近期论文
查看导师新发文章
(温馨提示:请注意重名现象,建议点开原文通过作者单位确认)
33. Mourad Sini, Haibing Wang*, Qingyun Yao, Analysis of the acoustic waves reflected by a cluster of small holes in the time-domain and the equivalent mass density, arXiv:2002.06152.
32. Lixin Feng, Haibing Wang*, Lei Zhang, The forward and inverse problems for the scattering of obliquely incident electromagnetic waves in a chiral medium, submitted, 2020.
31. Yi-Hsuan Lin, Gen Nakamura, Roland Potthast, Haibing Wang, Duality between range and no-responses tests and its application for inverse problems, Inverse Problems and Imaging, 2020
30. Yu Jiang, Gen Nakamura, Haibing Wang*, Locating small inclusions in diffuse optical tomography by a direct imaging method, IMA Journal of Applied Mathematics, 2020.
29. Qingyun Yao, Yi Li, Haibing Wang*, Numerical solutions of the forward and inverse problems arising in diffuse optical tomography, Applied Numerical Mathematics, 154 (2020), 70–89.
28. Mourad Sini, Haibing Wang*, Estimation of the heat conducted by a cluster of small cavities and characterization of the equivalent heat conduction, SIAM Multiscale Modeling and Simulation, 17 (2019), No. 4, 1214–1251.
27. Gen Nakamura, Haibing Wang*, Solvability of interior transmission problem for the diffusion equation by constructing its Green function, Journal of Inverse and Ill-posed Problems, 27 (2019), No. 5, 671–701.
26. Haibing Wang*, Yi Li, Numerical solution of an inverse boundary value problem for the heat equation with unknown inclusions, Journal of Computational Physics, 369 (2018), 1–15.
25. Gen Nakamura, Haibing Wang*, Numerical reconstruction of unknown Robin inclusions inside a heat conductor by a non-iterative method, Inverse Problems, 33 (2017), No. 5, 055002.
24. Haibing Wang, Jijun Liu, An inverse scattering problem with generalized oblique derivative boundary condition, Applied Numerical Mathematics, 108 (2016), 226–241.
23. Haibing Wang, Jijun Liu, The two-dimensional direct and inverse scattering problems with generalized oblique derivative boundary condition, SIAM J. Appl. Math., 75 (2015), No. 2, 313–334.
22. Gen Nakamura, Haibing Wang*, Reconstruction of an impedance cylinder at oblique incidence from the far-field data, SIAM J. Appl. Math., 75 (2015), No. 1, 252–274.
21. Gen Nakamura, Haibing Wang*, Reconstruction of an unknown cavity with Robin boundary condition inside a heat conductor, Inverse Problems, 31 (2015), No. 12, 125001.
20. Zenwen Wang, Haibing Wang, Shufang Qiu, A new method for numerical differentiation based on direct and inverse problems of partial differential equations, Appl. Math. Letters, 43 (2015), 61–67.
19. Junichi Nakagawa, Gen Nakamura, Satoshi Sasayama, Haibing Wang, Local maxima of solutions to some nonsymmetric reaction-diffusion systems, Math. Meth. Appl. Sci., 37 (2014), No. 5, 752–767.
18. Haibing Wang*, Bin Wu, On the Well-Posedness of Determination of Two Coefficients in a Fractional Integrodifferential Equation, Chinese Ann. Math., 35B (2014), No. 3, 447–468.
17. Gen Nakamura, Haibing Wang, Linear sampling method for the heat equation with inclusions, Inverse Problems, 29 (2013), No. 10, 104015. (This paper is selected as one of the highlights from IP in 2013)
16. Gen Nakamura, Haibing Wang, The direct electromagnetic scattering problem from an imperfectly conducting cylinder at oblique incidence, J. Math. Anal. Appl., 397 (2013), 142–155.
15. Haibing Wang, Jijun Liu, On decomposition method for acoustic wave scattering by multiple obstacles, Acta Mathematica Scientia (Ser. B), 33 (2013), No. 1, 1–22.
14. Haibing Wang, Jijun Liu, A decomposition scheme for acoustic obstacle scattering in a multilayered medium, Applicable Analysis, 92 (2013), No. 4, 831–854.
13. Gen Nakamura, Haibing Wang, Inverse scattering for obliquely incident polarized electromagnetic waves, Inverse Problems, 28 (2012), No. 10, 105004.
12. Horst Heck, Gen Nakamura, Haibing Wang, Linear sampling method for identifying cavities in a heat conductor, Inverse Problems, 28 (2012), No. 7, 075014.
11. Gen Nakamura, Brian D. Sleeman, Haibing Wang, On uniqueness of an inverse problem in electromagnetic obstacle scattering for an impedance cylinder, Inverse Problems, 28 (2012), No. 5, 055012. (This paper is selected as a featured article by IP)
10. Haibing Wang, Jijun Liu, On the reconstruction of surface impedance from the far-field data in inverse scattering problems, Applicable Analysis, 91 (2012), No. 4, 787–806.
9. Haibing Wang, Gen Nakamura, The integral equation method for electromagnetic scattering problem at oblique incidence, Applied Numerical Mathematics, 62 (2012), No. 7, 860–873.
8. Haibing Wang, Jijun Liu, Recovering the Dirichlet-to-Neumann map in inverse scattering problems using integral equation methods, Advances in Computational Mathematics, 36 (2012), No. 2, 279–297.
7. Jishan Fan, Gen Nakamura, Haibing Wang*, Blow-up criteria of smooth solutions to the 3D Boussinesq system with zero viscosity in a bounded domain, Nonlinear Analysis: TMA, 75 (2012), No. 7, 3436–3442.
6. Haibing Wang, Jijun Liu, Splitting method for acoustic scattering by a two-layered obstacle (in Chinese), J. Southeast University (Natural Science Edition), 41 (2011), No. 3, 652–658.
5. Haibing Wang, Jijun Liu, On the reconstruction of Dirichlet-to-Neumann map in inverse scattering problems with stability estimates, Science China Mathematics, 53 (2010), No. 8, 2069–2084.
4. Jijun Liu, Haibing Wang, Some Reconstruction Methods for Inverse Scattering Problems, Optimization and Regularization for Computational Inverse Problems and Applications, Edited by Y.F. Wang etc., Springer-Verlag, Berlin and Higher Education Press, Beijing, 2010.
3. Haibing Wang, Jijun Liu, Numerical solution for the Helmholtz equation with mixed boundary condition, Numerical Mathematics: A Journal of Chinese Universities, 16 (2007), No. 3, 203–214.
2. Haibing Wang, Jijun Liu, Numerical realization of probe method for multiple obstacles (in Chinese), Mathematica Numerica Sinica, 29 (2007), No.2, 189–202.
1. Haibing Wang, Jijun Liu, Asymptotic Behavior of Eigenvalues of a Sturm-Liouville Problem with Robin Boundary (in Chinese), Mathematica Applicata, 18 (2005), No. 4, 654–661.