Niemeier lattice
In mathematics, a Niemeier lattice is one of the 24 positive definite even unimodular lattices of rank 24, which were classified by Hans-Volker Niemeier (1973). (Venkov 1978) gave a simplified proof of the classification. In the 1970s, (Witt 1941) has a sentence mentioning that he found more than 10 such lattices in the 1940s, but gives no further details. One example of a Niemeier lattice is the Leech lattice found in 1967.
Classification
Niemeier lattices are usually labelled by the Dynkin diagram of their root systems. These Dynkin diagrams have rank either 0 or 24, and all of their components have the same Coxeter number. (The Coxeter number, at least in these cases, is the number of roots divided by the dimension.) There are exactly 24 Dynkin diagrams with these properties, and there turns out to be a unique Niemeier lattice for each of these Dynkin diagrams.
The complete list of Niemeier lattices is given in the following table. In the table,
- G0 is the order of the group generated by reflections
- G1 is the order of the group of automorphisms fixing all components of the Dynkin diagram
- G2 is the order of the group of automorphisms of permutations of components of the Dynkin diagram
- G∞ is the index of the root lattice in the Niemeier lattice, in other words, the order of the "glue code". It is the square root of the discriminant of the root lattice.
- G0×G1×G2 is the order of the automorphism group of the lattice
- G∞×G1×G2 is the order of the automorphism group of the corresponding deep hole.
| Lattice root system | Dynkin diagram | Coxeter number | G0 | G1 | G2 | G∞ |
|---|---|---|---|---|---|---|
| Leech lattice (no roots) | 0 | 1 | 2Co1 | 1 | Z24 | |
| A124 |   |
2 | 224 | 1 | M24 | 212 |
| A212 |  |
3 | 3!12 | 2 | M12 | 36 |
| A38 | |
4 | 4!8 | 2 | 1344 | 44 |
| A46 | |
5 | 5!6 | 2 | 120 | 53 |
| A54D4 |   |
6 | 6!4(234!) | 2 | 24 | 72 |
| D46 | |
6 | (234!)6 | 3 | 720 | 43 |
| A64 | |
7 | 7!4 | 2 | 12 | 72 |
| A72D52 | |
8 | 8!2(245!)2 | 2 | 4 | 32 |
| A83 | |
9 | 9!3 | 2 | 6 | 27 |
| A92D6 | |
10 | 10!2(256!) | 2 | 2 | 20 |
| D64 | |
10 | (256!)4 | 1 | 24 | 16 |
| E64 |    |
12 | (27345)4 | 2 | 24 | 9 |
| A11D7E6 | |
12 | 12!(267!)(27345) | 2 | 1 | 12 |
| A122 | |
13 | 13!2 | 2 | 2 | 13 |
| D83 | |
14 | (278!)3 | 1 | 6 | 8 |
| A15D9 | |
16 | 16!(289!) | 2 | 1 | 8 |
| A17E7 | |
18 | 18!(210345.7) | 2 | 1 | 6 |
| D10E72 | |
18 | (2910!)(210345.7)2 | 1 | 2 | 4 |
| D122 | |
22 | (21112!)2 | 1 | 2 | 4 |
| A24 | |
25 | 25! | 2 | 1 | 5 |
| D16E8 | |
30 | (21516!)(21435527) | 1 | 1 | 2 |
| E83 | |
30 | (21435527)3 | 1 | 6 | 1 |
| D24 | |
46 | 22324! | 1 | 1 | 2 |
The neighborhood graph of the Niemeier lattices
If L is an odd unimodular lattice of dimension 8n and M its sublattice of even vectors, then M is contained in exactly 3 unimodular lattices, one of which is L and the other two of which are even. (If L has a norm 1 vector then the two even lattices are isomorphic.) The Kneser neighborhood graph in 8n dimensions has a point for each even lattice, and a line joining two points for each odd 8n dimensional lattice with no norm 1 vectors, where the vertices of each line are the two even lattices associated to the odd lattice. There may be several lines between the same pair of vertices, and there may be lines from a vertex to itself. Kneser proved that this graph is always connected. In 8 dimensions it has one point and no lines, in 16 dimensions it has two points joined by one line, and in 24 dimensions it is the following graph:
Each point represents one of the 24 Niemeier lattices, and the lines joining them represent the 24 dimensional odd unimodular lattices with no norm 1 vectors. (Thick lines represent multiple lines.) The number on the right is the Coxeter number of the Niemeier lattice.
In 32 dimensions the neighborhood graph has more than a billion vertices.
Properties
Some of the Niemeier lattices are related to sporadic simple groups. The Leech lattice is acted on by a double cover of the Conway group, and the lattices A124 and A212 are acted on by the Mathieu groups M24 and M12.
The Niemeier lattices, other than the Leech lattice, correspond to the deep holes of the Leech lattice. This implies that the affine Dynkin diagrams of the Niemeier lattices can be seen inside the Leech lattice, when two points of the Leech lattice are joined by no lines when they have distance [math]\displaystyle{ \sqrt 4 }[/math], by 1 line if they have distance [math]\displaystyle{ \sqrt 6 }[/math], and by a double line if they have distance [math]\displaystyle{ \sqrt 8 }[/math].
Niemeier lattices also correspond to the 24 orbits of primitive norm zero vectors w of the even unimodular Lorentzian lattice II25,1, where the Niemeier lattice corresponding to w is w⊥/w.
See also
References
- Chenevier, Gaëtan; Lannes, Jean (2014), Formes automorphes et voisins de Kneser des réseaux de Niemeier, Bibcode: 2014arXiv1409.7616C
- Sphere Packings, Lattices, and Groups (3rd ed.). 1998. ISBN 0-387-98585-9. https://archive.org/details/spherepackingsla0000conw_b8u0.
- Ebeling, Wolfgang (2002), Lattices and codes, Advanced Lectures in Mathematics (revised ed.), Braunschweig: Friedr. Vieweg & Sohn, doi:10.1007/978-3-322-90014-2, ISBN 978-3-528-16497-3, https://books.google.com/books?id=RVt5QgAACAAJ
- Niemeier, Hans-Volker (1973). "Definite quadratische Formen der Dimension 24 und Diskriminate 1." (In German). Journal of Number Theory 5 (2): 142–178. doi:10.1016/0022-314X(73)90068-1. Bibcode: 1973JNT.....5..142N.
- Venkov, B. B. (1978), "On the classification of integral even unimodular 24-dimensional quadratic forms", Akademiya Nauk Soyuza Sovetskikh Sotsialisticheskikh Respublik. Trudy Matematicheskogo Instituta Imeni V. A. Steklova 148: 65–76, ISSN 0371-9685 English translation in (Conway Sloane)
- Witt, Ernst (1941), "Eine Identität zwischen Modulformen zweiten Grades", Abhandlungen aus dem Mathematischen Seminar der Universität Hamburg 14: 323–337, doi:10.1007/BF02940750
- Witt, Ernst (1998), Collected papers. Gesammelte Abhandlungen, Springer Collected Works in Mathematics, Berlin, New York: Springer-Verlag, doi:10.1007/978-3-642-41970-6, ISBN 978-3-540-57061-5
External links
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