Kuaternion

Sebagai himpunan, kuaternion, berlambang H, sama dengan R⁴ yang merupakan ruang vektor bilangan riil empat dimensi. H memiliki tiga macam operasi: pertambahan, perkalian skalar dan perkalian kuaternion. Elemen-elemen kuaternion ditandakan sebagai 1, i, j dan k (i, j dan k adalah komponen imaginer), dan dapat ditulis sebagai kombinasi linear, a + bi + cj + dk (a, b, c, dan d adalah bilangan riil).

Kuaternion ${\displaystyle p=a+bi+cj+dk}$  bisa dituliskan sebagai ${\displaystyle p=a+{\vec {u}}}$  di mana ${\displaystyle {\vec {u}}}$  adalah vektor 3 bilangan imaginer, ${\displaystyle {\vec {u}}=\{bi+cj+dk\}}$ .

Persamaan elemen kuaternion i, j, dan k adalah:

${\displaystyle i^{2}=j^{2}=k^{2}=ijk=-1,\ }$ 

Karena

${\displaystyle -1=ijk,\ }$ 

jika dua sisi dikalikan dengan k, maka

${\displaystyle {\begin{aligned}-k&=ijkk=ij(k^{2})=ij(-1),\\k&=ij.\end{aligned}}}$ 

Persamaan-persamaan yang lainnya juga bisa didapatkan dengan tahap aljabar:

${\displaystyle {\begin{alignedat}{2}ij&=k,&\qquad ji&=-k,\\jk&=i,&kj&=-i,\\ki&=j,&ik&=-j,\end{alignedat}}}$ 

Persamaan-persamaan ini lalu bisa ditampilkan dengan tabel di bawah ini:

${\displaystyle {\begin{aligned}&p_{1}+p_{2}=(a_{1}+b_{1}i+c_{1}j+d_{1}k)+(a_{2}+b_{2}i+c_{2}j+d_{2}k)\\&=(a_{1}+a_{2})+(b_{1}+b_{2})i+(c_{1}+c_{2})j+(d_{1}+d_{2})k\end{aligned}}}$ 

${\displaystyle {\begin{aligned}&p_{1}-p_{2}=(a_{1}+b_{1}i+c_{1}j+d_{1}k)-(a_{2}+b_{2}i+c_{2}j+d_{2}k)\\&=(a_{1}-a_{2})+(b_{1}-b_{2})i+(c_{1}-c_{2})j+(d_{1}-d_{2})k\end{aligned}}}$ 

${\displaystyle {\begin{aligned}&p_{1}\times p_{2}\\&=(a_{1}a_{2}-b_{1}b_{2}-c_{1}c_{2}-d_{1}d_{2})+(b_{1}a_{2}+a_{1}b_{2}-d_{1}c_{2}+c_{1}d_{2})i+(c_{1}a_{2}+d_{1}b_{2}+a_{1}c_{2}-b_{1}d_{2})j+(d_{1}a_{2}-c_{1}b_{2}+b_{1}c_{2}+a_{1}d_{2})k\end{aligned}}}$ 

Bila kuaternion dituliskan dengan bentuk ${\displaystyle p=a+{\vec {u}}}$ , maka:

${\displaystyle {\begin{aligned}&p_{1}\times p_{2}\\&=(a_{1}+{\vec {u_{1}}})\times (a_{2}+{\vec {u_{2}}})\\&=(a_{1}a_{2}-{\vec {u_{1}}}\cdot {\vec {u_{2}}})+(a_{1}{\vec {u_{2}}}+a_{2}{\vec {u_{1}}}+{\vec {u_{1}}}\times {\vec {u_{2}}})\end{aligned}}}$ 

${\displaystyle {\begin{aligned}&p_{1}/p_{2}\\&={\frac {a_{1}a_{2}+b_{1}b_{2}+c_{1}c_{2}+d_{1}d_{2}}{m}}+{\frac {b_{1}a_{2}-a_{1}b_{2}-d_{1}c_{2}+c_{1}d_{2}}{m}}i+{\frac {c_{1}a_{2}+d_{1}b_{2}-a_{1}c_{2}-b_{1}d_{2}}{m}}j+{\frac {d_{1}a_{2}-c_{1}b_{2}+b_{1}c_{2}-a_{1}d_{2}}{m}}k\end{aligned}}}$  di mana ${\displaystyle m=a_{2}^{2}+b_{2}^{2}+c_{2}^{2}+d_{2}^{2}}$ 

Suatu kuaternion p = a + bi + cj + dk memiliki konjugat p*, dan didapatkan dengan rumus berikut:

