Difference between revisions of "Semi-hyperbolic space"
(Importing text file) |
Ulf Rehmann (talk | contribs) m (tex encoded by computer) |
||
Line 1: | Line 1: | ||
− | + | <!-- | |
+ | s0841701.png | ||
+ | $#A+1 = 66 n = 0 | ||
+ | $#C+1 = 66 : ~/encyclopedia/old_files/data/S084/S.0804170 Semi\AAhhyperbolic space | ||
+ | Automatically converted into TeX, above some diagnostics. | ||
+ | Please remove this comment and the {{TEX|auto}} line below, | ||
+ | if TeX found to be correct. | ||
+ | --> | ||
− | + | {{TEX|auto}} | |
+ | {{TEX|done}} | ||
− | + | A projective $ n $- | |
+ | space in which the metric is defined by a given absolute consisting of the following collection: a second-order real cone $ Q _ {0} $ | ||
+ | of index $ l _ {0} $ | ||
+ | with an $ ( n - m _ {0} - 1 ) $- | ||
+ | plane vertex $ T _ {0} $; | ||
+ | a real $ ( n - m _ {0} - 2 ) $- | ||
+ | cone $ Q _ {1} $ | ||
+ | of index $ l _ {1} $ | ||
+ | with an $ ( n - m _ {1} - 1 ) $- | ||
+ | plane vertex $ T _ {1} $ | ||
+ | in the $ ( n - m _ {0} - 1 ) $- | ||
+ | plane $ T _ {0} $; | ||
+ | $ \dots $; | ||
+ | a real $ ( n - m _ {r-} 2 - 2 ) $- | ||
+ | cone $ Q _ {r-} 1 $ | ||
+ | of index $ l _ {r-} 1 $ | ||
+ | with an $ ( n - m _ {r-} 1 - 1 ) $- | ||
+ | plane vertex $ T _ {r-} 1 $; | ||
+ | and a non-degenerate real $ ( n - m _ {r-} 1 - 2 ) $- | ||
+ | quadric $ Q _ {2} $ | ||
+ | of index $ l _ {2} $ | ||
+ | in the plane $ T _ {r-} 1 $; | ||
+ | $ 0 \leq m _ {0} < m _ {1} < \dots < m _ {r-} 1 < n $. | ||
+ | This is the definition of a semi-hyperbolic space with indices $ l _ {0} \dots l _ {r} $; | ||
+ | it is denoted by $ {} ^ {l _ {0} {} \dots l _ {r} } S _ {n} ^ {m _ {0} \dots m _ {r-} 1 } $. | ||
− | + | If the cone $ Q _ {0} $ | |
+ | is a pair of merging planes, both identical with $ T _ {0} $( | ||
+ | for $ m _ {0} = 0 $), | ||
+ | the semi-hyperbolic plane with the improper plane $ T _ {0} $ | ||
+ | is called a [[Semi-Euclidean space|semi-Euclidean space]]: | ||
− | Depending on the position of the absolute relative to the planes | + | $$ |
+ | {} ^ {l _ {1} \dots l _ {r} } R _ {n} ^ {m _ {1} \dots m _ {r-} 1 } . | ||
+ | $$ | ||
+ | |||
+ | The distance between two points $ X $ | ||
+ | and $ Y $ | ||
+ | is defined as a function of the position of the straight line $ X Y $ | ||
+ | relative to the planes $ T _ {0} \dots T _ {r-} 1 $. | ||
+ | In particular, if $ X X $ | ||
+ | does not intersect $ T _ {0} $, | ||
+ | the distance between $ X $ | ||
+ | and $ Y $ | ||
+ | is defined through a scalar product, in analogy with the appropriate definition in a [[Quasi-hyperbolic space|quasi-hyperbolic space]]. If $ X Y $ | ||
+ | intersects $ T _ {0} $ | ||
+ | but does not intersect $ T _ {1} $, | ||
+ | or it intersects $ T _ {a-} 1 $ | ||
+ | but does not intersect $ T _ {a} $, | ||
+ | the distance between the points is defined as the scalar product with itself of the distance between the vectors of the points $ X $ | ||
+ | and $ Y $. | ||
+ | |||
+ | Depending on the position of the absolute relative to the planes $ T _ {0} \dots T _ {a} \dots $ | ||
+ | one distinguishes four types of straight lines of different orders: elliptic, hyperbolic, isotropic, and parabolic. | ||
The angles between the planes in a semi-hyperbolic space are defined analogous to the angles between the planes in a quasi-hyperbolic space, i.e. using distance in the dual space. | The angles between the planes in a semi-hyperbolic space are defined analogous to the angles between the planes in a quasi-hyperbolic space, i.e. using distance in the dual space. | ||
− | A projective metric in a semi-hyperbolic space is a metric of the most general form. A particular case of such a metric is a metric of a quasi-hyperbolic space. In particular, the | + | A projective metric in a semi-hyperbolic space is a metric of the most general form. A particular case of such a metric is a metric of a quasi-hyperbolic space. In particular, the $ 2 $- |
