Deformation quantization of projective schemes and differential operators
Abstract
The paper is devoted to noncommutative projective schemes within Kapranov's framework of noncommutative algebraic geometry. We classify all noncommutative projective schemes obtained from the differential chains in the universal enveloping algebra of the free nilpotent Lie algebra of index q generated by x0,...,xn. The construction proposed allows us to provide a new method of deformation quantization of the commutative projective schemes within the considered framework.
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