Title of article
Finite dimensional quantum group covariant differential calculus on a complex matrix algebra
Author/Authors
R. Coquereaux، نويسنده , , A.O. Garc??a، نويسنده , , A. O. Garc?a and R. Trinchero، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1998
Pages
12
From page
221
To page
232
Abstract
Using the fact that the algebra M3(C) of 3×3 complex matrices can be taken as a reduced quantum plane, we build a differential calculus Ω(S) on the quantum space S defined by the algebra C∞(M)⊗M3(C), where M is a space-time manifold. This calculus is covariant under the action and coaction of finite dimensional dual quantum groups. We study the star structures on these quantum groups and the compatible one in M3(C). This leads to an invariant scalar product on the later space. We analyse the differential algebra Ω(M3(C)) in terms of quantum group representations, and consider in particular the space of 1-forms on S since its elements can be considered as generalized gauge fields.
Keywords
gauge theories , Differential calculus , Non commutative geometry , Quantum groups
Journal title
PHYSICS LETTERS B
Serial Year
1998
Journal title
PHYSICS LETTERS B
Record number
910748
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