+ | plane $ {} ^ {01} S _ {2} ^ {0} $ | ||
+ | is identical with the pseudo-Euclidean space $ {} ^ {1} R _ {2} $, | ||
+ | the plane $ {} ^ {10} S _ {2} ^ {1} $— | ||
+ | with the co-pseudo-Euclidean space $ {} ^ {1} R _ {2} ^ {*} $; | ||
+ | the $ 3 $- | ||
+ | spaces $ {} ^ {11} S _ {3} ^ {1} $ | ||
+ | and $ {} ^ {10} S _ {3} ^ {1} $ | ||
+ | coincide with the quasi-hyperbolic $ 3 $- | ||
+ | space, the $ 3 $- | ||
+ | space $ {} ^ {10} S _ {3} ^ {2} $— | ||
+ | with the co-pseudo-Euclidean space $ {} ^ {1} R _ {3} ^ {*} $, | ||
+ | etc. The $ 3 $- | ||
+ | space $ {} ^ {100} S _ {3} ^ {12} $ | ||
+ | is dual to the pseudo-Galilean space $ {} ^ {1} \Gamma _ {3} $, | ||
+ | it is known as a co-pseudo-Galilean space; its absolute consists of pairs of real planes (a cone $ Q _ {0} $) | ||
+ | and a point $ T _ {1} $ | ||
+ | on the straight line $ T _ {0} $ | ||
+ | in which these planes intersect. | ||
− | The motions of a semi-hyperbolic space are defined as collineations of the space which map the absolute into itself. If | + | The motions of a semi-hyperbolic space are defined as collineations of the space which map the absolute into itself. If $ m _ {a} = n- m _ {r-} a- 1 - 1 $ |
+ | and $ l _ {a} = l _ {r-} a $, | ||
+ | a semi-hyperbolic space is dual to itself. It is then possible to define co-motions, the definition being analogous to that of co-motions in a self-dual quasi-hyperbolic space. The group of motions and the group of motions and co-motions are Lie groups. The motions (and co-motions) of a semi-hyperbolic space are described by pseudo-orthogonal operators with indices determined by the indices of the space. | ||
A semi-hyperbolic space is a [[Semi-Riemannian space|semi-Riemannian space]]. | A semi-hyperbolic space is a [[Semi-Riemannian space|semi-Riemannian space]]. | ||
Line 19: | Line 96: | ||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> D.M.Y. Sommerville, ''Proc. Edinburgh Math. Soc.'' , '''28''' (1910) pp. 25–41</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> B.A. Rozenfel'd, "Non-Euclidean spaces" , Moscow (1969) (In Russian)</TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> D.M.Y. Sommerville, ''Proc. Edinburgh Math. Soc.'' , '''28''' (1910) pp. 25–41</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> B.A. Rozenfel'd, "Non-Euclidean spaces" , Moscow (1969) (In Russian)</TD></TR></table> | ||
− | |||
− | |||
====Comments==== | ====Comments==== | ||
− | |||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[a1]</TD> <TD valign="top"> B.A. [B.A. Rozenfel'd] Rosenfel'd, "A history of non-euclidean geometry" , Springer (1988) (Translated from Russian)</TD></TR></table> | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> B.A. [B.A. Rozenfel'd] Rosenfel'd, "A history of non-euclidean geometry" , Springer (1988) (Translated from Russian)</TD></TR></table> |
Revision as of 08:13, 6 June 2020
A projective $ n $-
space in which the metric is defined by a given absolute consisting of the following collection: a second-order real cone $ Q _ {0} $
of index $ l _ {0} $
with an $ ( n - m _ {0} - 1 ) $-
plane vertex $ T _ {0} $;
a real $ ( n - m _ {0} - 2 ) $-
cone $ Q _ {1} $
of index $ l _ {1} $
with an $ ( n - m _ {1} - 1 ) $-
plane vertex $ T _ {1} $
in the $ ( n - m _ {0} - 1 ) $-
plane $ T _ {0} $;
$ \dots $;
a real $ ( n - m _ {r-} 2 - 2 ) $-
cone $ Q _ {r-} 1 $
of index $ l _ {r-} 1 $
with an $ ( n - m _ {r-} 1 - 1 ) $-
plane vertex $ T _ {r-} 1 $;
and a non-degenerate real $ ( n - m _ {r-} 1 - 2 ) $-
quadric $ Q _ {2} $
of index $ l _ {2} $
in the plane $ T _ {r-} 1 $;
$ 0 \leq m _ {0} < m _ {1} < \dots < m _ {r-} 1 < n $.
