Quantum symmetric pairs at roots of $1$.

@article{Bao2019QuantumSP,
  title={Quantum symmetric pairs at roots of \$1\$.},
  author={Huanchen Bao and Thomas M. Sale},
  journal={arXiv: Quantum Algebra},
  year={2019}
}
A quantum symmetric pair is a quantization of the symmetric pair of universal enveloping algebras. Recent development suggests that most of the theory for quantum groups can be generalised to the setting of quantum symmetric pairs. In this paper, we study the $\imath$quantum group at roots of $1$. We generalize Lusztig's quantum Frobenius morphism in this new setting. We define the small $\imath$quantum group and compute its dimension. 
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Serre-Lusztig relations for $\imath$quantum groups
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