近照
柯品惠 教 授 办公室 : 18#科技楼1106 E-mail: keph@fjnu.edu.cn 通讯地址: 福建省福州市大学城科技路1号福建师范大学旗山校区18#科技楼1106 (350117) 社会兼职 : 《福建中学数学》主编、福建省初等数学学会副会长,福建省数学学会理事、福建省教育学会数学教学委员会常务理事 研究兴趣 :代数编码与密码 | 个人简介 男, 1978年9月生, 福建建阳人, 教授, 博导,无党派人士 个人经历 2003.09~2006.07 北京邮电大学, 密码学专业,军事学博士,导师: 温巧燕教授 2000.09~2003.07 福建师范大学, 基础数学专业, 理学硕士,导师:张胜元教授 1996.09~2000.07 福建师范大学, 数学教育专业,理学学士 2010.07~2010.12 访问学者 新加坡南洋理工大学CCRG 2003.07~ 现在 教师 福建师范大学 (1) 学术期刊审稿人 1. IEEE Tran. on Information Theory, IEEE Tran. on Signal Processing, Design Codes and Cryptography, Information Sciences, Journal of Electronics (China), IEICE Trans. on Fund. , Journal of Computational and Applied Mathematical, Trans. on Combin., Applicable Algebra in Engineering, Communication and Computing(AAECC) , Advances in Mathematics of Communications (AMC), 中国科学, 电子学报, 通信学报, 工程数学学报, 电子与信息学报等; 2. 数学评论(Mathematical Reviews)评论员(2014- 至今) (2)在研项目 1. 2023.08~2026.08, “广义bent函数及其应用研究“,福建省自然科学基金面上项目(2023J01535),项目负责人; 2. 2023.01~2026.12,“De Bruijn序列及其推广序列的构造与分析“,国家自然科学基金面上项目(62272420),参加,排名第二 (项目负责人:郑州大学常祖领教授); 3. 2024.12.31~ 2026.12.31,“数学教育“大中小”贯通培养的实践路径研究”,福建省教育科学规划基础教育高质量发展专项委托课题(FJJKWT24-006),主持. (3)已结题项目 1. “De Bruijn序列的构造、性能分析和应用”, 国家自然科学基金面上项目(61772476), 2018.01-2021.12, 参与, 排名第二 (项目负责人:郑州大学常祖领教授); 2. “与Walsh-Hadamard变换相关的新变换:理论、方法及密码学应用”, 国家自然科学基金面上项目(61772292), 2018.01-2021.12, 参与, 排名第三 (项目负责人:莆田学院陈智雄教授); 3. “几类具有优相关性质的离散信号的设计与分析”, 国家自然科学基金青年项目(61102093)2012.01-2014.12, 项目负责人; 4. “伪随机序列的扩展复杂度分析及其构造研究”, 福建省自然科学基金(2019J01273), 2019.04-2022.04,项目负责人; 5. “两类新型最佳离散信号的设计与分析 ”, 福建省自然科学基金(2015J01237), 2015-2018, 项目负责人; 6. “最佳离散信号设计中若干问题的研究”, 福建省自然科学基金(2010J01319)2010.06-2013.07, 项目负责人; 7. 福建省高校服务海西建设重点项目-基于数学的信息化技术研究子课题, 2010.01-2012.10, 项目负责人; 8. “具有高非线性度的布尔函数的研究”, 福建省科技厅专项(2006F3044), 2006.10-2008.12年, 项目负责人. (4)论文著作 [94] 陈范聪, 柯品惠, 李世唐. 一类置换多项式c-差分一致性和回旋镖一致性, 淮北师范大学学报(自然科学版), 46(164): 10-15, 2025. [94] 颜霏霏,柯品惠. 两类周期为 pq 的四元序列在 F4 上的线性复杂度,数学杂志,45(2): 151-160,2025. [93] Feifei Yan,Pinhui Ke, Zuling Chang. The symmetric 2-adic complexity of Tang-Gonginterleaved sequences from Legendre sequence pair, Cryptography andCommunications-Discrete Structures, Boolean Functions and Sequences, 17: 167–179,2025. [92]Feifei Yan, Pinhui Ke, Lingmei Xiao. The 4-adic complexity of quaternarysequences with low autocorrelation and high linear complexity, Advances inMathematics of Communications, 17: 167–179, 2025. [91] Zuling Chang,Martianus Frederic Ezerman, Pinhui Ke and Qiang Wang. New successor rules toefficiently produce exponentially many binary de Bruijn sequences, Sequences andTheir Applications (SETA) 2024, Colchester, United Kingdom,July 01-05, 2024. [90]Feifei Yan,Pinhui