클리퍼드 대수

introduction

• Clifford algebras may be thought of as quantizations (cf. quantization (physics), Quantum group) of the exterior algebra, in the same way that the Weyl algebra is a quantization of the symmetric algebra.

spinor

• Spinors are classified according to Dirac, Weyl, Majorana and Weyl-Majorana spinors.
• applications
  • spinor bundles
  • spin connections
  • the role of spinors in the description of the fundamental interactions between elementary particles

related items

• Weyl algebra

• Schrodinger equation
• Pauli equation
• Dirac equation
• spin system and Pauli exclusion principle
• spin structures and spinor fields

노트

위키데이터

• ID : Q674689

말뭉치

1. If you ever want to read it from an algebraic perspective, Clifford algebras appear in Jacobson's Basic Algebra volumes (one or both), and they also appear in Artin's Geometric Algebra.^[1]
2. Another feature of Clifford Algebra is that it uses a coordinate-free representation.^[2]
3. And the way that Clifford Algebra achieves this extraordinary Grand Unification of mathematics is by expressing algebraic concepts in the form of spatial operations on spatial structures.^[2]
4. So if Clifford Algebra is so great, how come you have never heard of it before?^[2]
5. Clifford Algebra was briefly rediscovered by Dirac as a superior expression of his theory of the electron, although the wider significance was not recognized.^[2]
6. Other products defined within Clifford algebras, such as the exterior product, are not used here.^[3]
7. In mathematics, a Clifford algebra is an algebra generated by a vector space with a quadratic form, and is a unital associative algebra.^[4]
8. The theory of Clifford algebras is intimately connected with the theory of quadratic forms and orthogonal transformations.^[4]
9. Clifford algebras have important applications in a variety of fields including geometry, theoretical physics and digital image processing.^[4]
10. Quadratic forms and Clifford algebras in characteristic 2 form an exceptional case.^[4]
11. Clifford algebras are used to define spinors.^[5]
12. By localizing the basis or frame of space-time and introducing differential and connection operators, Clifford algebra also contains Riemann geometry.^[6]
13. Clifford algebra provides a unified, standard, elegant, and open language and tools for numerous complicated mathematical and physical theories.^[6]
14. Clifford algebra calculus is an arithmetic-like operation that can be well understood by everyone.^[6]
15. Clifford algebra combines all the advantages of quaternion with the advantages of vector algebra and uniformly and succinctly describes the contents of geometry and physics.^[6]
16. The best-known application of Clifford algebras is probably the "classical" theory of orthogonal maps and spinors which is used intensively in modern theoretical physics and differential geometry.^[7]
17. This seminar course will form an introduction to the theory of Clifford algebra, geometric algebras and their wide range of applications.^[7]
18. We will focus on some cases where Clifford algebra manifestly shows discrete features with the hope that shedding light on some details may help a more complete scenario to come out of darkness.^[8]
19. Given a Clifford algebra, one would like to classify the modules over such an algebra, the Clifford modules.^[9]
20. We refer to the system commonly called 'Clifford Algebra', though we prefer the name 'Geometric Algebm' suggested by Clifford himself.^[10]
21. Clifford algebras, built up from quadratic spaces, have applications in many areas of mathematics, as natural generalizations of complex numbers and the quaternions.^[11]
22. This is a notable book that constitutes a valuable addition to the library of anyone interested in the study of Clifford algebras and their applications.^[11]
23. this is a very good book which provides a balanced and concise introduction to the subject of Clifford Algebras.^[11]
24. This construction is achieved by using the differential forms of Minkowski spacetime to realize a Clifford algebra of dimension 16.^[12]
25. In this paper, we provide some enlightening examples of the application of Clifford algebra in geometry, which show the concise representation, simple calculation and profound insight of this algebra.^[13]
26. Clifford algebra provides a unified, standard, elegant and open language and tools for numerous complicated mathematical and physical theories.^[13]
27. I would like to view the construction of the Clifford algebra as a functor from the category of quadratic vector spaces to the category of associative algebras.^[14]
28. After this excursion into matrix algebras the viewer is hopefully prepared for Clifford algebras.^[15]
29. Consider the Clifford algebra Cl= Mat(4,) of the Minkowski space-time.^[15]
30. The detection of the last mistake, concerning functions in Clifford algebras, requires knowledge of idempotents, nilpotents and minimal polynomials.^[15]
31. There I give more counterexamples, some of them significant, and non-trivial even for experts in Clifford algebras.^[15]
32. This paper describes a relationship between fast real matrix representations of real universal Clifford algebras and the generalized Fast Fourier Transform for supersolvable groups.^[16]
33. They can be realized as restrictions of representations of the even parts of Clifford algebras.^[17]
34. One always has a Dirac spinor - the fundamental (spin) representation of the complexified Clifford algebra.^[17]
35. There are infinite dimensional Clifford algebra constructions that appear in conformal field theory.^[17]
36. Clifford algebras are often defined using bilinear forms instead of quadratic forms (and one often sees incorrect definitions of quadratic forms in terms of bilinear forms).^[17]
37. It is of interest to anybody who wants to understand a modern description of spinors in Clifford algebra language.^[18]
38. Next, isomorphism-based universality of a Clifford algebra is defined.^[18]
39. The center of a Clifford algebra and isomorphisms of grade involution, reversion and (Clifford) conjugation are introduced, with obvious relations to corresponding notions in tensor algebra.^[18]
40. An example computes the reversion of a product of two (simple) mono-grade Clifford algebra elements (p-vectors).^[18]
41. This powerful language is based in Clifford algebra.^[19]
42. The relation to Clifford algebras shows up when we compute the square of for .^[20]
43. Clifford algebras have important applications in a variety of fields including geometry and theoretical physics.^[21]
44. It is then straightforward to show that Cℓ(V,Q) contains V and satisfies the above universal property, so that Cℓ is unique up to isomorphism; thus one speaks of "the" Clifford algebra Cℓ(V, Q).^[21]
45. The universal characterization of the Clifford algebra shows that the construction of Cℓ(V,Q) is functorial in nature.^[21]
46. The Clifford algebra on Rp,q is denoted Cℓ p,q (R).^[21]
47. We begin by discussing why we should care about Clifford Algebra.^[22]
48. The real numbers are a subalgebra of Clifford algebra: just throw away all elements with grade > 0.^[22]
49. The complex numbers are another subalgebra of Clifford algebra, as discussed in reference 1.^[22]
50. Quaternions can be understood in terms of another subalgebra of Clifford algebra, namely the subalgebra containing just scalars and bivectors.^[22]
51. (one can also think of a Clifford algebra as a quantization of the exterior algebra).^[23]
52. This property determines the Clifford algebra uniquely up to canonical isomorphism.^[23]
53. ¶ Lift an invertible isometry m of the quadratic form of self to a Clifford algebra morphism.^[23]
54. ¶ Lift the matrix m to an algebra morphism of Clifford algebras.^[23]

소스

메타데이터

위키데이터

• ID : Q674689

Spacy 패턴 목록

• [{'LOWER': 'clifford'}, {'LEMMA': 'algebra'}]
• [{'LOWER': 'clifford'}, {'LEMMA': 'algebra'}]