Examples of 'minkowski' in a sentence
Meaning of "minkowski"
Minkowski (noun) refers to a mathematical concept named after the mathematician Hermann Minkowski
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- A surname.
How to use "minkowski" in a sentence
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minkowski
Minkowski space has a causal structure.
This has nothing to do with minkowski.
Minkowski space refers to a mathematical formulation in four dimensions.
This is george minkowski.
Minkowski addition plays a central role in mathematical morphology.
An important example is the Minkowski content of a surface.
Minkowski can not come to the phone right now.
This is called the Minkowski spacetime metric.
Minkowski tells the survivors they will be sending rescue.
So far we have discussed only Minkowski spacetime.
Minkowski sums are used in motion planning of an object among obstacles.
This is the case of the Minkowski diagram.
Minkowski can not comv to thv phonv right now.
Where η is the Minkowski metric tensor with signature.
Minkowski diagrams in special relativity.
See also
She is a member of the Minkowski institute.
Minkowski convex body theorem.
In special relativity these are straight lines in Minkowski space.
Minkowski was not answering.
This transformation can be illustrated with a Minkowski diagram.
Minkowski spacetime is a simple example of a Lorentzian manifold.
They can be considered as a hyperbolic rotation of Minkowski space.
Elements of Minkowski space are called events.
This is detailed in geometry of Minkowski space.
Einstein and Minkowski demonstrated that the natural.
This is a compactification of complex Minkowski space.
Flat Minkowski space is the simplest example of a vacuum solution.
The reason is the indefiniteness of the Minkowski metric.
The box dimension or Minkowski dimension is a variant of the same idea.
Lorentz transformations are thus orthogonal transformations in Minkowski space.
It establishes Minkowski space as a stable ground state of the gravitational field.
One such usage is as a synonym for super Minkowski space.
A Minkowski light cone represents the expansion of time and space.
One assumes uniform circular motion in flat Minkowski spacetime.
Consider an inertial observer in Minkowski spacetime who encounters a sandwich plane wave.
An example of a null field is a plane electromagnetic wave in Minkowski space.
This is exactly what Minkowski did for quadratic form with fractional coefficients.
One proof of the theorem uses the properties of Minkowski sums.
So Minkowski spacetime and the surface of the earth are examples of curved spaces.
The hyperboloid model is closely related to the geometry of Minkowski space.
We combine these functions with a weighted Minkowski sum so as to obtain a final quality score.
An observer moving with fixed ρ traces out a hyperbola in Minkowski space.
For the space model of the classical Minkowski plane a generator is a line on the hyperboloid.
From presuppositions emerges the topology and metric of Minkowski spacetime.
The Minkowski sum of line segments in any dimension forms a type of polytope called a zonotope.
The situation can be further illustrated by the Minkowski diagram below.
Points in Minkowski space are related to subspaces of twistor space through the incidence relation.
A specific example of such an extension is the Minkowski content of the surface.
Henize additionally noted that the object was identified in an unpublished paper by Rudolph Minkowski.
Conformally invariant differential operators on Minkowski space and their curved analogues.
