Difference between revisions of "Cayley-Klein parameters"
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− | + | Special coordinates in the rotation group $ \mathop{\rm SO} ( 3) $ | |
+ | of three-dimensional space, the construction of which is based in the final analysis on the relationship between $ \mathop{\rm SO} ( 3) $ | ||
+ | and the group $ \mathop{\rm SU} ( 2) $ | ||
+ | of $ 2 \times 2 $ | ||
+ | unitary matrices with determinant 1. There exists a mapping $ \phi : \mathop{\rm SU} ( 2) \rightarrow \mathop{\rm SO} ( 3) $ | ||
+ | which is an [[Epimorphism|epimorphism]] by virtue of its algebraic properties and a double [[Covering|covering]] by virtue of its topological properties. (Restricted to some neighbourhood of the identity matrix, $ \phi $ | ||
+ | is an isomorphism; in other words, $ \mathop{\rm SO} ( 3) $ | ||
+ | and $ \mathop{\rm SU} ( 2) $ | ||
+ | are locally isomorphic.) Each matrix $ V \in \mathop{\rm SU} ( 2) $ | ||
+ | may be written as | ||
− | + | $$ | |
+ | \left \| | ||
+ | \begin{array}{rr} | ||
+ | \alpha &\beta \\ | ||
+ | - \overline \beta &\overline \alpha \\ | ||
+ | \end{array} | ||
− | The | + | \right \| , |
+ | $$ | ||
+ | |||
+ | where $ \alpha , \beta $ | ||
+ | are complex numbers such that $ | \alpha | ^ {2} + | \beta | ^ {2} = 1 $. | ||
+ | These are taken to be the Cayley–Klein parameters of $ A = \phi ( V) $. | ||
+ | (The term is sometimes used for all four elements of the matrix $ V $.) | ||
+ | As the actual construction of a mapping $ \phi $ | ||
+ | with the above properties may be accomplished in various ways, different authors define the Cayley–Klein parameters in slightly different ways (see [[#References|[2]]], [[#References|[3]]]). | ||
+ | |||
+ | Since $ \phi $ | ||
+ | is not a true isomorphism, but only a double covering, it is impossible to define the Cayley–Klein parameters as (continuous) coordinates on all of $ \mathop{\rm SO} ( 3) $; | ||
+ | this can be done only locally. However, the Cayley–Klein parameters may nevertheless be used to study processes of rotation in which $ A $ | ||
+ | is a continuous function of a real parameter $ t $ (and there is no necessity to restrict the domain of possible values of $ A $ | ||
+ | in any way). Indeed, if some fixed value $ V ( t _ {0} ) \in \phi ^ {-1} ( A ( t _ {0} )) $ | ||
+ | has been chosen at $ t = t _ {0} $, | ||
+ | the corresponding values of $ V ( t) $ | ||
+ | are uniquely defined by continuity for all $ t $. | ||
+ | (The fact that the complete inverse $ \phi ^ {-1} $ | ||
+ | is double-valued intrudes only in the observation that $ A ( t) = A ( s) $ | ||
+ | not only when $ V ( t) = V ( s) $ | ||
+ | but also when $ V ( t) = - V ( s) $.) | ||
+ | Thus the Cayley–Klein parameters can be applied to investigate the motion of a rigid body with a fixed point (the configuration space of which is $ \mathop{\rm SO} ( 3) $). | ||
+ | This approach was adopted in [[#References|[1]]], but did not achieve popularity. | ||
+ | |||
+ | The group $ \mathop{\rm SU} ( 2) $ | ||
+ | is isomorphic to the group of quaternions with norm 1 (cf. [[Quaternion|Quaternion]]); hence, by going over from $ V $ | ||
+ | to the corresponding quaternion $ \rho + \lambda i + \mu j + \nu k $, | ||
+ | one can replace the Cayley–Klein parameters by the Euler–Rodriguez parameters — four real numbers $ \rho , \lambda , \mu , \nu $ | ||
+ | such that $ \rho ^ {2} + \lambda ^ {2} + \mu ^ {2} + \nu ^ {2} = 1 $. | ||
+ | These stand in a simple relationship to the Cayley–Klein parameters (see [[#References|[1]]], [[#References|[3]]]) and possess the same "double-valuedness" property (for the history of the problem see [[#References|[1]]]). It was essentially in this context that attention was first directed to two-valued representations of the rotation group (see [[Spinor|Spinor]]). | ||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> F. Klein, A. Sommerfeld, "Ueber die Theorie des Kreises" , '''1–2''' , Teubner (1965)</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> H. Goldstein, "Classical mechanics" , Addison-Wesley (1953)</TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> J.L. Synge, "Classical dynamics" , ''Handbuch der Physik'' , '''3/1''' , Springer (1960) pp. 1–225</TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> F. Klein, A. Sommerfeld, "Ueber die Theorie des Kreises" , '''1–2''' , Teubner (1965)</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> H. Goldstein, "Classical mechanics" , Addison-Wesley (1953)</TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> J.L. Synge, "Classical dynamics" , ''Handbuch der Physik'' , '''3/1''' , Springer (1960) pp. 1–225</TD></TR></table> | ||
