The following publications are possibly variants of this publication:
- Asymptotically Good Multiplicative LSSS over Galois Rings and Applications to MPC over $\mathbb {Z}/p^k\mathbb {Z} $Mark Abspoel, Ronald Cramer, Ivan Damgård, Daniel Escudero 0001, Matthieu Rambaud, Chaoping Xing, Chen Yuan 0003. asiacrypt 2020: 151-180 [doi]
- Asymptotically-Good Arithmetic Secret Sharing over Z/(p^\ell Z) with Strong Multiplication and Its Applications to Efficient MPCRonald Cramer, Matthieu Rambaud, Chaoping Xing. iacr, 2019:832, 2019. [doi]
- Asymptotically-Good Arithmetic Secret Sharing over $\mathbb {Z}/p^{\ell }\mathbb {Z}$ with Strong Multiplication and Its Applications to Efficient MPCRonald Cramer, Matthieu Rambaud, Chaoping Xing. crypto 2021: 656-686 [doi]
- More Efficient Dishonest Majority Secure Computation over $\mathbb {Z}_{2^k}$ via Galois RingsDaniel Escudero 0001, Chaoping Xing, Chen Yuan 0003. crypto 2022: 383-412 [doi]
- k over Galois ring $\mathrm{GR}(p^2,m)$Yuan Cao 0001, Yonglin Cao, Fang-Wei Fu 0001, Somphong Jitman, Jiafu Mi. aaecc, 34(3):489-520, May 2023. [doi]