True growth rate accounting for inflation

In an inflationary economy, the purchasing power of your currency continually deteriorates. If you have an investment that grows slower than your purchasing power shrinks, you're actually losing value over time. The true rate of growth is the rate of change in the purchasing power of your investiment.

If the inflation rate is r and the rate of growth from your investment is i, then intuitively the true rate of growth is

g = i - r.

But is it? That depends on whether your investment and inflation compound periodically or continuously [1].

Periodic compounding

If you start with an investment P, the amount of currency in the investment after compoundingn times will be

P(1 +i)ⁿ.

But the purchasing power of that amount will be

P(1 +i)ⁿ (1 + r)^-n.

If the principle were invested at the true rate of growth, its value at the end ofn periods would be

P(1 + g)ⁿ.

So setting

P(1 +i)ⁿ (1 + r)^-n= P(1 + g)ⁿ

gives us

g = (i - r) / (1 +r).

The true rate of growth is less than what intuition would suggest. To achieve a true rate of growthg, you needi >g, i.e.

i =g +rg +r.

Continuous compounding

With continuous compounding, an invent ofP for timeT becomes

P exp(iT)

and has purchasing power

P exp(iT) P exp(-rT).

If

P exp(iT) P exp(-rT) = P exp(gT)

then

g = i - r

as expected.

So what?

It's mathematically interesting that discrete and continuous compounding work differently when inflation is taken into account. But there are practical consequences.

Someone astutely commented that inflation really compounds continuously. It does, and not at a constant rate, either. But suppose we find a value of the monthly inflation rate r equivalent to the true annual rate. And suppose you're in some sort of contract that pays monthly interesti. Then your true rate of growth is (i - r) / (1 +r), not (i - r).

Ifr is small, the difference between (i - r) / (1 +r) and (i - r) is small. But the largerr is, the bigger the difference is. As I've written about before, hyperinflation is counterintuitive. Whenr is very large, (i - r) / (1 +r) is much less than (i - r).

Related posts

• Hyperinflation changes everything
• Taylor series and the Argentine peso
• Actuarial notation

[1] Robert C. Thompson. The True Growth Rate and the Inflation Balancing Principle. The American Mathematical Monthly, Vol. 90, No. 3 (Mar., 1983), pp. 207-210

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