Michio Jimbo considered the algebras with three generators related by the three commutators

${\displaystyle [h,e]=2e,\ [h,f]=-2f,\ [e,f]=\sinh(\eta h)/\sinh \eta .}$ 

When ${\displaystyle \eta \to 0}$ , these reduce to the commutators that define the special linear Lie algebra ${\displaystyle {\mathfrak {sl}}_{2}}$ . In contrast, for nonzero ${\displaystyle \eta }$ , the algebra defined by these relations is not a Lie algebra but instead an associative algebra that can be regarded as a deformation of the universal enveloping algebra of ${\displaystyle {\mathfrak {sl}}_{2}}$ .^[3]

• Quantum group

• Drinfel'd, V. G. (1987), "Quantum Groups", Proceedings of the International Congress of Mathematicians 986, 1, American Mathematical Society: 798–820
• Tjin, T. (10 October 1992). "An introduction to quantized Lie groups and algebras". International Journal of Modern Physics A. 07 (25): 6175–6213. arXiv:hep-th/9111043. Bibcode:1992IJMPA...7.6175T. doi:10.1142/S0217751X92002805. ISSN 0217-751X. S2CID 119087306.

• Quantized enveloping algebra at the nLab
• Quantized enveloping algebras at ${\displaystyle q=1}$  at MathOverflow
• Does there exist any "quantum Lie algebra" imbedded into the quantum enveloping algebra ${\displaystyle U_{q}(g)}$ ? at MathOverflow