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- Q5532873 subject Q7329527.
- Q5532873 subject Q9003817.
- Q5532873 abstract "In mathematical genetics, a genetic algebra is a (possibly non-associative) algebra used to model inheritance in genetics. Some variations of these algebras are called train algebras, special train algebras, gametic algebras, Bernstein algebras, copular algebras, zygotic algebras, and baric algebras (also called weighted algebra). The study of these algebras was started by Etherington (1939). In applications to genetics, these algebras often have a basis corresponding to the genetically different gametes, and the structure constant of the algebra encode the probabilities of producing offspring of various types. The laws of inheritance are then encoded as algebraic properties of the algebra.For surveys of genetic algebras see Bertrand (1966), Wörz-Busekros (1980) and Reed (1997).".
- Q5532873 wikiPageExternalLink ga.pdf.
- Q5532873 wikiPageWikiLink Q176916.
- Q5532873 wikiPageWikiLink Q1822837.
- Q5532873 wikiPageWikiLink Q190109.
- Q5532873 wikiPageWikiLink Q211050.
- Q5532873 wikiPageWikiLink Q2584927.
- Q5532873 wikiPageWikiLink Q259590.
- Q5532873 wikiPageWikiLink Q4391941.
- Q5532873 wikiPageWikiLink Q49974.
- Q5532873 wikiPageWikiLink Q7160950.
- Q5532873 wikiPageWikiLink Q7329527.
- Q5532873 wikiPageWikiLink Q9003817.
- Q5532873 comment "In mathematical genetics, a genetic algebra is a (possibly non-associative) algebra used to model inheritance in genetics. Some variations of these algebras are called train algebras, special train algebras, gametic algebras, Bernstein algebras, copular algebras, zygotic algebras, and baric algebras (also called weighted algebra). The study of these algebras was started by Etherington (1939).".
- Q5532873 label "Genetic algebra".