Leech lattice
In mathematics, the Leech lattice is a lattice Λ in R24 discovered John Leech (Canad. J. Math. 16 (1964), 657--682). It is the unique lattice with the following list of properties:
- It is unimodular; i.e., it can be generated by the columns of a certain 24×24 matrix with determinant 1.
- It is even; i.e., the square of the length of any vector in Λ is an even integer.
- The shortest length of any non-zero vector in Λ is 2.
The last condition means that unit balls centered at the points of Λ do not overlap. Each is tangent to 196,560 neighbors, and this is known to be the largest number of non-overlapping 24-dimensional unit balls which can simultaneously touch a single unit ball (compare with 6 in dimension 2, as the maximum number of pennies which can touch a central penny). It seems to be expected that this configuration also gives the densest packing of balls in 24-dimensional space, but this is still open.
The Leech lattice can be explicitly constructed as the set of vectors of the form 2−3/2(a1, a2, ..., a24) where the ai are integers such that
and the set of coordinates i such that ai belongs to any fixed residue class (mod 4) is a word in the binary Golay code.
The Leech lattice is highly symmetrical. Its automorphism group is the double cover of the Conway group Co1; its order is approximately 8.3(10)18.
See also Sphere packing.
See:
- Conway, J. H.; Sloane, N. J. A. (1999). Sphere packings, lattices and groups. (3rd ed.) With additional contributions by E. Bannai, R. E. Borcherds, J. Leech, S. P. Norton, A. M. Odlyzko, R. A. Parker, L. Queen and B. B. Venkov. Grundlehren der Mathematischen Wissenschaften, 290. New York: Springer-Verlag. ISBN 0-387-98585-9.
Referenced By
Conway group | Higman-Sims group | Kissing number | Kissing number problem | Lattice (group) | List of geometry topics | List of mathematical examples | List of mathematical topics (J-L) | McLaughlin group | Steiner system | Suzuki sporadic group
|
