Examples of 'galois' in a sentence
Meaning of "galois"
galois (noun): Evariste Galois, a French mathematician known for his work in group theory and for laying the groundwork for Galois theory
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- A surname from French.
- French mathematician Évariste Galois
How to use "galois" in a sentence
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galois
Galois set to work one more time.
Square root examples of a galois group.
And it was galois who produced a language.
This condition is important in Galois module theory.
Galois extensions of a maximal cyclotomic field.
Fields and galois theory.
Galois representations and modular forms.
We deal with the classification of galois object on three axes.
Galois representations associated to abelian varieties.
Formal analysis of Galois concepts and lattices.
Galois groups for infinite extensions are profinite groups.
The resulting cohomology is called Galois cohomology.
Galois theory of covering spaces.
It can also be defined in terms of Galois cohomology.
Galois did it the night before.
See also
One says that such an extension is Galois.
Galois module structure.
Squaring is a particularly simple operation in a Galois field.
Galois group of a polynomial.
A note on the fixed ring of a Galois extension.
Galois himself noted that the computations implied by his method were impracticable.
Results are applied to the inverse Galois problem.
Galois develops technology to guarantee the trustworthiness of systems where failure is unacceptable.
It is a prototype for Galois representations in general.
Galois was there.
These form the Galois group of the equation.
Galois also contributed to the theory of modular equations and to that of elliptic functions.
Such a group is then also referred to as a Galois module.
Galois groups were developed to help solve polynomial equations by capturing their symmetry features.
His long year scientific devotion was in Galois theory.
Galois theory concerns transformations of number fields that permute the roots of an equation.
This is an example of a cyclic Galois cover.
Galois fields are finite sets of elements on which the mathematical operations are defined differently.
This is therefore a special type of inverse Galois problem.
Polynomial operator in galois fields and a digital signal processor comprising an operator of this type.
This occurrence proves to be connected with Galois lattices.
Galois theory also gives a clear insight into questions concerning problems in compass and straightedge construction.
Splitting of prime ideals in Galois extensions.
Evariste Galois was the father of modern algebra.
Splitting of prime ideals in a Galois extension.
Galois lived during a time of political turmoil in France.
Objectively to subgroups of the Galois group.
In Galois theory this functor is shown to be an equivalence of categories.
Method of performing multiplication with accumulation in a Galois body.
And for Galois this was like the zeroth symmetry.
Suppose is the prime subfield of and is a Galois extension of.
Evariste Galois is about to fight for his very life.
Where a is the primitive element of a predetermined Galois field.
The absolute Galois group of an algebraically closed field is trivial.
Such spaces are known as Galois fields.
