張慶輝(中山大學數據科學與計算機學院副教授)

有限元法、廣義有限元法、計算力學與仿真、高性能多尺度並行算法、無格線法

2006/09–2009/07，中山大學，數學與計算科學學院，博士

2007/10–2009/02，美國Syracuse大學，數學系，聯合培養博士

1999/09–2006/07，北京師範大學，數學科學學院，學士、碩士

2018/04–至今，中山大學，數據科學與計算機學院，教授

2015/08–2018/04，中山大學，數據科學與計算機學院，副教授

2012/06–2015/07，中山大學，數學與計算科學學院，副教授

2009/07–2012/06，中山大學，數學與計算科學學院，講師

2010/03–2011/03，香港大學，工學院機械工程系，博士後

[1] 主持廣東省自然科學傑出青年基金項目，項目編號：2015A030306016，項目名稱：基於高性能計算機的廣義有限元並行算法及力學軟體研發，在研；

[2] 主持國家自然科學基金面上項目，項目編號： 11471343，項目名稱：穩定廣義有限元法的研究與若干典型工程套用，在研；

[3] 參與（子課題負責人）國家自然科學基金重大研究計畫項目集成項目，項目編號： 91730305，項目名稱：飛機結構最佳化及三維載荷分析中的高性能算法及驗證，在研；

[4] 聯合主持國家自然科學基金海外及港澳學者合作研究項目11628104，奇性問題的漸進四邊形和六面體有限元法及套用，在研;

[5] 主持國家自然科學基金青年基金項目，項目編號： 11001282，項目名稱：無格線方法中關鍵計算問題的算法、理論及其在計算力學中的套用，已結題；

[6] 主持廣東省自然科學基金項目，項目編號： S2011040003030， 項目名稱：Helmholtz方程的波動基有限元法，已結題。

[19]Q. Zhang,DOF-gathering stable generalized finite element methods (SGFEM) for crack problems, submitted, 2018

[18]Q. Zhang,U. Banerjee, and I. Babuska, Stable generalized finite element methods (SGFEM) for interface problems with singularities, accepted in Computer Methods in Applied Mechanics and Engineering,2018.

[17] H. Li andQ. Zhang(corresponding), Optimal quadrilateral finite elements on polygonal domains,Journal of Scientific Computing, 70: 60-84, 2017.

[16]Q. Zhang, I. Babuska, and U. Banerjee,Robustness in stable generalized finite element methods (SGFEM) applied to Poisson problems with crack singularities, Computer Methods in Applied Mechanics and Engineering,311: 476-502, 2016.

[15] Bin Wu andQ. Zhang(corresponding), Fast Multiscale Regularization Methods for High-Order Numerical Differentiations, IMA journal ofNumerical Analysis, 36: 1432-1451, 2016.

[14] G. Jin, H. Li,Q. Zhang, and Q. Zou, linear and quadratic finite volume methods on triangular meshes for elliptic equations with singular solutions, International Journal of Numerical Analysis and Modeling, 13: 244-264, 2016.

[13]Q. Zhang,U. Banerjee, and I. Babuska, High order stable generalized finite element methods, Numerische Mathematik, 128: 1-29, 2014.

[12]Q. Zhang, Quadrature for meshless Nitsche’s methods, Numerical Methods for Partial Differential Equations, 30: 265-288, 2014.

[11]Q. Zhangand Q. Zou , A class of finite volume schemes of arbitrary order on non-uniform meshes, Numerical Methods for Partial Differential Equations, 30: 1614-1632, 2014.

[10]Q. Zhangand K. Sze, Hybrid linear and quadratic finite element models for 3D Helmholtz problem, Acta Mechanica Solid Sinica. 26: 603-618, 2013.

[9] L. Sun, G. Yang, andQ. Zhang(corresponding),Numerical integration with Constraints for meshless local Petrov-Galerkin methods, CMES: Computer Modeling in Engineering & Sciences, 95: 235-258, 2013.

[8]Q. Zhangand U. Banerjee, Numerical integration in Galerkin meshless methods, applied to elliptic Neumann problem with non-constant coefficients, Advances in Computational Mathematics, 37: 453-492, 2012.

[7] H. Zhang, Y. Xu, andQ. Zhang, Refinement of vector-valued reproducing kernels, Journal of Machine Learning Research, 13: 91-136, 2012.

[6] K. Sze.Q. Zhang, and G. Liu, Hybrid quadrilateral finite element models for axial symmetric Helmholtz problem, Finite Elements in Analysis and Design, 52: 1-10, 2012.

[5]Q. Zhang, Theoretical analysis of numerical integration in Galerkin meshless methods, BIT Numerical mathematics, 51: 459-480, 2011.

[4] H. Zhang andQ. Zhang(corresponding),Sparse discretization matrices for Volterra integral operators with applications to numerical differentiation, Journal of Integral Equations and Applications, 23: 137-156, 2011.

[3] K. Sze,Q. Zhang,and G. Liu, Multi-field three-node triangular finite element models for Helmholtz problem, Journal of Computational Acoustics, 19: 317-334, 2011.

[2] G. Liu,Q. Zhang,and K. Sze, Spherical-wave based triangular finite element models for axial symmetric Helmholtz problems, Finite Elements in Analysis and Design, 47: 342-350, 2011.

[1] I. Babuska, U. Banerjee, J. Osborn, andQ. Zhang, Effect of numerical integration on meshless methods, Comput. Methods Appl. Mech. Engrg., 198: 2886-2897, 2009.