姓名:丁汉芹
职称:教授
联系方式:0991-8582405
办公地址:博达校区物理楼A337
邮箱:dinghq@xju.edu.cn
研究方向:理论物理/低维凝聚态理论
个人简介:
理学博士,教授,博士生导师,主要研究方向为低维凝聚态理论,主持国家自然科学基金4项、自治区自然科学基金3项,以通讯或一作发表SCI论文50余篇,研究成果获自治区自然科学奖二等奖;主讲《量子力学》《群论》等课程,主持自治区教改项目1项,主编高校教材1部,发表教学论文20余篇。
教育背景:
学士:合肥师范学院
硕士:新疆大学/浙江大学
博士:西安交通大学
科研项目:
[1] 一维磁性系统自旋液体行为的研究,自治区自然科学基金,2024/10-2027/09;
[2] 新疆大学理论物理学科发展与人才培养及交流平台建设,国家自然科学基金,2022/01-2022/12;
[3] 一维赫伯德模型的扩展及其在凝聚态物理中的应用,国家自然科学基金,2021/01-
2024/12;
[4] 一维费米体系的拉亭格液体行为的理论研究,自治区自然科学基金,2020/06-2023/05;
[5] 一维关联电子体系的非费米液体行为的研究,国家自然科学基金,2017/01-2020/12;
[6] 低维量子系统中的关联和相变,国家自然科学基金,2014/01-2017/12;
[7] 一维扩展赫伯德模型基态特性的理论研究,自治区自然科学基金,2012/01-2014/12。
代表论文:[1-16为通讯作者,17-28为第一作者]
[1] SuperhydrophobicPET-Cu-Ni @MWCNT with electropositive layer toenhance the electrical properties of TENG for human wearable sensors.Chem. Eng. J., 512: 161385 (2025)
[2] 2D MXenes-Based Gas Sensors: Progress, Applications and Challenges.Small Methods, 2402179 (2025)
[3]Phase diagram of the Hubbard chain with symmetric density-dependent hopping.Results Phys., 65: 107983 (2024)
[4] Ground-state phase diagram of the unconventional Hubbard chain with bond-charge interaction.Results Phys., 64: 107925 (2024)
[5] Construction of high-performance g-C3N4/MoS2 heterojunction humidity sensor and investigation of its application.Sens. Actuators B: Chem., 419: 136392 (2024)
[6] Ground-state instabilities in a Hubbard-type chain with particular correlated hopping at non-half-filling.Results Phys., 49: 106472 (2023)
[7] Phase diagram of a generalized Penson-Kolb-Hubbard chain with the occupation-dependent hopping.Results Phys., 44: 106169 (2023)
[8] Ground-state properties of the one dimensional modified Penson-Kolb-Hubbard model.Results Phys., 41: 105921 (2022)
[9] Superconductivity in the extended Hubbard chain with three-electrondensity interaction.Results Phys., 39: 105670 (2022)
[10]Theoretical investigation of four-body interaction in the one-dimensional extended Hubbard model.Results Phys., 34: 105250 (2022)
[11] Insulating phases driven by unequal on-site repulsion in the 1D unconventional Hubbard model.Results Phys., 24: 104206 (2021)
[12] Coexistence of superconductivity and density wave orders in a one-dimensional correlated system.Chin. J. Phys., 67: 222 (2020)
[13] Density wave instabilities in the one-dimensional metals.Chin. J. Phys., 59: 250 (2019)
[14] NaCa4V5O17with isolated V2O7dimer and trimer exhibiting a large birefringence.J. Solid State Chem., 269: 94 (2019)
[15] A low-energy physics of an extended Hubbard chain with additional three-body couplings.Chin. J. Phys., 56(4): 1633 (2018)
[16] Frustration-driven singlet superconductivity in the1Dt-U-J1-J2model with positive interactions.Chin. J. Phys., 55(5):1888 (2017)
[17] Unequal on�site interaction effectsin the one�dimensional electronsystem at quarter filling.Sci. Rep., 11: 10806 (2021)
[18] Phase transition in the one-dimensional pair-hopping model with unusual one-electron hopping.Phys. Lett. A, 383(23): 2784 (2019)
[19] Spin-gapped phases in the frustrated Hubbard chain with transverse spin anisotropy.Phys. Lett. A, 382(41): 3046 (2018)
[20] Investigation of a four-body coupling in the one-dimensional extended Penson-Kolb-Hubbard model.Phys. Lett. A, 381(36): 3119 (2017)
[21] Metal-insulator transition in a one-dimensional extended Hubbard model at quarter filling.Chin. J. Phys., 54(2):237 (2016)
[22] Superconductivity in a SO(4) symmetric one-dimensional interacting system with diagonal three-body attraction.Chin. J. Phys., 54(5):744 (2016)
[23] Investigation of the ground state of the anisotropic extended Hubbard chain at weak coupling.Phys. Lett. A, 380(40): 3292 (2016)
[24] Influence of the modulated hopping on the one-dimensional interacting electron system.Phys. Lett. A, 379(38): 2374 (2015)
[25]Hanqin Ding, Jun Zhang*. Phase diagram of an extended t-U-J chain with frustrated exchange interaction.Int. J. Mod. Phys. B, 28(32): 1450228 (2014)
[26] Ground state properties of an extended Hubbard chain with easy-axis magnetic anisotropy.Chin. J. Phys. 51(5): 1006 (2013)
[27] Effect of singlet pairing hopping on the one-dimensional extended model with spin exchange interaction.Eur. Phys. J. B, 85(6): 200 (2012)
[28] Bond-located phases in the one-dimensional t-U-V-J model.Phys. Lett. A, 375(16): 1751 (2011)
