辛祥鹏，博士，男，1982年11月生，聊城大学副教授，硕士生导师。一直从事非线性数学物理、可积系统与符号计算领域中相关问题的研究，具有扎实的研究基础。在非线性数学物理方程李群理论及应用、非局域对称、非局部方程等方向做了大量的研究，并取得了一定的成果.近5年， 在《Appl. Math. Comput.》，《J.Math.Phys.》，《Appl.Math.Lett》，《Commun. Theor. Phys.》，《Chin. Phys. B》等国内外著名SCI收录期刊录用发表论文20余篇。主持完成国家自然科学基金青年项目、山东省中青年优秀科学家奖励基金各1项，参与山东省自然科学基金3项，参与校级教改项目1项；获山东省高等学校科技奖一等奖1项，第二位；聊城大学优秀科研成果奖3项，分别为二等奖两项和三等奖一项；获校教学成果奖二等奖1项，第三位。
受教育经历
2008-2011年， 聊城大学数学科学学院， 硕士
2011-2014年， 华东师范大学软件学院， 博士
研究工作经历
2019/01-至今， 聊城大学， 数学科学学院， 副教授
2014/06-2018/12 聊城大学， 数学科学学院， 讲师
教研、科研项目：
1. 国家自然科学基金委员会，青年基金项目，**，非线性数学物理方程非局域
对称、可积离散化的研究，2016-01至2018-12，结题，主持
2. 山东省自然科学基金委员会，博士基金，BS2015SF009 ， 保对称离散方法在孤子
方程可积离散中的应用，2015-07至2017-07，结题，主持
3. 山东省自然科学基金委员会，博士基金， 图像配准的变分模型和快速算法研究，2
017-07至2019-07，在研，参加
4. 山东省自然科学基金委员会，博士基金， 脉冲延迟微分方程数值方法的稳定性研
究，2017-07至2019-07，在研，参加
5. 山东省自然科学基金委员会，联合专项项目，ZR2015AL008，双曲型Monge-Ampere
方程经典解的研究及其几何应用，2015-07至2018-03，结题，参加
期刊论文
[1]Xiang-Peng Xin,Hanze Liu, Linlin ZHang, High order nonlocal symmetries and exact interaction solutions of the variable coefficient KdV equation,Appl. Math. Lett., 88(2019) 132-140.
[2] Xiangpeng Xin , Linlin Zhang, Yarong Xia, Hanze Liu, Nonlocal symmetries and exact solutions of the (2+1)-dimensionalgeneralized variable coefficient shallow water wave equation, Applied Mathematics Letters 94 (2019) 112–119
[3]Xin Xiangpeng , Liu Yutang , Liu Xiqiang . Nonlocal symmetries, exact solutions and conservation laws of the coupled Hirota equations.[J]. Applied Mathematics Letters, 2016, 55:63-71.
[4] Xiang-Peng Xin, Xi-Qiang Liu. Interaction Solutions for (1+1)-Dimensional Higher-OrderBroer-Kaup System[J]., 2016, 066(011):479-482.
[5] Xin XiangPeng,Liu HanZe, Liu XiQiang. Nonlocal symmetries and interaction solutions of the (2+1)-dimensional higher order Broer-Kaup system[J]. 2016, 65(24).
[6] Liu HanZe, Xin XiangPeng,Symmetries,Integrability and Exact Solutions to the (2+1)-Dimensional Benney Types of Equations[J]. 理论物理通讯：英文版, 2016(8):155-162
[7] Liu H , Xin X, Wang Z , et al. Backlund transformation classification, integrability and exact solutions to the generalized Burgers'-KdV equation[J]. Communications in Nonlinear ence and Numerical Simulation, 2017, 44(mar.):11-18.
[8] Ya-rong Xia, Xiang-peng Xin, Shun-Li Zhang. Residual symmetry, interaction solutions, and conservation laws of the (2+1)-dimensional dispersive long-wave system[J]. Chinese Physics B, 2017, 26(3):030202.
[9] Ya-rong Xia, Xiang-peng Xin, Nonlinear Self-Adjointness, Conservation Laws and Soliton-Cnoidal Wave Interaction Solutions of(2+1)-Dimensional Modified Dispersive Water-Wave System[J]. Communications in Theoretical Physics, 2017, 67(1):15-21.