Ke, Zuling Chang. Trace representation of balanced quaternarygeneralized cyclotomic sequences of period p^{n}, IEICE Trans. onFundamentals, Vol.E107-A, No.10, pp.1637-1640,2024. [89]Feifei Yan,Pinhui Ke, Zuling Chang. The autocorrelation of a class of quaternary sequencesof length pq with high complexity, InformationProcessing Letters, 186:106494, 2024. [88]Zhiyao Yang,Pinhui Ke, Zuling Chang. New characterizations of generalized Boolean functions, Applicable Algebra in Engineering, Communication andComputing, 2024, online first,Doi:10.1007/s00200-024-00650-w [87]赵晨阳, 柯品惠, 林昌露. 具有否认认证的 SM9 标识加密算法, 计算机科学与探索,2023,17(10): 2519-2528.. [86] 杨志耀, 柯品惠, 陈智雄, 张胜元. (非)弱正则 p 值bent函数的间接构造, 中国科学:数学, 53(2): 1-15,2023. [85]Zhiyao Yang, Pinhui Ke, Zhixiong Chen, Chenhuang Wu. Results on Gower U_2norm of generalized Boolean functions, International Journal of Foundations ofComputer Science, 34(4):373–393, 2023. [84] Jian Ding, Pinhui Ke, Huaxiong Wang, Changlu Lin. Ramp scheme based on CRT for polynomial ringover finite field, Journal of SystemScience and Complexity, 36:129–150, 2023. [83] Pinhui Ke,Zhixiong Chen. Boolean functions with few Walsh transform values, Proceeding ofIWSDA 2022, IEEE Society, 2022. [82] Linyan Yu, PinhuiKe, Zuling Chang. New family of polyphase sequences with lowcorrelation from Galois rings, IEICE Trans. onFundamentals, E105-A(10), 2022. [81]Pinhui Ke, Panpan Qiao, Yang Yang. On the equivalence of several classes of quaternarysequences with optimal autocorrelation and length 2p, Advances inMathematics of Communications, 16(2): 285-302, 2022. [80] Jian Ding,Pinhui Ke, Huaxiong Wang, Changlu Lin. Bivariate polynomial-based secret sharingschemes with secure secret reconstruction, Information Sciences, 593: 398-414, 2022. [79]Zhiyao Yang, Pinhui Ke, Zhixiong Chen. Characterization and construction ofgeneralized bent functions with flexible coefficients, IEICE Trans. on Fundamentals, E105-A(5), 2022. [78] Zhiyao Yang, Pinhui Ke, Zhixiong Chen. New secondary constructions of generalizedbent functions, Chinese Journal of Electronics,30(6): 1022-1029, 2021. [77]余林燕, 柯品惠. 一类周期为pq^2的r元序列线性复杂度研究, 福建师范大学学报(自然科学版), 37(4):1-7, 2021. [76]柯品惠, 卢栎羽, 陈智雄. 一类周期为 2p^{2}的二元序列的2-adic复杂度, 密码学报, 8(4):560-571, 2021. [75]Pinhui Ke, Yan Zhong, Shengyuan Zhang. Linear Complexity of a New Class of QuaternaryGeneralized Cyclotomic Sequence with Period 2p^m, Complexity, 6538970, 7 pages,2020. [74] 卢栎羽, 柯品惠. 一类具有优自相关性质的二元序列的2-adic复杂度研究, 数学杂志, 40(1): 110-118, 2020. [73] 仲燕, 张胜元, 柯品惠. 