Construction of the Noncommutative Complex Ball
classification
🧮 math-ph
hep-thmath.FAmath.GRmath.MP
keywords
noncommutativeballcommutativecomplexconstructionmanifoldanalogcoherent
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We describe the construction of the noncommutative complex ball whose commutative analog is the Hermitian symmetric space $D=SU(m,1)/U(m)$, with the method of coherent state quantization. In the commutative limit we obtain the standard manifold. We consider also a quantum field theory model on the noncommutative manifold.
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