This is the definition of a semi-hyperbolic space with indices $ l _ {0} \dots l _ {r} $;
it is denoted by $ {} ^ {l _ {0} {} \dots l _ {r} } S _ {n} ^ {m _ {0} \dots m _ {r-} 1 } $.
If the cone $ Q _ {0} $ is a pair of merging planes, both identical with $ T _ {0} $( for $ m _ {0} = 0 $), the semi-hyperbolic plane with the improper plane $ T _ {0} $ is called a semi-Euclidean space:
$$ {} ^ {l _ {1} \dots l _ {r} } R _ {n} ^ {m _ {1} \dots m _ {r-} 1 } . $$
The distance between two points $ X $ and $ Y $ is defined as a function of the position of the straight line $ X Y $ relative to the planes $ T _ {0} \dots T _ {r-} 1 $. In particular, if $ X X $ does not intersect $ T _ {0} $, the distance between $ X $ and $ Y $ is defined through a scalar product, in analogy with the appropriate definition in a quasi-hyperbolic space. If $ X Y $ intersects $ T _ {0} $ but does not intersect $ T _ {1} $, or it intersects $ T _ {a-} 1 $ but does not intersect $ T _ {a} $, the distance between the points is defined as the scalar product with itself of the distance between the vectors of the points $ X $ and $ Y $.
Depending on the position of the absolute relative to the planes $ T _ {0} \dots T _ {a} \dots $ one distinguishes four types of straight lines of different orders: elliptic, hyperbolic, isotropic, and parabolic.
The angles between the planes in a semi-hyperbolic space are defined analogous to the angles between the planes in a quasi-hyperbolic space, i.e. using distance in the dual space.
A projective metric in a semi-hyperbolic space is a metric of the most general form. A particular case of such a metric is a metric of a quasi-hyperbolic space. In particular, the $ 2 $- plane $ {} ^ {01} S _ {2} ^ {0} $ is identical with the pseudo-Euclidean space $ {} ^ {1} R _ {2} $, the plane $ {} ^ {10} S _ {2} ^ {1} $— with the co-pseudo-Euclidean space $ {} ^ {1} R _ {2} ^ {*} $; the $ 3 $- spaces $ {} ^ {11} S _ {3} ^ {1} $ and $ {} ^ {10} S _ {3} ^ {1} $ coincide with the quasi-hyperbolic $ 3 $- space, the $ 3 $- space $ {} ^ {10} S _ {3} ^ {2} $— with the co-pseudo-Euclidean space $ {} ^ {1} R _ {3} ^ {*} $, etc. The $ 3 $- space $ {} ^ {100} S _ {3} ^ {12} $ is dual to the pseudo-Galilean space $ {} ^ {1} \Gamma _ {3} $, it is known as a co-pseudo-Galilean space; its absolute consists of pairs of real planes (a cone $ Q _ {0} $) and a point $ T _ {1} $ on the straight line $ T _ {0} $ in which these planes intersect.
The motions of a semi-hyperbolic space are defined as collineations of the space which map the absolute into itself. If $ m _ {a} = n- m _ {r-} a- 1 - 1 $ and $ l _ {a} = l _ {r-} a $, a semi-hyperbolic space is dual to itself. It is then possible to define co-motions, the definition being analogous to that of co-motions in a self-dual quasi-hyperbolic space. The group of motions and the group of motions and co-motions are Lie groups. The motions (and co-motions) of a semi-hyperbolic space are described by pseudo-orthogonal operators with indices determined by the indices of the space.
A semi-hyperbolic space is a semi-Riemannian space.
References
[1] | D.M.Y. Sommerville, Proc. Edinburgh Math. Soc. , 28 (1910) pp. 25–41 |
[2] | B.A. Rozenfel'd, "Non-Euclidean spaces" , Moscow (1969) (In Russian) |
Comments
References
[a1] | B.A. [B.A. Rozenfel'd] Rosenfel'd, "A history of non-euclidean geometry" , Springer (1988) (Translated from Russian) |
Semi-hyperbolic space. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Semi-hyperbolic_space&oldid=18775