一类新的周期为2p^m的四元广义分圆序列的线性复杂度研究, 福建师范大学学报(自然科学版), 36(1):7-11, 2020. [72] Zhifang Ye, PinhuiKe*, Chenghuang Wu. A further study of the linear complexity ofnew binary cyclotomic sequence of length p^r, Applicable Algebra in Engineering,Communication and Computing, 30:217-231, 2019. [71] ZhifangYe, Pinhui Ke*, Zhixiong Chen. Linear Complexity of d-ary Sequence Derivedfrom Euler Quotients over GF(q), Chinese Journal of Electronics, 28(3):529-534, 2019. [70] Chenhuang Wu, Chunxiang Xu, Zhixiong Chen, Pinhui Ke. On error linear complexity of newgeneralized cyclotomic binary sequences of period p^2, Information Processing Letters, 144:9-15, 2019. [69] Zhengqian Li, PinhuiKe*, Shengyuan Zhang. New Classes of Generalized Zero-DifferenceBalanced Functions and Their Applications, Journal of the Chinese Institute of Engineers, 42(1): 2-9, 2019. [68] Pinhui Ke, Yueqin Jiang, Zhixiong Chen. On the Linear Complexities of Two Classes ofQuaternary Sequences of Even Length With Optimal Autocorrelation, Advances in Mathematics of Communications, 12(3):525–539, 2018. [67] Pinhui Ke, Zhifan Ye, Shengyuan Zhang, Zuling Chang. On the cross-correlation distribution of d-arygeneralized Legendre-Sidelnikov sequences, Chinese Journal of Electronics, 27(2):287-291, 2018. [66] 柯品惠, 胡电芬, 常祖领. 周期为p^2的完备高斯整数序列的新构造, 工程数学学报, 35(3): 319-328, 2018. [65] Qi Ye, PinhuiKe*, Jian Shen. Linear Complexity of a Class of PseudorandomSequences Over a General Finite Field, Soft Computing, 22:4335-4346, 2018. [64] ZhixiongChen, Vladimir Edemskiy, PinhuiKe and Chenhuang Wu. On k-errorlinear complexity of pseudorandom binary sequences derived from Euler quotients, Advances in Mathematics of Communications, 12(4): 805-816, 2018. [63] ZhibaoLin, Zhengqian Li, PinhuiKe*. New Constructions ofZero-Difference Balanced Functions, IEICE Trans. on Fundamentals, E101-A(10):1719-1723, 2018. [62] Pinhui Ke, Zhifan Ye, Zhengchun Zhou, Jian Shen. Autocorrelation of the Modified BinaryTwo-prime Sidelnikov Sequence, International Journal of Foundations of Computer Science, 28(4):391-409, 2017. [61] Zhengqian Li, PinhuiKe*, Zhifan Ye. New Construction of Low-hit-zone FrequencyHopping Sequence Sets with Optimal Partial Hamming Correlation, The 3rd International Conference on Cloud Computing andSecurity, LNCS10603, PartII, 2017. [60] Zuling Chang, Pinhui Ke, Y Zhao. Some enumeration results on binary 2n-periodicsequences, InternationalJournal of Foundations of Computer Science, 28(2): 171–184, 2017. [59] Chunguan Ma, Lei Zhang, Songtao Yang, Xiaodong Zheng, PinhuiKe. Achieve personalizedanonymity through query bolocks exchanging, China Communications, 13(11):106-118,2016. [58]柯品惠, 叶智钒, 常祖领. 