${\displaystyle {\begin{alignedat}{2}p*=a-bi-cj-dk\end{alignedat}}}$ 

Persamaan-persamaan konjugasi kuaternion adalah:

${\displaystyle {\begin{matrix}(p^{*})^{*}&=&p\\(pq)^{*}&=&q^{*}p^{*}\\(p^{-1})^{*}&=&{\frac {p}{\|p\|^{2}}}\\(p^{*})^{-1}&=&{\frac {p}{\|p\|^{2}}}\\(p^{-1})^{-1}&=&p\\(p_{1}+p_{2})^{*}&=&p_{1}^{*}+p_{2}^{*}\\\end{matrix}}\,}$ 

Dengan fungsi Norma ${\displaystyle N()}$ , bila ${\displaystyle N(p)=1}$ , maka:

${\displaystyle {\begin{matrix}p&=&\cos(\theta )+{\vec {u}}\sin(\theta )\\p&=&\cos(\theta )+{\hat {u}}\sin(\theta )\end{matrix}}\,}$ 

di mana

${\displaystyle \left\|{\vec {u}}\right\|=1}$ 

Kuaternion, seperti bilangan kompleks, bisa ditulis dalam bentuk matriks, yaitu matriks kompleks 2x2 atau matriks riil 4x4.

Bentuk matriks kompleks 2x2 untuk kuaternion a + bi + cj + dk adalah:

${\displaystyle {\begin{bmatrix}a+bi&c+di\\-c+di&a-bi\end{bmatrix}}=a{\begin{bmatrix}\;\;1&0\\0&1\end{bmatrix}}+b{\begin{bmatrix}\;\;i&0\\0&-i\end{bmatrix}}+c{\begin{bmatrix}\;\;0&1\\-1&0\end{bmatrix}}+d{\begin{bmatrix}\;\;0&i\\i&0\end{bmatrix}}}$ 

Bentuk matriks riil 4x4 untuk kuaternion a + bi + cj + dk adalah:

${\displaystyle {\begin{bmatrix}a&b&c&d\\-b&a&-d&c\\-c&d&a&-b\\-d&-c&b&a\end{bmatrix}}=a{\begin{bmatrix}1&0&0&0\\0&1&0&0\\0&0&1&0\\0&0&0&1\end{bmatrix}}+b{\begin{bmatrix}0&1&0&0\\-1&0&0&0\\0&0&0&-1\\0&0&1&0\end{bmatrix}}+c{\begin{bmatrix}0&0&1&0\\0&0&0&1\\-1&0&0&0\\0&-1&0&0\end{bmatrix}}+d{\begin{bmatrix}0&0&0&1\\0&0&-1&0\\0&1&0&0\\-1&0&0&0\end{bmatrix}}}$ 

Selain itu juga terdapat bentuk matriks 3x3 yang digunakan dalam grafika komputer. Berikut adalah bentuk matriks kolom-utama (column-major) yang digunakan di OpenGL. (Matriks baris-utama (row-major) yang digunakan di DirectX sama dengan transposa matriks kolom-utama)

${\displaystyle {\begin{bmatrix}1-2(c^{2}+d^{2})&2(bc-da)&2(bd+ca)\\2(bc+da)&1-2(b^{2}+d^{2})&2(cd-ba)\\2(bd-ca)&2(cd+ba)&1-2(b^{2}+c^{2})\end{bmatrix}}}$ 

${\displaystyle N(p)=N(a+bi+cj+dk)=a^{2}+b^{2}+c^{2}+d^{2}}$ 

Dan juga,

${\displaystyle {\begin{matrix}N(p^{*})&=&N(p)\\N(pq)&=&N(p)N(q)\end{matrix}}}$ 

${\displaystyle p^{-1}={\frac {p^{*}}{N(p)}}}$ 

Dan juga,

${\displaystyle {\begin{matrix}pp^{-1}&=&p^{-1}p\\pp^{-1}&=&1\\(p^{-1})^{-1}&=&p\\(pq)^{-1}&=&q^{-1}p^{-1}\end{matrix}}}$ 

Meskipun tertetap sangat sederhana, fungsi yang hasilnya adalah bagiannya bilangan riil kuaternion ini memiliki kegunaannya tersendiri. ${\displaystyle W(p)=W(a+bi+cj+dk)=a}$ 

Dan juga,

${\displaystyle {\begin{matrix}W(p)&=&(p+p^{*})/2\end{matrix}}}$ 

Dari kuaternion ${\displaystyle p_{2}={\frac {p+(p^{*})}{2}}}$ 

Maka: ${\displaystyle Scalar(p)=a_{2}}$ 

${\displaystyle \operatorname {sgn}(p)={\frac {p}{|p|}}}$ 

${\displaystyle \arg(p)=\arccos({\frac {Scalar(p)}{|p|}})}$ 

Fungsi ekponensial: ${\displaystyle \exp(p)=\exp(a)(\cos(|{\vec {u}}|)+\operatorname {sgn}({\vec {u}})\sin(|{\vec {u}}|))}$ 

