周倩楠，中共党员，1992年出生，河南新乡人, 现任江苏师范大学数学与统计学院教师. 2019年毕业于荷兰Twente大学，获理学博士学位.2020年毕业于西北工业大学，获理学博士学位（双博士学位）. 主要研究方向：图论及其应用，主要研究内容为谱半径条件下图的Hamilton性质。

Email:qnzhoumath@163.com.

一. 工作经历

    2020.05-至今    江苏师范大学  数学与统计学院    讲师   

二．‍‍已授课程

    高等数学II

三. 获奖和荣誉

   7. 江苏省普通高等学校第十八届高等数学竞赛优秀指导教师.

   6. 2021年度江苏师范大学优秀工会积极分子；

   5. 2021年第二届江苏师范大学立德树人优秀研究生导师团队；

   4. 2021年校先进工作者；

   3. 2021年江苏省“双创博士”；

   2. 2021年江苏师范大学数学与统计学院青年教师授课竞赛三等奖；

   1. 2018年博士生国家奖学金；

四.主持项目

   3.国家自然科学青年基金项目.  

   2.江苏省高校自然科学研究面上项目；

   1.江苏师范大学科研启动金；

五.发表学术论文

22.Zhou, Qiannan; Lu, Yong, Relation between the row left rank of a quaternion unit gain graph and the rank of its underlying graph. Electron J Linear Algebra. 39 (2023), 181-198.

21.Zhou, Qiannan; Broersma,Hajo; Wang, Ligong; Lu, Yong, A note on minimum degree, bipartite holes, and hamiltonian properties. Discuss. Math. Graph Theory. https://doi.org/10.7151/dmgt.2464.

20.Lu, Yong; Zhou, Qiannan,On hyper-Zagreb index conditions for hamiltonicity of graphs. Czech. Math. J. 72 (2022), 653-662.

19.Zhou, Qiannan; Broersma,Hajo; Wang, Ligong; Lu, Yong, Sufficient Spectral Radius Conditions for Hamilton Connectivity of k-Connected Graphs.  Graphs Combin. 37 (2021), 2467–2485.

18.Zhou, Qiannan; Broersma, Hajo; Wang, Ligong; Lu, Yong On sufficient spectral radius conditions for hamiltonicity. Discrete Appl. Math. 296 (2021), 26–38.

17.Lu, Yong; Zhou, Qiannan On sufficient topological indices conditions for properties of graphs. J. Comb. Optim. 41 (2021), no. 2, 487–503. 

16.Zhou, Qiannan; Wang, Ligong; Lu, Yong Some sufficient conditions for some graph properties. Ars Combin. 153 (2020), 161–175.

15.Zhou, Qiannan; Broersma, Hajo; Wang, Ligong; Lu, Yong On sufficient spectral radius conditions for hamiltonicity of k-connected graphs. Linear Algebra Appl. 604 (2020), 129–145.

14.Zhou, Qiannan; Wang, Ligong; Lu, Yong Sufficient conditions for Hamilton-connected graphs in terms of (signless Laplacian) spectral radius. Linear Algebra Appl. 594 (2020), 205–225. 

13.Zhou, Qiannan; Wang, Ligong; Lu, Yong Signless Laplacian spectral conditions for Hamilton-connected graphs with large minimum degree. Linear Algebra Appl. 592 (2020), 48–64.

12.Zhou, Qiannan; Wang, Ligong; Lu, Yong Wiener-type invariants and Hamiltonian properties of graphs. Filomat. 33 (2019), no. 13, 4045–4058. 

11.Lu, Yong; Wang, Ligong; Zhou, Qiannan The rank of a complex unit gain graph in terms of the rank of its underlying graph. J. Comb. Optim. 38 (2019), no. 2, 570–588.

10.Lu, Yong; Wang, Ligong; Zhou, Qiannan Skew-rank of an oriented graph in terms of the rank and dimension of cycle space of its underlying graph. Filomat. 32 (2018), no. 4, 1303–1312. 

9.Zhou, Qiannan; Wang, Ligong; Lu, Yong Wiener index and Harary index on Hamilton-connected graphs with large minimum degree. Discrete Appl. Math. 247 (2018), 180–185. 

8.Zhou, Qiannan; Wang, Ligong; Lu, Yong Some sufficient conditions on Hamiltonian and traceable graphs. Adv. Math. (China) 47 (2018), no. 1, 31–40. 

7.Zhou, Qiannan; Wang, Ligong; Lu, Yong Wiener-type invariants on graph properties. Filomat. 32 (2018), no. 2, 489–502. 

6.Zhou, Qiannan; Wang, Ligong; Lu, Yong Some sufficient conditions on k-connected graphs. Appl. Math. Comput. 325 (2018), 332–339.

5.Lu, Yong; Wang, Ligong; Zhou, Qiannan The rank of a signed graph in terms of the rank of its underlying graph. Linear Algebra Appl. 538 (2018), 166–186.

4.Zhou, Qiannan; Wang, Ligong Distance signless Laplacian spectral radius and Hamiltonian properties of graphs. Linear Multilinear Algebra 65 (2017), no. 11, 2316–2323. 

3.Lu, Yong; Wang, Ligong; Zhou, Qiannan Hermitian-Randić matrix and Hermitian-Randić energy of mixed graphs. J. Inequal. Appl. 2017, Paper No. 54, 14 pp. 

2.Zhou, Qiannan; Wang, Ligong Some sufficient spectral conditions on Hamilton-connected and traceable graphs. Linear Multilinear Algebra 65 (2017), no. 2, 224–234.

1.Lu, Yong; Wang, Ligong; Zhou, Qiannan Bicyclic oriented graphs with skew-rank 6. Appl. Math. Comput. 270 (2015), 899–908. 

六.社会兼职

   美国《数学评论》评论员