I wonder why at the beginning $sf(k(t))$ is steeper than $\delta k(t)$, but at some point, it starts to become flatter than $\delta k(t)$?
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$\begingroup$ The standard chart used to explain the Solow model plots output per worker (vertical) against capital per worker (horizontal). It does not have a time axis. So when you say "at the beginning", a more accurate description would be "if capital per worker is very low". $\endgroup$– Adam BaileyCommented Sep 15, 2023 at 10:48
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$\begingroup$ Hi! Did you know you can accept answers to your questions? $\endgroup$– GiskardCommented Sep 15, 2023 at 11:10
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2 Answers
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The answer: it is an assumption
Solow-models usually assume that $f$ fulfills the Inada conditions, points 3. and 4. of which state
$$
\begin{equation*}
\lim_{k \to 0} f'(k) = \infty \\
\lim_{k \to \infty} f'(k) = 0.
\end{equation*}
$$
A frequent special case
If the production function $F(K,L)$ is of Cobb-Douglas type with constant returns to scale and has positive parameters, then the derived $f(k) = F(K,L)/L$ function will satisfy the Inada conditions.
Caveat
Based on the graphs they see, students of economics sometimes mistakenly assume that all strictly concave functions have these properties, but this is not the case. $f(k) = \sqrt{k} + k$ does not have the second one, while $f(k) = \sqrt{1+k}$ does not have the first one. Thus properties like $f$ being concave or non-linear are not sufficient, one has to assume the conditions.
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Because $\delta k$ is linear function, so the slope of the function is always constant, whereas $sf(k)$ is typically nonlinear function exponential function like $f(k)=k^\alpha$ with $0<\alpha<1$, so mathematically such function starts with steep slope, but this slope always gets smaller (this can be seen from $d/dk= \alpha k^{\alpha -1}$.
However, note depending on value of parameter $\delta$, $\delta k$ could have equal or steeper slope but in such case capital accumulation is impossible because capital depreciates faster than it can be accumulated given $s$.
answered Sep 15, 2023 at 10:12
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$\begingroup$ Can you please give me a depreciation parameter $\delta$ at which the slope of $\delta k$ will always be steeper than the slope of, let's say, $0.5\sqrt{k}$? If not, can you please explain what you mean by your second paragraph. $\endgroup$– GiskardCommented Sep 15, 2023 at 11:08
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$\begingroup$ @Giskard $\delta$ that satisfies $\delta > \max \frac{1}{\sqrt{k}}$ for k>0. Also savings rate can be just zero and in that case it’s trivial $\endgroup$– 1muflon1 ♦Commented Sep 15, 2023 at 12:52
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1$\begingroup$ But you specify "always", when you write "always steeper slope", so I don't think a $\delta > \max_{k>0} \frac{1}{\sqrt{k}}$ exists? You are right about the edge case of $s = 0$, but that seems quite specific, not useful for the general case. $\endgroup$– GiskardCommented Sep 15, 2023 at 13:19
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$\begingroup$ @Giskard I edited out the word always $\endgroup$– 1muflon1 ♦Commented Sep 15, 2023 at 13:44
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1$\begingroup$ @1muflon1 Adding to Giskard's point, surely $\lim_{k \to 0} \frac{1}{\sqrt{k}}=\infty$? $\endgroup$ Commented Sep 16, 2023 at 20:41