Noncommutative differential geometry related to the Young-Baxter equation

@article{Gurevich1995NoncommutativeDG,
  title={Noncommutative differential geometry related to the Young-Baxter equation},
  author={Dmitri Gurevich and Andrey Radul and Vladimir Rubtsov},
  journal={Journal of Mathematical Sciences},
  year={1995},
  volume={77},
  pages={3051-3062}
}
An analogue of the differential calculus associated with a unitary solution of the quantum Young-Baxter equation is constructed. An example of a ring sheaf is considered in which local solutions of the Young-Baxter quantum equation are defined but there is no global section. Bibliography: 13 titles. 
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References

SHOWING 1-4 OF 4 REFERENCES
Quantum Groups
Here is an introduction to the theory of quantum groups with emphasis on the spectacular connections with knot theory and Drinfeld's recent fundamental contributions. It presents the quantum groups
Quantization of poisson pairs: the R-matrix approach
Compact matrix pseudogroups
The compact matrix pseudogroup is a non-commutative compact space endowed with a group structure. The precise definition is given and a number of examples is presented. Among them we have compact
Quantum groups and non-commutative geometry