \times 13.7\% = 4.8\%$.

Step 2: Labor contribution: $(1-\alpha) \cdot g_L = 0.65 \times 6.4\% = 4.2\%$.

Step 3: TFP residual: $g_A = g_Y - \alpha g_K - (1-\alpha)g_L = 10.3\% - 4.8\% - 4.2\% = 1.3\%$.

Interpretation: Factor accumulation (capital + labor) accounts for 87% of Korean growth. TFP accounts for only 13%. This led to the "perspiration vs. inspiration" debate: was the Asian miracle driven by brute-force accumulation (Young, 1995) or genuine productivity gains?

Mankiw, Romer, and Weil (1992) estimate the augmented Solow model:

$$\ln(Y/L) = \text{const} + \frac{\alpha}{1-\alpha-\beta}\ln s_K + \frac{\beta}{1-\alpha-\beta}\ln s_H - \frac{\alpha+\beta}{1-\alpha-\beta}\ln(n+g+\delta)$$

Step 1: With $\alpha = 1/3$ and $\beta = 1/3$: the coefficient on $\ln s_K$ is $\frac{1/3}{1/3} = 1.0$; on $\ln s_H$ is $\frac{1/3}{1/3} = 1.0$; on $\ln(n+g+\delta)$ is $-\frac{2/3}{1/3} = -2.0$.

Step 2: A country that doubles its physical investment rate ($s_K$) increases steady-state income by $\exp(1.0 \times \ln 2) = 2.0$, i.e., 100%.

Step 3: A country that doubles its human capital investment ($s_H$) also doubles income. Human capital is as important as physical capital.

Step 4: The augmented model (R$^2 \approx 0.78$) dramatically outperforms the basic Solow model (R$^2 \approx 0.59$). Adding human capital resolves the "too high" predicted convergence speed of the basic model.