Logaritma natural: ${\displaystyle \ln(|p|)=\ln(|p|)+\operatorname {sgn}({\vec {u}})\arg(p)}$ 

Pangkat: ${\displaystyle p^{q}=e^{q\ln(p)}}$ 

${\displaystyle \sin(p)=\sin(a)\cosh(|{\vec {u}}|)+\cos(a)\operatorname {sgn}({\vec {u}})\sinh(|{\vec {u}}|)}$ 

${\displaystyle \cos(p)=\cos(a)\cosh(|{\vec {u}}|)-\sin(a)\operatorname {sgn}({\vec {u}})\sinh(|{\vec {u}}|)}$ 

${\displaystyle \tan(p)={\frac {\sin(p)}{\cos(p)}}}$ 

${\displaystyle \sinh(p)=\sinh(a)\cos(|{\vec {u}}|)+\cosh(a)\operatorname {sgn}({\vec {u}})\sin(|{\vec {u}}|)}$ 

${\displaystyle \cosh(p)=\cosh(a)\cos(|{\vec {u}}|)+\sinh(a)\operatorname {sgn}({\vec {u}})\sin(|{\vec {u}}|)}$ 

${\displaystyle \tanh(p)={\frac {\sinh(p)}{\cosh(p)}}}$ 

${\displaystyle \operatorname {arcsinh} (p)=\ln(p+{\sqrt {p^{2}+1}})}$ 

${\displaystyle \operatorname {arccosh} (p)=\ln(p+{\sqrt {p^{2}-1}})}$ 

${\displaystyle \operatorname {arctanh} (p)={\frac {\ln(1+p)-\ln(1-p)}{2}}}$ 

Kuaternion satuan: ${\displaystyle p=\cos(\theta )+{\hat {u}}\sin(\theta )}$ 

${\displaystyle {\begin{aligned}&p^{t}=(\cos(\theta )+{\hat {u}}\sin(\theta ))^{t}\\&=\exp({\hat {u}}t\theta )\\&=\cos(t\theta )+{\hat {u}}\sin(t\theta )\end{aligned}}}$ 

${\displaystyle {\begin{aligned}&\log(p)=\log(\cos(\theta )+{\hat {u}}\sin(\theta ))\\&=\log(\exp({\hat {u}}\theta ))\\&={\hat {u}}\theta \end{aligned}}}$ 

${\displaystyle {\frac {d}{dt}}p^{t}=p^{t}\log(p)}$ 

Fungsi rotasi vektor dapat menggunakan operasi kuaternion daripada operasi matriks riil 4x4, dengan rumus:

${\displaystyle {\begin{aligned}&r=qvq*\\\end{aligned}}}$ 

di mana

${\displaystyle {\begin{aligned}&v=1+x_{A}i+y_{A}j+z_{A}k\\&q=\cos {\frac {\alpha }{2}}+\sin {\frac {\alpha }{2}}x_{v}i+\sin {\frac {\alpha }{2}}y_{v}j+\sin {\frac {\alpha }{2}}z_{v}k\\&r=1+x_{A}'i+y_{A}'j+z_{A}'k\\\end{aligned}}}$ 

dan A adalah posisi benda yang dirotasikan, v adalah vektor poros rotasi, dan α adalah sudut rotasi berlawanan arah jarum jam.

