Hajós's theorem
0In group theory, Hajós's theorem states that if a finite abelian group is expressed as the Cartesian product of simplexes, that is, sets of the form
{
e
,
a
,
a
2
,
…
,
a
s
−
1
}
{\displaystyle \{e,a,a^{2},\dots ,a^{s-1}\}}
where
e
{\displaystyle e}
is the identity element, then at least one of the factors is a subgroup. The theorem was proved by the Hungarian mathematician György Hajós in 1941 using group rings. Rédei later proved the statement when the factors are only required to contain the identity element and be of prime cardinality. Rédei's proof of Hajós's theorem was simplified by Tibor Szele.
An equivalent statement on homogeneous linear forms was originally conjectured by Hermann Minkowski. A consequence is Minkowski's conjecture on lattice tilings, which says that in any lattice tiling of space by cubes, there are two cubes that meet face to face. Keller's conjecture is the same conjecture for non-lattice tilings, which turns out to be false in high dimensions.
Source: https://en.wikipedia.org/wiki/Haj%C3%B3s%27s_theorem
Created with WikipediaReaderReborn (c) WikipediaReader
Other Videos By WikiReader
| 2022-04-26 | List of shipwrecks in the Thunder Bay National Marine Sanctuary |
| 2022-04-26 | National Union of School Students |
| 2022-04-26 | List of governors of Mizoram |
| 2022-04-26 | Shahr-e Mizan |
| 2022-04-26 | Traders (video game) |
| 2022-04-26 | Preston, Adams County, Wisconsin |
| 2022-04-26 | Spotted sea catfish |
| 2022-04-26 | List of municipalities in Antioquia |
| 2022-04-26 | Sakarail |
| 2022-04-26 | Annelunds IF |
| 2022-04-26 | Hajós's theorem |
| 2022-04-26 | 2014 KHL Junior Draft |
| 2022-04-26 | Anna Propošina |
| 2022-04-26 | Eddie Gorodetsky |
| 2022-04-26 | Victor Koulbak |
| 2022-04-26 | 2020–21 European Rugby Challenge Cup preliminary stage |
| 2022-04-26 | Darius Sirtautas |
| 2022-04-26 | Parthenia (music) |
| 2022-04-26 | 2011 Trofeo Linea Brasil season |
| 2022-04-26 | Benedict Canyon, Los Angeles |
| 2022-04-26 | James Mullins |