- Hyperbolic-orthogonal
In
mathematics , two points in theCartesian plane are hyperbolically orthogonal if theslope s of their rays from the origin arereciprocal to one another.If the points are ("x","y") and ("u","v"), then they are hyperbolically orthogonal if
:"y"/"x" = "u"/"v".
Using
complex numbers "z" = "x" + "y" i and "w" = "u" + "v" i, the points "z" and "w" in C are hyperbolically orthogonal if thereal part of their complex product is zero, i.e.:"xu" - "yv" = 0.
If two hyperbolically-orthogonal points form two angles with the horizontal axis, then they are
complementary angles .Since
Hermann Minkowski 's foundation forspacetime study in 1908, the concept of points in a spacetime plane being hyperbolic-orthogonal to a timeline (tangent to aWorld line ) has been used to define simultaneity of events relative to the timeline. To see Minkowski's use of the concept, click on the link below and scroll down to the expression:.When "c" = 1 and the y's and z's are zero, then ("x,t") and are hyperbolic-orthogonal.To get away from the dependence on
analytic geometry in the above definition,Edwin Bidwell Wilson andGilbert N. Lewis provided an approach using the ideas ofsynthetic geometry in 1912: the radius to a point on anhyperbola and the tangent line at that point are hyperbolic-orthogonal. They note (p.415) "in our plane no pair of perpendicular [hyperbolic-orthogonal] lines is better suited to serve as coordinate axes than any other pair", an expression of thePrinciple of relativity .References
*Herman Minkowski (1908) [http://de.wikisource.org/wiki/Raum_und_Zeit_(Minkowski) "Raum und Zeit"] .
*Edwin B. Wilson & Gilbert N. Lewis (1912) "The Space-time Manifold of Relativity. The Non-Euclidean Geometry of Mechanics and Electromagnetics" Proceedings of theAmerican Academy of Arts and Sciences 48:387-507.
* [http://ca.geocities.com/cocklebio/synsptm.html Synthetic Spacetime] (excerpt from above)
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