• Hamilton, William Rowan. On quaternions, or on a new system of imaginaries in algebra. Philosophical Magazine. Vol. 25, n 3. p. 489–495. 1844.
• Hamilton, William Rowan (1853), "Lectures on Quaternions". Royal Irish Academy.
• Hamilton (1866) Elements of Quaternions University of Dublin Press. Edited by William Edwin Hamilton, son of the deceased author.
• Hamilton (1899) Elements of Quaternions volume I, (1901) volume II. Edited by Charles Jasper Joly; published by Longmans, Green & Co..
• Tait, Peter Guthrie (1873), "An elementary treatise on quaternions". 2d ed., Cambridge, [Eng.]: The University Press.
• Michiel Hazewinkel, Nadiya Gubareni, Nadezhda Mikhaĭlovna Gubareni, Vladimir V. Kirichenko. Algebras, rings and modules. Volume 1. 2004. Springer, 2004. ISBN 1-4020-2690-0
• Maxwell, James Clerk (1873), "A Treatise on Electricity and Magnetism". Clarendon Press, Oxford.
• Tait, Peter Guthrie (1886), "Quaternion di www.ugcs.caltech.edu Galat: URL arsip tidak dikenal (diarsipkan tanggal 20140808040037)". M.A. Sec. R.S.E. Encyclopaedia Britannica, Ninth Edition, 1886, Vol. XX, pp. 160–164. (bzipped PostScript file)
• Joly, Charles Jasper (1905), "A manual of quaternions". London, Macmillan and co., limited; New York, The Macmillan company. LCCN 05036137 //r84
• Macfarlane, Alexander (1906), "Vector analysis and quaternions", 4th ed. 1st thousand. New York, J. Wiley & Sons; [etc., etc.]. LCCN es 16000048
• 1911 encyclopedia: "Quaternions".
• Finkelstein, David, Josef M. Jauch, Samuel Schiminovich, and David Speiser (1962), "Foundations of quaternion quantum mechanics". J. Mathematical Phys. 3, pp. 207–220, MathSciNet.
• Du Val, Patrick (1964), "Homographies, quaternions, and rotations". Oxford, Clarendon Press (Oxford mathematical monographs). LCCN 64056979 //r81
• Crowe, Michael J. (1967), A History of Vector Analysis: The Evolution of the Idea of a Vectorial System, University of Notre Dame Press. Surveys the major and minor vector systems of the 19th century (Hamilton, Möbius, Bellavitis, Clifford, Grassmann, Tait, Peirce, Maxwell, Macfarlane, MacAuley, Gibbs, Heaviside).
• Altmann, Simon L. (1986), "Rotations, quaternions, and double groups". Oxford [Oxfordshire]: Clarendon Press ; New York: Oxford University Press. LCCN 85013615 ISBN 0-19-855372-2
• Altmann, Simon L. (1989), "Hamilton, Rodrigues, and the Quaternion Scandal". Mathematics Magazine. Vol. 62, No. 5. p. 291–308, Dec. 1989.
• Adler, Stephen L. (1995), "Quaternionic quantum mechanics and quantum fields". New York: Oxford University Press. International series of monographs on physics (Oxford, England) 88. LCCN 94006306 ISBN 0-19-506643-X
• Trifonov, Vladimir (1995), "A Linear Solution of the Four-Dimensionality Problem", Europhysics Letters, 32 (8) 621–626, DOI: 10.1209/0295-5075/32/8/001
• Ward, J. P. (1997), "Quaternions and Cayley Numbers: Algebra and Applications", Kluwer Academic Publishers. ISBN 0-7923-4513-4
• Kantor, I. L. and Solodnikov, A. S. (1989), "Hypercomplex numbers, an elementary introduction to algebras", Springer-Verlag, New York, ISBN 0-387-96980-2
• Gürlebeck, Klaus and Sprössig, Wolfgang (1997), "Quaternionic and Clifford calculus for physicists and engineers". Chichester ; New York: Wiley (Mathematical methods in practice; v. 1). LCCN 98169958 ISBN 0-471-96200-7
• Kuipers, Jack (2002), "Quaternions and Rotation Sequences: A Primer With Applications to Orbits, Aerospace, and Virtual Reality" (reprint edition), Princeton University Press. ISBN 0-691-10298-8
• Conway, John Horton, and Smith, Derek A. (2003), "On Quaternions and Octonions: Their Geometry, Arithmetic, and Symmetry", A. K. Peters, Ltd. ISBN 1-56881-134-9 (review).
• Kravchenko, Vladislav (2003), "Applied Quaternionic Analysis", Heldermann Verlag ISBN 3-88538-228-8.
• Hanson, Andrew J. (2006), "Visualizing Quaternions", Elsevier: Morgan Kaufmann; San Francisco. ISBN 0-12-088400-3
• Trifonov, Vladimir</ref> (2007), "Natural Geometry of Nonzero Quaternions", International Journal of Theoretical Physics, 46 (2) 251–257, DOI: 10.1007/s10773-006-9234-9
• Ernst Binz & Sonja Pods (2008) Geometry of Heisenberg Groups American Mathematical Society, Chapter 1: "The Skew Field of Quaternions" (23 pages) ISBN 978-0-8218-4495-3.
• Vince, John A. (2008), Geometric Algebra for Computer Graphics, Springer, ISBN 978-1-84628-996-5.
• For molecules that can be regarded as classical rigid bodies molecular dynamics computer simulation employs quaternions. They were first introduced for this purpose by D.J. Evans, (1977), "On the Representation of Orientation Space", Mol. Phys., vol 34, p 317.