- Hurwitz quaternion
In
mathematics , a Hurwitz quaternion (or Hurwitz integer) is aquaternion whose components are "either" allinteger s "or" allhalf-integer s (a mixture of integers and half-integers is not allowed). The set of all Hurwitz quaternions is:
It can be checked that "H" is closed under quaternion multiplication and addition, so that it forms a
subring of the ring of all quaternions H.A Lipschitz quaternion (or Lipschitz integer) is a quaternion whose components are all
integer s. The set of all Lipschitz quaternions:
forms a subring of the Hurwitz quaternions "H".
As a group, "H" is free abelian with generators {½(1+"i"+"j"+"k"), "i", "j", "k"}. It therefore forms a lattice in R4. This lattice is known as the "F"4 lattice since it is the
root lattice of thesemisimple Lie algebra "F"4. The Lipschitz quaternions "L" form an index 2 sublattice of "H".The
group of units in "L" is the order 8quaternion group "Q" = {±1, ±"i", ±"j", ±"k"}. Thegroup of units in "H" is a nonabelian group of order 24 known as thebinary tetrahedral group . The elements of this group include the 8 elements of "Q" along with the 16 quaternions {½(±1±"i"±"j"±"k")} where signs may be taken in any combination. The quaternion group is anormal subgroup of the binary tetrahedral group "U"("H"). The elements of "U"("H"), which all have norm 1, form the vertices of the24-cell inscribed in the3-sphere .The Hurwitz quaternions form an order (in the sense of
ring theory ) in thedivision ring of quaternions with rational components. It is in fact amaximal order ; this accounts for its importance. The Lipschitz quaternions, which are the more obvious candidate for the idea of an "integral quaternion", also form an order. However, this latter order is not a maximal one, and therefore (as it turns out) less suitable for developing a theory ofleft ideal s comparable to that ofalgebraic number theory . WhatAdolf Hurwitz realised, therefore, was that this definition of Hurwitz integral quaternion is the better one to operate with. This was one major step in the theory of maximal orders, the other being the remark that they will not, for a non-commutative ring such as H, be unique. One therefore needs to fix a maximal order to work with, in carrying over the concept of analgebraic integer .The norm of a Hurwitz quaternion, given by , is always an integer. By a theorem of Lagrange every nonnegative integer can be written as a sum of at most four squares. Thus, every nonnegative integer is the norm of some Lipschitz (or Hurwitz) quaternion. A Hurwitz integer is prime if and only if its norm is prime.
ee also
*
Gaussian integer
*Eisenstein integer
* The Lie group F4
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