Reock degree of compactness

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The Reock degree of compactness, or Reock compactness score, is a ratio that quantifies how compact is the geographic area of a voting district.[1] The score is sometimes used as an indication of the extent to which a voting district may be considered gerrymandered.

The Reock compactness score is computed by dividing the area of the voting district by the area of the smallest circle that would completely enclose it. Since the circle encloses the district, its area cannot be less than that of the district, and so the Reock compactness score will always be a number between zero and one (which may be expressed as a percentage).

Criticism[]

Because the Reock compactness score is defined in terms of a circle that must enclose all points of a district, it is sensitive to the orientations of the district's extremities.[2]

Even a very unnatural shape (for example, a "coiled snake") may have a high Reock compactness score so long as it fits compactly within the circumscribing circle.[3]

See also[]

References[]

  1. ^ Reock, Ernest (1961). "A Note: Measuring Compactness as a Requirement of Legislative Apportionment". Midwest Journal of Political Science. 5 (1): 70–74. doi:10.2307/2109043. JSTOR 2109043.
  2. ^ Polsby, Daniel; Popper, Robert (1991). "The Third Criterion: Compactness as a Procedural Safeguard Against Partisan Gerrymandering" (PDF). Yale Law & Policy Review. 9: 301–353. doi:10.2139/ssrn.2936284. S2CID 46229993. Archived from the original (PDF) on 2019-07-02.
  3. ^ Young, H. Peyton (1988). "Measuring the Compactness of Legislative Districts". Legislative Studies Quarterly. 13 (1): 105–115. doi:10.2307/439947. JSTOR 439947.


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