− | |||
− | |||
====Comments==== | ====Comments==== | ||
− | |||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[a1]</TD> <TD valign="top"> P. Du Val, "Homographies, quaternions and rotations" , Clarendon Press (1964)</TD></TR></table> | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> P. Du Val, "Homographies, quaternions and rotations" , Clarendon Press (1964)</TD></TR></table> |
Latest revision as of 07:57, 4 March 2022
Special coordinates in the rotation group $ \mathop{\rm SO} ( 3) $
of three-dimensional space, the construction of which is based in the final analysis on the relationship between $ \mathop{\rm SO} ( 3) $
and the group $ \mathop{\rm SU} ( 2) $
of $ 2 \times 2 $
unitary matrices with determinant 1. There exists a mapping $ \phi : \mathop{\rm SU} ( 2) \rightarrow \mathop{\rm SO} ( 3) $
which is an epimorphism by virtue of its algebraic properties and a double covering by virtue of its topological properties. (Restricted to some neighbourhood of the identity matrix, $ \phi $
is an isomorphism; in other words, $ \mathop{\rm SO} ( 3) $
and $ \mathop{\rm SU} ( 2) $
are locally isomorphic.) Each matrix $ V \in \mathop{\rm SU} ( 2) $
may be written as
$$ \left \| \begin{array}{rr} \alpha &\beta \\ - \overline \beta &\overline \alpha \\ \end{array} \right \| , $$
where $ \alpha , \beta $ are complex numbers such that $ | \alpha | ^ {2} + | \beta | ^ {2} = 1 $. These are taken to be the Cayley–Klein parameters of $ A = \phi ( V) $. (The term is sometimes used for all four elements of the matrix $ V $.) As the actual construction of a mapping $ \phi $ with the above properties may be accomplished in various ways, different authors define the Cayley–Klein parameters in slightly different ways (see [2], [3]).
Since $ \phi $ is not a true isomorphism, but only a double covering, it is impossible to define the Cayley–Klein parameters as (continuous) coordinates on all of $ \mathop{\rm SO} ( 3) $; this can be done only locally. However, the Cayley–Klein parameters may nevertheless be used to study processes of rotation in which $ A $ is a continuous function of a real parameter $ t $ (and there is no necessity to restrict the domain of possible values of $ A $ in any way). Indeed, if some fixed value $ V ( t _ {0} ) \in \phi ^ {-1} ( A ( t _ {0} )) $ has been chosen at $ t = t _ {0} $, the corresponding values of $ V ( t) $ are uniquely defined by continuity for all $ t $. (The fact that the complete inverse $ \phi ^ {-1} $ is double-valued intrudes only in the observation that $ A ( t) = A ( s) $ not only when $ V ( t) = V ( s) $ but also when $ V ( t) = - V ( s) $.) Thus the Cayley–Klein parameters can be applied to investigate the motion of a rigid body with a fixed point (the configuration space of which is $ \mathop{\rm SO} ( 3) $). This approach was adopted in [1], but did not achieve popularity.
The group $ \mathop{\rm SU} ( 2) $ is isomorphic to the group of quaternions with norm 1 (cf. Quaternion); hence, by going over from $ V $ to the corresponding quaternion $ \rho + \lambda i + \mu j + \nu k $, one can replace the Cayley–Klein parameters by the Euler–Rodriguez parameters — four real numbers $ \rho , \lambda , \mu , \nu $ such that $ \rho ^ {2} + \lambda ^ {2} + \mu ^ {2} + \nu ^ {2} = 1 $. These stand in a simple relationship to the Cayley–Klein parameters (see [1], [3]) and possess the same "double-valuedness" property (for the history of the problem see [1]). It was essentially in this context that attention was first directed to two-valued representations of the rotation group (see Spinor).
References
[1] | F. Klein, A. Sommerfeld, "Ueber die Theorie des Kreises" , 1–2 , Teubner (1965) |
[2] | H. Goldstein, "Classical mechanics" , Addison-Wesley (1953) |
[3] | J.L. Synge, "Classical dynamics" , Handbuch der Physik , 3/1 , Springer (1960) pp. 1–225 |
Comments
References
[a1] | P. Du Val, "Homographies, quaternions and rotations" , Clarendon Press (1964) |
Cayley-Klein parameters. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Cayley-Klein_parameters&oldid=14805