Examples of 'frobenius' in a sentence
Meaning of "frobenius"
Frobenius is a noun referring to a matrix decomposition, named after Ferdinand Frobenius, used in linear algebra to decompose a matrix into a unitary matrix and a Hermitian matrix
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- A surname from German.
- Used attributively to attribute a concept to the work of Ferdinand Georg Frobenius or more directly to associate it with the Frobenius endomorphism (commutative algebra, field theory) or Frobenius morphism (category theory).
How to use "frobenius" in a sentence
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frobenius
Frobenius pseudoprimes are defined with respect to a fixed monic polynomial.
A distinguished generator is provided by the Frobenius automorphism.
Frobenius normal form.
So it is given by the kernel of the Frobenius endomorphism.
Hence no Frobenius number in one variable exists.
The closeness of fit is measured by the Frobenius norm of.
The Frobenius theorem is a deep result in differential geometry.
The most fundamental is the absolute Frobenius morphism.
The Frobenius method yields a complex but workable solution.
And the following hold for the Frobenius norm.
A Frobenius matrix is a special kind of square matrix from numerical mathematics.
The differential equation was solved using the Frobenius method.
Frobenius elements in a Galois group of global fields were first created by Dedekind.
This bilinear form is called the Frobenius form of the algebra.
The fact that the Frobenius map is surjective implies that every finite field is perfect.
See also
We introduced several improvements such as block linearization and Frobenius action.
The chapel is noted for its Frobenius organ in the west gallery.
Here algebraic means triangle equivalent to the stable category of a Frobenius category.
A simple formula exists for the Frobenius number of a set of integers in an arithmetic sequence.
Solution of linear differential equations using power series and Frobenius method.
Three joint papers with Frobenius deal with the theory of elliptic functions.
The test uses the concepts of quadratic polynomials and the Frobenius automorphism.
The operations in these Frobenius algebras account for all but the last two.
They appear in Floquet theory of periodic differential operators and in the Frobenius method.
One year later he became acquainted with Leo Frobenius and became his faithful disciple.
There is no doubt she was influenced by Leo Frobenius.
Flatness of the connection corresponds locally to the Frobenius integrability of the horizontal spaces.
The Frobenius morphism on sends to.
There are several different ways to define the Frobenius morphism for a scheme.
The Frobenius test is a generalization of the Lucas pseudoprime test.
The problem of determining the least live weight is equivalent to the Frobenius problem.
Stable homotopy in Frobenius categories.
Not every Pfaffian system is completely integrable in the Frobenius sense.
Is known as the Frobenius problem.
The subgroup of a Zassenhaus group fixing a point is a Frobenius group.
In the same year Frobenius and Bayrle made their first expedition to Africa.
The relation between restriction and induction is described by Frobenius reciprocity and the Mackey theorem.
In that respect négritude owes significantly to the pioneering work of Leo Frobenius.
In particular a finite group G is a Frobenius group in at most one way.
Both the Frobenius kernel and the Frobenius complement have very restricted structures.
This theorem is due to Frobenius.
Frobenius taught at the University of Frankfurt.
Dagger compact category Tannakian category Frobenius category in nLab.
Frobenius and Fuchs and in Göttingen.
To differentiate between normal power series solution and Frobenius Method.
The Frobenius norm.
First they show that the maximal subgroups of type I are all Frobenius groups.
Léo Frobenius street.
There are several mathematical theorems named after Ferdinand Georg Frobenius.
Frobenius reciprocity in the representation theory of groups, see induced representation.
