[1] Yongming Li, Wuniu Liu, Junmei Wang, Xianfeng Yu, Chao Li, Model checking of possibilistic linear-time properties based on generalized possibilistic decision processes, IEEE Transactions on Fuzzy Systems, DOI 10.1109/TFUZZ.2023.3260446.
[2] Yongming Li, Qian Wang, Sanjiang Li, On quotients of formal power series, Information and Computation, 2022, 285: 104874 (1-28).
[3] Yongming Li, Jielin Wei, Possibilistic fuzzy linear temporal logic and its model checking. IEEE Transactions on Fuzzy Systems, 2021, 29(7):1899-1913.
[4] Yongming Li, Lihui Lei, Sanjiang Li, Computation tree logic model checking via multi-valued possibility measures, Information Sciences,2019, 485;87–113.
[5] Yongming Li, Quantitative model checking of linear-time properties based on generalized possibility measures, Fuzzy Sets and System, 2017, 320: 17-39.
[6] Yongming Li, D. Manfred, Lihui Lei, Model checking of linear-time properties in multi-valued systems, Information Sciences, 2017, 377: 51-74.
[7] Yongming Li, Yali Li, Zhanyou Ma, Computation tree logic model checking based on possibility measures, Fuzzy Sets and Systems, 2015, 262: 44–59.
[8] Yongming Li, Zhanyou Ma, Quantitative computational tree logic model checking based on generalized possibility measures, IEEE Transactions on Fuzzy Systems, 2015, 23(6): 2034- 2047.
[9] Yongming Li, Lijun Li, Model checking of linear-time properties based on possibility measure, IEEE Transactions on Fuzzy Systems, 2013, 21(5): 842-854.
[10] Yongming Li, W. Pedrycz, Fuzzy finite automata and fuzzy regular expressions with membership values in lattice-ordered monoids, Fuzzy Sets and Systems, 2005, 156: 68-92.
[11] Yongxu Liu, Ruonan Ren, Ping Li, Mingfei Ye, Yongming Li, Quantum violation of average causal effects in multiple measurement settings, Physical Review A, 2022, 106: 032436.
[12] Ruonan Ren, Ping Li, Mingfei Ye, Yongming Li, Tighter sum uncertainty relations based on metric-adjusted skew information, Physical Review A, 2021, 104: 052414.
[13] Haijin Mu, Yongming Li, Quantum uncertainty relations of two quantum relative entropies of coherence,Physical Review A, 2020, 102: 022217.
[14] Yu Luo, Yongming Li, Min-Hsiu Hsieh, Inequivalent multipartite coherence classes and two operational coherence monotones, Physical Review A, 2019, 99: 042306.
[15] Lianhe Shao, Zhengjun Xi, Heng Fan, Yongming Li, Fidelity and trace-norm distances for quantifying coherence, Physical Review A, 2015, 91: 042120.
[16] Xuechong Guan, Yongming Li, J. Kohlas, On conditions for semirings to induce compact information algebras, Mathematical Structures in Computer Science, 2017, 27:460-469.
[17] Xuechong Guan, Yongming Li, On conditions for mappings to preserve optimal solutions of semiring-induced valuation algebras, Theoretical Computer Science, 2015, 563: 86–98.
[18] Shufeng Kong, Sanjiang Li, Zhiguo Long, Yongming Li, On tree-preserving constraints, Annals of Mathematics and Artificial Intelligence, 2017, 81(3-4): 241-271.
[19] Fugang Zhang, Yongming Li, Quantum uncertainty relations of two generalized relative entropies of coherence, Science China-Physics, Mechanics & Astronomy, 2018, 61(8): 080312.
[20] 林运国, 李永明, 基于安全性检测的广义量子Loop程序终止验证, 中国科学:信息科学, 2015, 45(12): 1615–1631.
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