一类推广的Legendre-Sidelnikov序列的自相关分布, 电子与信息学报, Vol. 38 (2): 303-309, 2016. [57]Zhifan Ye, PinhuiKe, Shengyuan Zhang, Zuling Chang. Zero-defference function derived fromFermat Quotients and Its Applications. IEICE Trans.on Fundamentals, Vol.E98-A, No.11 2015. [56]Zhifan Ye, Pinhui Ke, Shengyuan Zhang, Zuling Chang. Some Notes on Pseudorandom Binary SequencesDerived from Fermat-Euler Quotients, IEICE Trans. on Fundamentals, E98-A(10), 2015. [55]Pinhui Ke, Zhengchun Zhou. A Generic Construction of Z-PeriodicComplementary Sequence Sets with Flexible Flock Size and Zero Correlation ZoneLength, IEEE Signal Processing Letters, 22(9):1462-1466, 2015. [54]Zuling Chang, PinhuiKe. On the Error LinearComplexity Spectrum of Binary 2^n-periodic Sequences, Chinese Journal ofElectronics, 24(2):366-372, 2015. [53]柯品惠, 李瑞芳, 张胜元. 一类新的周期为p^{m+1}q^{n+1}的二元广义分圆序列的线性复杂度, 电子学报, 42 (5): 1009-1013, 2014. [52]常祖领, 周玉倩, 柯品惠. 一类新的pqr长2阶广义分圆序列的线性复杂度,电子学报, 43(1): 166-170, 2015. [50]Ke Pin-hui, Lin Chang-Lu, Zhang Sheng-Yuan. Linear complexity of quaternarysequences with odd period and low autocorrelation, Journal of China Universities of Posts andTelecommunications, 21(5): 89-93, 2014. [50]Lin Changlu, Tang Fei, Ke Pinhui, Harn Lein, Zhang Shengyuan. Secure universal designated verifieridentity-based signcryption, Security andCommunication Networks, 7(2): 434-444, 2014. [49]柯品惠, 陈浩源. 汉明相关值可灵活设定的无碰撞区跳频序列集的构造研究, 北京邮电大学学报, 37(2), 38-42, 2014. [48]余望鸿, 柯品惠. 基于正交矩阵偶构造低相关区序列偶集, 福建师范大学学报(自然科学版), 30(2):7-12, 2014. [47]余望鸿, 柯品惠. 四元低相关区序列偶集的构造研究, 武夷学院学报, 32(5):40-45, 2014. [46]李瑞芳, 柯品惠. 一类新的周期为2pq的二元广义分圆序列的线性复杂度, 电子与信息学报, 36 (3): 650-654, 2014. [45]Pinhui Ke, Wanghong Yu, Zuling Chang. A Note on Binary Sequence Pairs With Two-level Correlation, InformationProcessing letters, 113: 811-814, 2013. [44]陈浩源, 柯品惠, 张胜元. 基于矩阵置换的最优无碰撞区跳频序列集的构造研究, 计算机应用, 33(11):3028-3031,2013. [43]Fei Tang, Changlu Lin, Pinhui Ke. Universal Designated Verifier Signcryption , Network and SystemSecurity(NSS 2012), L. Xu, E. Bertino, and Y. Mu (Eds.), LNCS 7645: 126–134, 2012. [42]ShengyuanZhang, Fei Tang, Changlu Lin, Pinhui Ke. Provably secure self-certified signatureschemes with message recovery, China Communications, 9(10):112-119, 2012. [41]林志宝, 柯品惠. 关于一类四元分圆序列的注记, 福建师范大学学报(自然科学版), 2012, 28(4):10-13. [40]柯品惠, 李瑞芳, 张胜元. d-元广义分圆序列的线性复杂度及自相关函数性质分析, 电子与信息学报, 34 (12): 2881-2884, 2012. [39]Pinhui Ke, Shengyuan Zhang. New classes of sequence families with lowcorrelation by using multiplicative and additive characters. Frontiers ofElectrical and Electronic Engineering, 7(3): 308-311, 2012. [38]Pinhui Ke, Shengyuan Zhang. New Classes of Quaternary Cyclotomic Sequenceof Length 2p^m With High Linear Complexity, Information Processing Letters, 12(16): 646-650, 2012. [37]Pinhui Ke, Shengyuan Zhang, Fuchun Lin. Constructions of Binary Array Set withZero-Correlation Zone, InformationSciences, 197:197-206, 2012.