Examples of 'clifford algebras' in a sentence
Meaning of "clifford algebras"
clifford algebras: A type of mathematical structure used in the field of abstract algebra and physics
How to use "clifford algebras" in a sentence
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clifford algebras
Clifford algebras are closely related to exterior algebras.
Classification of clifford algebras.
Clifford algebras have numerous important applications in physics.
A program for calculations in Clifford algebras with a microcomputer.
Clifford algebras are superalgebras.
One can also study Clifford algebras on complex vector spaces.
Clifford algebras may be generalized to a form of degree higher than quadratic over a vector space.
A similar interpretation is possible for quaternions and Clifford algebras in general.
These real Clifford algebras have been classified as follows.
The main points of contact are the representations of Clifford algebras and the periodicity theorems.
The Clifford algebras are useful in geometry and physics.
The representation may be obtained in a more general and basis independent way using Clifford algebras.
The Clifford algebras are another family of hypercomplex numbers.
Representations of Clifford algebras.
In Clifford algebras and its child structures like geometric algebra rotations are represented by bivectors.
See also
Relativistic wave equations, Clifford algebras and orthogonal gauge groups.
To classify the pin representations, one need only appeal to the classification of Clifford algebras.
An advanced textbook on Clifford algebras and their applications to differential geometry.
In 1947 Marcel Riesz constructed spinor spaces as elements of a minimal left ideal of Clifford algebras.
The structure of Clifford algebras can be worked out explicitly using the following result.
Complex numbers = = = One can also study Clifford algebras on complex vector spaces.
Clifford algebras are Z2-graded algebras also known as superalgebras.
These results were published in the journal Clifford Algebras and their Applications in 2014.
Clifford algebras Cℓp, q ( C ), with p + q 2n even, are matrix algebras which have a complex representation of dimension 2n.
Support for the algebraic computation of Clifford algebras was described in using SymbolicC++ in 2002.
Clifford algebras are Z 2 - graded algebra ( also known as superalgebras ).
The connection between Clifford algebras and quadratic forms come from the distinctive contraction property.
In mathematics, Clifford algebras are a type of associative algebra.
Quadratic forms and Clifford algebras in characteristic 2 form an exceptional case.
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Examples of using Clifford
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Clifford said he never locked that drawer
It was a character that he actually helped me create called clifford
Clifford had an order for the gamekeeper
Examples of using Algebras
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Interior algebras form a variety of modal algebras
Preorders may be used to define interior algebras
Clifford algebras are closely related to exterior algebras
