1. 主要科研项目
1. 国家自然科学基金面上项目, 半单Lie代数相关的若干经典和量子可积系统的代数和几何性质(11871396)2019.1-2022.12.
2. 国家自然科学基金青年项目, 非线性发展方程的切对称和拟局部对称(11101332)2012.1-2014.12.
3. 国家自然科学基金数学天元青年项目, 非线性偏微分方程的李对称和拟局部对称群分类(10926082)2010.1-2010.12.
4. 陕西省自然科学基础研究计划, Poisson代数与超可积系统(2018JM1005)2018.1-2019.12.
5. 陕西省自然科学基础研究计划, 非线性偏微分方程的Virasoro对称代数实现和切对称群分类(2015JM1037)2015.1-2016.12.
6. 陕西省自然科学基础研究计划, 线性偏微分方程的李对称和拟局部对称群分类(2009JQ1003)2010.1-2011.12.
2. 主要科研论文
[1] A.P. Fordy and Q. Huang. Stationary flows revisited. SIGMA Symmetry Integrability Geom. Methods Appl., 2023, 19: 015, 34 pages.
[2] A.P. Fordy and Q. Huang. Integrable and superintegrable extensions of the rational Calogero- Moser model in three dimensions. J. Phys. A: Math. Theor., 2022, 55(2): 225203, 36 pages.
[3] A.P. Fordy and Q. Huang. Adding potentials to superintegrable systems with symmetry. Proc. R. Soc. A, 2021, 477(2248): 20200800, 21 pages.
[4] A.P. Fordy and Q. Huang. Superintegrable systems on 3 dimensional conformally flat spaces. J. Geom. Phys., 2020, 153: 103687, 27 pages.
[5] Q. Huang and R. Zhdanov. Realizations of the Witt and Virasoro algebras and integrable equations. J. Nonlinear Math. Phys., 2020, 27(1): 36-56.
[6] A.P. Fordy and Q. Huang. Generalised Darboux-Koenigs metrics and 3-dimensional superintegrable systems. SIGMA Symmetry Integrability Geom. Methods Appl., 2019, 15: 37, 30 pages.
[7] L. Shang and Q. Huang. On superintegrable systems with a cubic integral of motion. Commun. Theor. Phys., 2018, 69(1): 9-13.
[8] A.P. Fordy and Q. Huang. Poisson algebras and 3D superintegrable Hamiltonian systems. SIGMA Symmetry Integrability Geom. Methods Appl., 2018, 14: 022, 37 pages.
[9] C.E. Ye, Q. Huang, S.F. Shen and Y.Y. Jin. A symmetry classification algorithm of the generalized differential-difference equations. Appl. Math. Lett., 2017, 74: 27-32.
[10] Q. Huang, L.Z. Wang and S.L. Zuo. Consistent Riccati expansion method and its applications to nonlinear fractional partial differential equations. Commun. Theor. Phys., 2014, 65(2): 177-184.
[11] Q. Huang and S.F. Shen. Lie symmetries and group classification of a class of time fractional evolution systems. J. Math. Phys., 2015, 56 (12): 123504, 11 pages.
[12] Q. Huang and R. Zhdanov. Group classification of nonlinear evolution equations: semi- simple groups of contact transformations. Commun. Nonlinear Sci. Numer. Simul., 2015, 26: 184-194.
[13] Q. Huang and R. Zhdanov. Symmetries and exact solutions of the time fractional Harry-Dym equation with Riemann-Liouville derivative. Phys. A, 2014, 409: 110-118.
[14] Q. Huang, L.Z. Wang, S.F. Shen and S.L. Zuo. Galilei symmetries of KdV-type nonlinear evolution equations. Phys. A, 2014, 398: 25-34.
[15] Q. Huang, C.Z. Qu and R. Zhdanov. Group classification of linear fourth-order evolution equations. Rep. Math. Phys., 2012, 70 (3): 331-343.
[16] S.F. Shen, C.Z. Qu, Q. Huang and Y.Y. Jin. Lie group classification of the Nth-order nonlinear evolution equations. Sci. China Math., 2011, 54 (12): 2553-2572.
[17] Q. Huang, C.Z. Qu and R. Zhdanov. Group-theoretical framework for potential symmetries of evolution equations. J. Math. Phys., 2011, 52 (2): 023514, 11 pages.
[18] Q. Huang, C. Z. Qu and R. Zhdanov. Classification of local and nonlocal symmetries of fourth-order nonlinear evolution equations. Rep. Math. Phys., 2010, 65 (3): 337-366.
[19] Q. Huang, V. Lahno, C. Z. Qu and R. Zhdanov. Preliminary group classification of a class of fourth-order evolution equations. J. Math. Phys., 2009, 50 (2): 023503, 23 pages.
[20] C.Z. Qu and Q. Huang. Symmetry reductions and exact solutions of the affine heat equation. J. Math. Anal. Appl., 2008, 346 (2): 521-530.
[21] Q. Huang and C.Z. Qu. Symmetries and invariant solutions for the geometric heat flows. J. Phys. A, 2007, 40 (31): 9343-9360.
1. “非线性偏微分方程的对称、不变量和几何可积性”, 陕西省科学技术奖一等奖, 2010, 第三完成人
2. “非线性偏微分方程的对称、不变量和几何可积性”, 陕西省高等学校科学技术奖一等奖, 2008, 第四完成人
西北大学