[36]Pinhui Ke, Jie Zhang, Shengyuan Zhang. On the Linear Complexity and theAutocorrelation of Generalized Cyclotomic Binary Sequences of Length 2p^m, Designs, Codes and Cryptography, 67(3): 325-339, 2013. [35]柯品惠, 章海辉, 张胜元. 一类新的具有最优平均汉明相关性的跳频序列族, 通信学报, 9:168-175, 2012. [34]Pinhui Ke, Zheng Yang, Jie Zhang. On the Autocorrelation and Linear Complexityof Some 2p Periodic Quaternary Cyclotomic Sequences over F4, IEICE Trans. on Fundamentals, E94-A(11):2472-2477, 2011. [33]柯品惠, 张胜元. ZCZ阵列偶集的递归构造研究, 电子与信息学报, 33 (5): 1257-1260, 2011. [32]Pinhui Ke, Zhihua Wang, Zheng Yang. New Constructions of Frequency-HoppingSequences from Power-Residue Sequences, IEICE Trans. on Fundamentals, E94-A(3):1029-1033,2011. [31]杨正, 柯品惠, 张胜元. M元pg长的序列集的新构造, 福建师范大学学报(自然科学版), 26(5): 20-26, 2010. [30]章海辉, 柯品惠, 张胜元, 基于分圆类方法的差集偶构造的进一步研究, 福建师范大学学报(自然科学版), 26(5): 11-15, 2010. [29]王志华, 柯品惠, 张胜元, ZCZ序列偶集的构造研究, 福建师范大学学报(自然科学版), 26(5):16-19, 2010. [28]Pinhui Ke, Fuchun Lin. New Constructions of Binary Sequences WithOptimal Autocorrelation Value, Electronics Letters, 46(20):1381–1382,2010. [27]Zheng Yang, Pinhui Ke. On Generalized Cyclotomic Sequence of Order dand Period pq, IEICE Trans. on Fundamentals, E94-A(1):443-447,2011. [26]Zheng Yang, Pinhui Ke. Quaternary Sequences with Odd Period and LowAutocorrelation, Electronics Letters, 46(15):1068–1069,2010. [25]Zheng Yang, Pinhui Ke. Construction of Quaternary Sequences of Lengthpq with Low Autocorrelation, Cryptography and Communications- Discrete Structures,Boolean Functions and Sequences, 3(2):1-5, 2011. [24]章海辉, 王志华, 柯品惠. 基于广义分圆类的差集偶的新构造, 武夷学院学报, 2010. [23]柯品惠, 王志华, 张胜元. 基于交织方法的ZCZ阵列偶集的构造研究, 电子与信息学报, 32(12): 3037-3040, 2010. [22]KE Pin-hui, ZHANG Sheng-yuan. Frequency-Hopping Sequences Based on d-formFunctions, The Journal ofChina University of Posts and Telecommunications, 17(4): 58-62, 2010. [21]Pinhui Ke, ShengyuanZhang. New Classes of Binary Array Setwith Zero-correlation Zone, CMC2010: 50-55, 2010. [20]黄柳玲, 柯品惠, 张胜元. GF(p)上的轮换对称布尔函数, 福建师范大学学报(自然科学版), 25(3):5-9, 2009. [19]张云, 柯品惠, 张胜元.基于分圆类的最优跳频序列族, 福建师范大学学报(自然科学版), 25(2):1-5, 2009. [18]Yun Zhang, PinhuiKe, Shengyuan Zhang, Optimal Hopping-Frequency Sequence based onCyclotomy, First International Workshop on EducationTechnology and Computer Science (ETCS 2009), 1:1122-1126, 2009. [17]李建周, 柯品惠, 张胜元.