de Finetti diagram
A de Finetti diagram is a ternary plot used in population genetics. It is named after the Italian statistician Bruno de Finetti (1906–1985) and is used to graph the genotype frequencies of populations, where there are two alleles and the population is diploid. It is based on an equilateral triangle, and Viviani's theorem: the sum of the perpendicular distances from any interior point to the sides of said triangle is a constant equal to the length of the triangle's altitude.
Applications in genetics[]
The de Finetti diagram is used extensively in A.W.F. Edwards' book Foundations of Mathematical Genetics. The sum of the lengths, representing allele frequencies, is set to be 1. In its simplest form the diagram can be used to show the range of genotype frequencies for which Hardy–Weinberg equilibrium is satisfied (the curve within the diagram). A. W. F. Edwards and extended its use to demonstrate the changes that occur in allele frequencies under natural selection.
See also[]
- Ternary diagram
- Wahlund effect
References[]
- Cannings C., Edwards A. W. F. (1968) "Natural selection and the de Finetti diagram" Ann Hum Gen 31:421–428
- Edwards, A.W.F. (2000) Foundations of Mathematical Genetics 2nd Edition, Cambridge University Press. ISBN 978-0-521-77544-1[page needed]
External links[]
- Online plotting of de Finetti diagrams for population genetics (also calculates Hardy Weinberg equilibrium statistics)
- Population genetics
- Diagrams
- Genetics stubs
- Applied mathematics stubs