2005.04-2008.03,东京大学大学院数理科学研究科,博士
2003.04-2005.03,东京大学大学院数理科学研究科,硕士
1997.09-2001.07,中国科学技术大学数学系,本科
Education
Apr., 2005 - Mar., 2008, Graduate School of Mathematical Sciences, University of Tokyo, Ph.D. Mathematics
Apr., 2003 - Mar., 2005, Graduate School of Mathematical Sciences, University of Tokyo, M.S. Mathematics
Sep., 1997 - July, 2001, Department of Mathematics, University of Science and Technology of China, B.S. Mathematics
Publication List:
[24] Zhonghua Li and Ce Xu,Weighted sum formulas of multiple t-values with even arguments, Forum Math., accepted,//doi.org/10.1515/forum-2019-0231.
[23]Zhonghua Li and Ce Xu,On q-analogues of quadratic Euler sums,Period Math. Hung., accepted,//doi.org/10.1007/s10998-020-00312-7.
[22]Zhonghua Li and Ende Pan, Topological properties of q-analogues of multiple zeta values,Int. J. Number Theory 16 (5) (2020), 963-980.
[21]Zhonghua Liand Ende Pan,Sum of interpolated finite multiple harmonic q-series,J. Number Theory201(2019), 148-175.
[20]Zhonghua Liand Noriko Wakabayashi, Sum of interpolated multiple q-zeta values,J. Number Theory200(2019),205-259.
[19]Zhonghua Li and Chen Qin, Weighted sum formulas of multiple zeta values with even arguments,Math. Z.291(3) (2019), 1337-1356.
[18] Zhonghua Li, Derivation relations and duality for the sum of multiple zeta values,Funct. Approx. Comment. Math.,58(2) (2018), 215-220.
[17] Zhonghua Li and Chen Qin, Stuffle product formulas of multiple zeta values,Taiwanese J. Math.22(3) (2018), 529-543.
[16] Zhonghua Li, Relations of multiple zeta values: from the viewpoint of some special functions,RIMS K/^{o}ky/^{u}roku BessatsuB68(2017), 123-133.
[15] Zhonghua Li and Chen Qin, Some relations of interpolated multiple zeta values,Internat. J. Math.28(5) (2017), 1750033, 25 pp.
[14] Zhonghua Li and Chen Qin, Shuffle product formulas of multiple zeta values,J. Number Theory171(2017), 79-111.
[13] Zhonghua Li, On functional relations for the alternating analogues of Tornheim's double zeta function,Chin. Ann. Math.36(B)(6) (2015), 907-918.
[12] Zhonghua Li, Another proof of Zagier's evaluation formula of the multiple zeta values /zeta(2,/ldots,2,3,2,/ldots,2),Math. Res. Lett.20(5) (2013), 947-950.
[11] Zhonghua Li, Some identities in the harmonic algebra concerned with multiple zeta values,Int. J. Number Theory9(3) (2013), 783-798.
[10] Zhonghua Li, Regularized double shuffle and Ohno-Zagier relations of multiple zeta values,J. Number Theory133(2) (2013), 596-610.
[9] Zhonghua Li, On a conjecture of Kaneko and Ohno,Pacific J. Math.257(2) (2012), 419-430.
[8] Zhonghua Li, Higher order shuffle regularization for multiple zeta values,Proc. Amer. Math. Soc.138(7) (2010), 2321-2333.
[7] Zhonghua Li, Gamma series associated to elements satisfying regularized double shuffle relations,J. Number Theory130(2) (2010), 213-231.
[6] Zhonghua Li, Sum of multiple q-zeta values,Proc. Amer. Math. Soc.138(2) (2010), 505-516.
[5] Zhonghua Li, Sum of multiple zeta values of fixed weight, depth and i-height,Math. Z.258(1) (2008), 133-142.
[4] Chenghao Chu, Zhonghua Li and Guangtian Song, Relative K2 of rings with SR2*(R,I) condition,Adv. Math. (China)35(2006), 93-101.
[3] Zhonghua Li, Guangtian Song and Chenghao Chu, On PMM rings,J. Univ. Sci. Technol. China35 (2005), 32-41.
Preprint:
[2] Zhonghua Li,Algebraic relations of interpolated multiple zeta values, arXiv: 1904.09887.
[1] Zhonghua Li and Chen Qin, Some relations deduced from regularized double shuffle relations of multiple zeta values, arXiv: 1610.05480.