In mathematics, a bivector is the vector part of a biquaternion. For biquaternion q = w + xi + yj + zk, w is called the biscalar and xi + yj + zk is its bivector part. The coordinates w, x, y, z are complex numbers with imaginary unit h:
A bivector may be written as the sum of real and imaginary parts:
where and are vectors. Thus the bivector [1]
The Lie algebra of the Lorentz group is expressed by bivectors. In particular, if r1 and r2 are right versors so that , then the biquaternion curve {exp θr1 : θ ∈ R} traces over and over the unit circle in the plane {x + yr1 : x, y ∈ R}. Such a circle corresponds to the space rotation parameters of the Lorentz group.
Now (hr2)2 = (−1)(−1) = +1, and the biquaternion curve {exp θ(hr2) : θ ∈ R} is a unit hyperbola in the plane {x + yr2 : x, y ∈ R}. The spacetime transformations in the Lorentz group that lead to FitzGerald contractions and time dilation depend on a hyperbolic angle parameter. In the words of Ronald Shaw, "Bivectors are logarithms of Lorentz transformations."[2]
The commutator product of this Lie algebra is just twice the cross product on R3, for instance, [i,j] = ij − ji = 2k, which is twice i × j. As Shaw wrote in 1970:
- Now it is well known that the Lie algebra of the homogeneous Lorentz group can be considered to be that of bivectors under commutation. [...] The Lie algebra of bivectors is essentially that of complex 3-vectors, with the Lie product being defined to be the familiar cross product in (complex) 3-dimensional space.[3]
William Rowan Hamilton coined both the terms vector and bivector. The first term was named with quaternions, and the second about a decade later, as in Lectures on Quaternions (1853).[1]: 665 The popular text Vector Analysis (1901) used the term.[4]: 249
Given a bivector r = r1 + hr2, the ellipse for which r1 and r2 are a pair of conjugate semi-diameters is called the directional ellipse of the bivector r.[4]: 436
In the standard linear representation of biquaternions as 2 × 2 complex matrices acting on the complex plane with basis {1, h},
- represents bivector q = vi + wj + xk.
The conjugate transpose of this matrix corresponds to −q, so the representation of bivector q is a skew-Hermitian matrix.
Ludwik Silberstein studied a complexified electromagnetic field E + hB, where there are three components, each a complex number, known as the Riemann–Silberstein vector.[5][6]
"Bivectors [...] help describe elliptically polarized homogeneous and inhomogeneous plane waves – one vector for direction of propagation, one for amplitude."[7]
References
edit- ^ a b Hamilton, W.R. (1853). "On the geometrical interpretation of some results obtained by calculation with biquaternions" (PDF). Proceedings of the Royal Irish Academy. 5: 388–390. Link from David R. Wilkins collection at Trinity College, Dublin
- ^ Shaw, Ronald; Bowtell, Graham (1969). "The Bivector Logarithm of a Lorentz Transformation". Quarterly Journal of Mathematics. 20 (1): 497–503. doi:10.1093/qmath/20.1.497.
- ^ Shaw, Ronald (1970). "The subgroup structure of the homogeneous Lorentz group". Quarterly Journal of Mathematics. 21 (1): 101–124. doi:10.1093/qmath/21.1.101.
- ^ a b Edwin Bidwell Wilson (1901) Vector Analysis
- ^ Silberstein, Ludwik (1907). "Elektromagnetische Grundgleichungen in bivectorieller Behandlung" (PDF). Annalen der Physik. 327 (3): 579–586. Bibcode:1907AnP...327..579S. doi:10.1002/andp.19073270313.
- ^ Silberstein, Ludwik (1907). "Nachtrag zur Abhandlung über 'Elektromagnetische Grundgleichungen in bivectorieller Behandlung'" (PDF). Annalen der Physik. 329 (14): 783–4. Bibcode:1907AnP...329..783S. doi:10.1002/andp.19073291409.
- ^ "Telegraphic reviews §Bivectors and Waves in Mechanics and Optics". American Mathematical Monthly. 102 (6): 571. 1995. doi:10.1080/00029890.1995.12004621.
- Boulanger, Ph.; Hayes, M.A. (1993). Bivectors and Waves in Mechanics and Optics. CRC Press. ISBN 978-0-412-46460-7.
- Boulanger, P.H.; Hayes, M. (1991). "Bivectors and inhomogeneous plane waves in anisotropic elastic bodies". In Wu, Julian J.; Ting, Thomas Chi-tsai; Barnett, David M. (eds.). Modern theory of anisotropic elasticity and applications. Society for Industrial and Applied Mathematics. p. 280 et seq. ISBN 0-89871-289-0.
- Hamilton, William Rowan (1853). Lectures on Quaternions. Royal Irish Academy. Link from Cornell University Historical Mathematics Collection.
- Hamilton, William Edwin, ed. (1866). Elements of Quaternions. University of Dublin Press. p. 219.