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** <math>v^2=Q(v)</math>
 
** <math>v^2=Q(v)</math>
 
** <math>vw+wv=2<w,v></math>
 
** <math>vw+wv=2<w,v></math>
*  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.
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* 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.
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<h5>related items</h5>
 
<h5>related items</h5>
  
 
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* [[Weyl algebra]]
  
 
 
 
 

2011년 10월 11일 (화) 08:11 판

introduction
  • #
  • quadratic space \((V,Q)\)
  • Q : non-degenerate quadratic form, defines a symmetric bilinear form \(<x,y>\)
  • Clifford algebra : associative algebra generated by vectors in V with relations
    • \(v^2=Q(v)\)
    • \(vw+wv=2<w,v>\)
  • 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.

 

 

 

 

 

 

 

 

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