[10] Lixiang Z , Hanze L , Xiangpeng X . Symmetry reductions, exact equations and the conservation laws of the generalized (3+1) dimensional Zakharov-Kuznetsov equation[J]. 物理学报, 2017, 66(8).
[11] Li K H , Liu H Z , Xin X P. Lie symmetry analysis, optimal system, exact solutions and conservation laws of a class of high-order nonlinear wave equations[J]. Acta Physica Sinica Chinese Edition, 2016, 65(14).
[12] Liu, Hanze, Liu, Xiqiang, Wang, Zenggui, Xin Xiangpeng. Painlevé analysis, Phi -integrable and exact solutions to the (3+1)-dimensional nonlinear evolution equations[J]. Nonlinear Dynamics, 2016, 85(1):281-286.
[13] Xia, Ya-Rong, Zhang, Shun-Li, Xin, Xiang-Peng.Perturbed invariant subspaces and approximate generalized functional variable separation solution for nonlinear diffusion–convection equations with weak source[J]. Modern Physics Letters B, 2018, 32(07):**.
[14] Xin Xiangpeng, Miao Qian and Chen Yong, Nonlocal symmetries and exact solutions for PIB Equation, Commun. Theor. Phys., 58(2012) 331-337.
[15] Xin Xiangpeng, Chen Yong, The Using of Conservation Laws in Symmetry-Preserving Difference Scheme, Commun. Theor. Phys., 59(2013) 573-578.
[6]Symmetries, Integrability and Exact Solutions to the (2+1)-Dimensional Benney Types of Equations
[7]B?cklund transformation classification, integrability and exact solutions to the generalized Burgers’–KdV equation
[8]Residual symmetry, interaction solutions, and conservation laws of the(2+1)-dimensional dispersive long-wave system
[9]Nonlinear Self-Adjointness, Conservation Laws and Soliton-Cnoidal Wave Interaction Solutions of (2+ 1)-Dimensional Modified Dispersive Water-Wave System
[10]Symmetry reductions, exact equations and the conservation laws of the generalized (3+1) dimensional
Zakharov-Kuznetsov equation
[11]Lie symmetry analysis, optimal system, exact solutions and conservation laws of a class of high-order nonlinear wave equations
[12]Painlevé analysis, phi-integrable and exact solutions to the (3+1)-dimensional nonlinear evolution equations
[16] Xin Xiangpeng, Chen Yong and Wang Yunhu, A symmetry-preserving difference scheme for high dimensional nonlinear evolution equations, Chin. Phys. B, 22 (2013) 060201.
[17] Xin Xiangpeng, Chen Yong, A Method to Construct the Nonlocal Symmetries of Nonlinear Evolution Equations, Chin. Phy. Lett., 30 (2013) 100202.
[18] Xin Xiangpeng, Miao Qian and Chen Yong, Nonlocal symmetry, optimal systems, and explicit solutions of the mKdV equation, Chin. Phys. B, 23 (2014) 010203.
[19] Xin Xiangpeng, Chen Junchao and Chen Yong, Nonlocal Symmetries and Explicit Solutions of the Boussinesq Equation, Chin. Ann. Math. B, 35B(6), 2014, 841–856.
[20] Chen Junchao, Xin Xiangpengand Chen Yong, Nonlocal symmetries of the Hirota-Satsuma coupled Korteweg-de Vries and their applications Exact interaction solutions and integrable hierarchy system, J. Math. Phys., 55 (2014) 053508.
[21] Qian Miao, Xiangpeng Xin, Yong Chen, Nonlocal symmetries and explicit solutions of the AKNS system, Appl. Math. Lett., 28 (2014) 7-13.
[22] Wang Yunhu, Chen Yong and Xin Xiangpeng, Nonlocal Symmetry of the Lax Equation Related to Riccati-Type Pseudopotential, Chin. Phy. Lett., 29 (2012) 120503.
[23] Chen Junchao, Xin Xiangpengand Chen Yong, symmetry Analysis and Conservation Laws to the (2+1)-Dimensional Coupled Nonlinear Extension of the Reaction-Diffusion Equation, Commun. Theor. Phys. 62 (2014)173-182
联系方式： 邮箱：xinxiangpeng@lcu.edu.cn