例句與造句

1. They can be considered as a hyperbolic rotation of Minkowski space.
2. The group consists of so named hyperbolic rotations.
3. In retrospect, we can see that the Lorentz transformations are equivalent to hyperbolic rotations.
4. The automorphisms of the binary tree are its hyperbolic rotations, and are given by the modular group.
5. Euclidean geometry corresponds to the ordinary idea of rotation, while Minkowski s geometry corresponds to hyperbolic rotation.
6. It's difficult to find hyperbolic rotation in a sentence. 用hyperbolic rotation造句挺難的
7. The study of relativity is concerned with the Lorentz group generated by the space rotations and hyperbolic rotations.
8. The collection of these mappings bears some relation to the Lorentz group since it is also composed of ordinary and hyperbolic rotations.
9. In the Minkowski geometry, lines that are hyperbolic-orthogonal remain in that relation when the plane is subjected to hyperbolic rotation.
10. In 1908 Hermann Minkowski explained how the Lorentz transformation could be seen as simply a hyperbolic rotation of the Rindler ( 2001 ).
11. The authors Edwin B . Wilson and Gilbert N . Lewis then proceed beyond absolute geometry when they introduce hyperbolic rotation as the transformation relating two frames of reference.
12. But a rotation in a plane spanned by a space dimension and a time dimension is a hyperbolic rotation, a transformation between two different pseudo-Euclidean nature of the Minkowski space.
13. For instance, his book " Introduction Geometrique ?quelques Th閛ries Physiques " described hyperbolic rotations as transformations that leave a hyperbola stable just as a circle around a rotational center is stable.
14. The perspective of the group of squeeze mappings as hyperbolic rotation is analogous to interpreting the group ( the connected component of the definite orthogonal group ) preserving quadratic form ) as being " circular rotations ".
15. For this reason it is natural to think of the squeeze mapping as a "'hyperbolic rotation "', as did 蒻ile Borel in 1914, by analogy with " circular rotations " which preserve circles.
16. The " rotation " in a plane spanned by a space unit vector and a time unit vector, while formally still a rotation in coordinate space, is a Lorentz boost in physical spacetime with " real " inertial coordinates ( see also hyperbolic rotation ).
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