minkowski metric造句

The Minkowski metric is the metric tensor of Minkowski space.
The reason is the indefiniteness of the Minkowski metric.
We will start it off as the Minkowski metric tensor for flat space.
In the language of spacetime geometry, it is not measured by the Minkowski metric.
Just as Euclidean space uses a Euclidean metric, so spacetime uses a Minkowski metric.
It's difficult to find minkowski metric in a sentence. 用minkowski metric造句挺难的

The geometry of spacetime in special relativity is described by the Minkowski metric on R 4.
Lorentz transformations leave the Minkowski metric invariant, so the d'Alembertian yields a Lorentz scalar.
The Minkowski metric is not a Euclidean metric, because it is indefinite ( see metric signature ).
The Minkowski metric tensor ? here has metric signature ( + " " " ).
Throughout we use the signs as above, different authors use different conventions see Minkowski metric alternative signs.
In the Newtonian limit, spacetime is approximately flat and the Minkowski metric may be used over finite distances.
Since Einstein's affine Minkowski metric is not Euclidean, this new 7 dimensional space is not Euclidean.
S / " r " go to zero, the metric becomes the Minkowski metric for special relativity.
In Rastall ( 1979 ), the metric is an algebraic function of the Minkowski metric and a Vector field.
The Minkowski metric is usually denoted by \ eta and can be written as a four-by-four matrix:

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