Examples of 'adjoint' in a sentence
Meaning of "adjoint"
adjoint (noun) - In mathematics, a term used to describe a transformation related to or derived from another transformation
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- Used in certain contexts, in each case involving a pair of transformations, one of which is, or is analogous to, conjugation (either inner automorphism or complex conjugation).
- That is related to another functor by an adjunction.
- Having a relationship of the nature of an adjoint (adjoint curve); sharing multiple points with.
- The transpose of the cofactor matrix of a given square matrix.
How to use "adjoint" in a sentence
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adjoint
It is called the adjoint endomorphism or adjoint action.
A functor with a left and a right adjoint.
Everyone in the adjoint villages knows me.
A normal operator commutes with its adjoint.
It follows that adjoint functors induce homotopy equivalences.
This method makes use of the adjoint.
He was also adjoint director of the laboratory of physical chemistry.
Modalites de nomination du secretaire general adjoint.
This adjoint is sometimes called a reflector.
It is therefore sometimes chosen as a definition of the adjoint operator.
Adjoint of the neutron flux density.
A time discrete adjoint method is developed.
We obtain an optimal control formulation with an adjoint state.
So this is the adjoint of matrix a.
The operator is said to be the adjoint of.
See also
Where is the adjoint operator to.
Conjugate transpose of a matrix adjoint.
The adjoint is easily computed to be.
It also transforms in the adjoint representation.
The adjoint of the inverse.
This concept is generalised by adjoint functors.
Adjoint linear transformation.
I am pretty interested in adjoint methods.
This functor is left adjoint to the forgetful functor from groups to sets.
Universal constructions often give rise to pairs of adjoint functors.
Their product then forms the adjoint representation of the group.
We will have to compute something called the adjoint matrix.
This adjoint flux is then used as an importance map to bias the simulation.
It has six scalar and fermions in the adjoint representation.
Adjoint of an operator.
There is also a close relation to the concept of adjoint functors.
The adjoint methodology is used in this thesis to meet two particular objectives.
Sensitivities are calculated efficiently using the adjoint state approach.
This functor has a left adjoint which is the integral group ring construction.
Then we compute the gradient of the functional by an adjoint method.
Properties of adjoint functors.
A normal operator is one that commutes with its adjoint.
And its adjoint.
Note however that not every embedding has a lower adjoint.
A temperature control strategy based on the adjoint state method is implemented.
A particular case of this happens when a continuous functor admits a left adjoint.
Freyd is perhaps best known for his adjoint functor theorem.
This constructs a left adjoint to the functor taking a ring to the underlying rng.
The reconstruction is treated as an optimization problem based on adjoint methods.
The other equivalent definition of the adjoint can be obtained by noticing a general fact.
This derivative can be computed using the discrete adjoint method.
The adjoint state is naturally deduced from the transposition of the local direct.
They are computed efficiently using the adjoint variable method.
Production of the normal and adjoint lattice predictor coefficients will be described below.
F is the lower adjoint.