基于分圆类方法的差集偶构造, 福建师范大学学报(自然科学版), 25(4): 1-4, 2009. [16]Pinhui Ke, LiulingHuang, Shengyuan Zhang. Improved lower bound on the number of balancedsymmetric functions over GF(p), Information Sciences, 179: 682-687,2009. [15]Fuchu Lin, Pinhui Ke, Shengyuan Zhang. A Note on Interleaving Construction for LCZand ZCZ Sequence Sets, The IET2ndICWMMN2008: 208-210, 2008. [14]Ke Pin-hui, Zhang Sheng-yuan. Constructions of vector output Booleanfunctions with high generalized nonlinearity, The Journal of China University of Postsand Telecommunications, 15(2):77-81, 2008. [13]常祖领, 柯品惠, 张劼, 温巧燕. 高非线性度多输出布尔函数的构造.电子学报, 1:141-145, 2008. [12]李建周, 柯品惠. 几乎差集偶与几乎自相关二元序列偶的研究, 武夷学院学报, 27(2):10-14, 2008. [11]柯品惠, 张劼, 温巧燕. Bent序列簇的迹表示的进一步的研究, 通信学报, 28(5):118-121, 2007. [10]柯品惠, 常祖领, 温巧燕. Bent互补函数族的构造及推广. 工程数学学报, 24(2):377-380, 2007. [9]常祖领, 柯品惠, 莫骄, 温巧燕. 超Bent函数的性质和构造, 北京邮电大学学报, 29(3): 36-39, 2006. [8]常祖领, 柯品惠, 莫骄, 温巧燕. F_2^n上的正形置换, 北京邮电大学学报, 29(1):115-118, 2006. [7]常祖领, 柯品惠, 张劼, 温巧燕. 广义二元Bent序列的性质, 北京邮电大学学报, 28:10-13, 2005. [6]柯品惠, 常祖领, 温巧燕. GF(q)上的广义bent函数和完全非线性函数, 北京邮电大学学报, 29(3):110-113, 2006. [5]柯品惠, 刘太琳, 温凤桐, 温巧燕.有限域上多值逻辑函数的频谱研究, 北京邮电大学学报, 29(1):43-47,2006. [4]Pinhui Ke, Jie Zhang, Qiaoyan Wen. Results on almost resilient functions. AppliedCryptography and Network Security: 4th International Conference, ACNS 2006, J.Zhou, M.Yung and F.Bao(eds.), Springer-Verlag, LNCS 3989:421-432, 2006. [3]Pin-Hui Ke, Tai-LinLiu, Qiao-Yan Wen. Construction of almost resilient functions. Cryptology andNetwork Security: 4th International Conference, CANS 2005, Yvo G. Desmedt et al. (eds.), Springer-Verlag , LNCS 3810: 236-246, 2005. [2]柯品惠, 常祖领, 温巧燕. 广义bent序列的构造. 通信学报, 26(12):19-23, 2005. (该文被Front. Electr.Electron. Eng. China (2006)1 : 1–7全文摘录). [1]柯品惠, 常祖领, 温巧燕. 有限域上多值逻辑函数的线性结构及退化性. 福建师范大学学报(自然科学版), 21(2):1-4, 2005. 教学 1. 本科:高等代数,现代密码学, 信息与编码, 线性代数, 离散数学, 高等数学, 概率论与数理统计, 信息安全概论、信息安全数学基础; 2. 研究生:Finite Fields, Sequence design, Modern Cryptography. 指导研究生 (1)在读 博士:张同慧 (2023级), 颜霏霏(2024级); 学术硕士:龙珊珊(2024级)、郑坤斌(2024级)、刘旋宇(2023级)、管炜婷(2023级)、陈范聪 (2022级); 专业硕士:陈祈(2024级)、周杰(2024级)、陈雅真(2024级)、王晶(2024级)、曾诗虹(2024级)、李玉珍(2023级)、路睿(2023级)、段亚(2023级)、曾楚炎(2023级)、曹志东(2023级) (2)已毕业: 2022级: 刘鹤龙 (石狮市后垵学校,学科教学), 黄僖(余庆县他山中学,学科教学); 王顺斌 (嘉兴市长虹实验学校,学科教学); 陈锦涛 (厦门六中,学科教学,联培) 2020级: 杨志耀博士 (现就职“淮北师范大学”); 赵晨阳(现就职“湖北襄阳市委党校”) 2019级: 余林燕(获2022年校优秀硕士研究生毕业论文,现就职“广西贵港市高级中学”) 2018级: 乔盼盼(现就职“西安市浐灞第七初级中学”) 2017级: 仲燕(与张胜元教授合作指导, 现就职“华中师范大学附属息县高级中学”); 卢栎羽(现就职“广东南雄中学”). 2015级: 江月琴(获2018年校优秀硕士研究生毕业论文, 现就职“闽侯八中”); 李正谦(获2018年校优秀硕士研究生毕业论文, 现就职“泉州石狮一中”); 2013级: 叶智钒(获2015年国家优秀研究生奖学金, 现西南交大博士毕业,清华大学博士后), 胡电芬(现就职“福州商贸职业中专学校”). 2011级: 陈浩源(现就职“福建技术师范学院”); 余望鸿(现就职“厦门同安兴贤学校”); 李瑞芳(获2014年校优秀硕士研究生毕业论文一等奖, 现就职“厦门市鹭江新城小学”). 2008级: 杨正(获2011年校优秀硕士研究生毕业论文一等奖, 西南交大博士毕业, 现为福建师范大学光电与信息工程学院副教授); 章海辉(现就职“厦门大学附属中学”); 王志华(现就职“大同市馨茂中学”). |
