Examples of 'covariant' in a sentence
Meaning of "covariant"
covariant (noun) - In mathematics, covariant typically refers to a type of variable that changes in the same way as another variable. It is commonly used in fields such as tensor analysis and differential geometry
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- (Of a functor) which preserves composition.
- Using or relating to covariance.
- A bihomogeneous polynomial in x, y, ... and the coefficients of some homogeneous form in x, y, ... that is invariant under some group of linear transformations.
- The variety defined by a covariant.
How to use "covariant" in a sentence
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covariant
I did a report on covariant rings in grade school.
Of particular note is their concept of a dynamical covariant derivative.
Representation of covariant and contravariant components of a vector.
We are using a triaxilating frequency on a covariant subspace band.
And the covariant derivative defined as.
The concept of acceleration is a covariant derivative concept.
The covariant components are noted with lower indices.
Such a transformation law is known as a covariant transformation.
Covariant and mixed forms.
These automorphisms are called general covariant transformations.
Covariant differential equations and singular vectors in virasoro representations.
Here the semicolon indicates covariant differentiation.
The covariant vector potential of the electromagnetic field and.
By using a triaxilating frequency on a covariant subspace band.
A covariant tensor of order two.
See also
Where the semicolon indicates a covariant derivative.
The covariant derivative giving rise to the gauge group.
The components vk are the covariant components of the vector v.
Our calculations are carried out in an explicitly covariant gauge.
Examples of covariant vectors generally appear when taking a gradient of a function.
There are also vector quantities with covariant indices.
Each covariant is a projection on the eigenspace associated with the eigenvalue λi.
Contravariant and two covariant indices.
We present in particular several applications from a formalism known as covariant.
Make lists into a covariant type.
Covariant return type.
Transmit a wideband covariant signal.
On a covariant subspace band.
To emit a series of covariant pulses.
Covariant canonical quantization.
They were using a triaxilating frequency on a covariant subspace band.
Covariant return types.
The curvature tensor measures noncommutativity of the covariant derivative.
The covariant derivative.
These factors are also covariant.
I do not think the covariant isolator will be effective with a vocal transmission.
Where the coefficients are given by the covariant functor.
Sometimes the covariant derivative along a curve is called absolute or intrinsic derivative.
Which is indeed the definition of the covariant components xj of the vector x.
A structure is in the first place a group of elements forming a covariant set.
An example of covariant functor.
If we could modify the field coils to emit a series of covariant pulses.
The covariant exterior derivative as defined over supermanifolds needs to be super graded.
The calculations in both cases are completely covariant and electromagnetically gauge invariant.
The covariant derivative of a tensor field is presented as an extension of the same concept.
The most popular approach is probably the definition motivated by covariant derivatives.
The definition of the covariant derivative does not use the metric in space.
A system of n quantities that transform oppositely to the coordinates is then a covariant vector.
The covariant derivative is a generalization of the directional derivative from vector calculus.
So one could argue that it was really a mistake to make a raised covariant that.
