Pooley-Tupy theorem

Script error: No such module "Draft topics". Script error: No such module "AfC topic". Script error: No such module "AfC submission catcheck". The Pooley-Tupy theorem is an economics theorem which measures the growth in knowledge resources over time at individual and population levels.

${\displaystyle Percentage\ Change\ in\ Knowledge\ Resources=\left({\frac {Time\ Price_{t}}{Population_{t}}}\right)\div \left({\frac {Time\ Price_{t+n}}{Population_{t+n}}}\right)-1}$

The theorem was formulated by Gale Pooley and Marian Tupy who developed the approach in 2018 in their paper: The Simon Abundance Index: A New Way to Measure Availability of Resources ^[1][2]

The theorem is informed by the work of Julian Simon, George Gilder, Thomas Sowell, F. A. Hayek, Paul Romer, and others.^{[3][4][5][6][7][8]}

Gilder offers three axioms; wealth is knowledge, growth is learning, and money is time. From these propositions a theorem can be derived: The growth in knowledge can be measured with time.

While money prices are expressed in dollar and cents, time prices are expressed in hours and minutes. A time price is equal to the money price divided by an hourly income rate.

${\displaystyle Time\ Price={\frac {Money\ Price}{Hourly\ Income}}}$

The Pooley-Tupy theorem adds changes in population as an additional variable in their formulation. In the case of an individual, population is equal to 1 at ${\displaystyle t}$ and ${\displaystyle t+n}$.

Examples[edit]

If knowledge resources were being evaluated at the individual level and the time price was 60 minutes at ${\displaystyle t}$ and 45 minutes at ${\displaystyle t+n}$, the percentage change in knowledge resources would be:

${\displaystyle =(60\div 45)-1}$

${\displaystyle =1.33-1}$

${\displaystyle =0.33=33\%}$

If population at ${\displaystyle t}$ was 100 and 200 at ${\displaystyle t+n}$, the percentage change in knowledge resources would be:

${\displaystyle =(60\div 100)\div (45\div 200)-1}$

${\displaystyle =(.6)\div (.225)-1}$

${\displaystyle =2.666-1}$

${\displaystyle =1.666=166.6\%}$

Other equations[edit]

The Pooley-Tupy Theorem is part of an analytical framework that uses several other equations for analysis. This framework is described in their book, Superabundance: The story of population growth, innovation, and human flourishing on an infinitely bountiful planet.^[9][10][11]

The percentage change in a time price over time can be expresses as:

${\displaystyle Percentage\ Change\ in\ Time\ Price={\frac {Time\ Price_{t+n}}{Time\ Price_{t}}}-1}$

The resource multiplier indicates how much more or less of a resource the same amount of time can buy at two points in time.

${\displaystyle Resource\ Multiplier={\frac {Time\ Price_{t}}{Time\ Price_{t+n}}}}$

The percentage change in the resource multiplier is just the resource multiplier minus one.

${\displaystyle Percentage\ Change\ in\ Resource\ Multiplier=Resource\ Multiplier-1}$

The compound annual growth rate or CAGR can be calculated as:

${\displaystyle Compound\ Annual\ Growth\ Rate=Resource\ Multiplier^{1/n}-1}$

References[edit]

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