Polsby–Popper test

The formula for calculating a district's Polsby–Popper score is ${\displaystyle PP(D)={\frac {4\pi A(D)}{P(D)^{2}}}}$ , where ${\displaystyle D}$  is the district, ${\displaystyle P(D)}$  is the perimeter of the district, and ${\displaystyle A(D)}$  is the area of the district.^[4] A district's Polsby–Popper score will always fall within the interval of ${\displaystyle [0,1]}$ , with a score of ${\displaystyle 0}$  indicating complete lack of compactness and a score of ${\displaystyle 1}$  indicating maximal compactness.^[5] Only a perfectly round district will reach a Polsby–Popper score of 1.

Compared to other measures that use dispersion to measure gerrymandering, the Polsby–Popper test is very sensitive to both physical geography (for instance, convoluted coastal borders) and map resolution.^[6]

Fairness criteria for gerrymandering can stand in contradiction to each other. For example, there are cases in which, in order to sufficiently fulfill the One man, one vote criterion and a low efficiency gap, one needs to take a low Polsby–Popper compactness into account. ^[7]

• Isoperimetric inequality