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Nonlinear Wavelet Methods for High-dimensional Backward Heat Equation

Nonlinear Wavelet Methods for High-dimensional Backward Heat Equation
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摘要 The backward heat equation is a typical ill-posed problem. In this paper, we shall apply a dual least squares method connecting Shannon wavelet to the following equation Motivated by Reginska's work, we shall give two nonlinear approximate methods to regularize the approximate solutions for high-dimensional backward heat equation, and prove that our methods are convergent. The backward heat equation is a typical ill-posed problem. In this paper, we shall apply a dual least squares method connecting Shannon wavelet to the following equation Motivated by Reginska's work, we shall give two nonlinear approximate methods to regularize the approximate solutions for high-dimensional backward heat equation, and prove that our methods are convergent.
作者 Rui LI Jin Ru WANG
机构地区 Department of Applied Mathematics
出处 《Acta Mathematica Sinica,English Series》 SCIE CSCD 2013年第5期913-922,共10页 数学学报(英文版)
基金 Supported by Beijing Natural Science Foundation(Grant No.1092003) Beijing Educational Committee Foundation(Grant No.PHR201008022) National Natural Science Foundation of China(Grant No.11271038)1)Corresponding author
关键词 Backward heat equation nonlinear wavelet method CONVERGENCE Backward heat equation, nonlinear wavelet method, convergence
分类号 O175 [理学—基础数学] O551.3 [理学—热学与物质分子运动论]
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参考文献13

  • 1Tautenhahn, U.: Optimality for ill-posed problems under general source conditions. Numer. Funct. Anal. Optim., 19, 377-398 (1998).
  • 2Fu, C. L. , Xiong, X. T., Qian, Z.: Fourier regulation for a backward heat equation. J. Math. Anal. Appl., 331, 472-480 (2007).
  • 3Cheng, W., Fu, C. L.: A spectral method for an axisymmetric backward heat equation. Inverse Probl. Sci. and Eng., 17(8), 1085-1093 (2009).
  • 4Yang, F., P-ha, C. L.: The method of simplified Tikhonov regularization for dealing with the inverse time- dependent heat source problem. Comput. Math. Appl., 60, 1228-1236 (2010).
  • 5Regifiska, T.: Application of wavelet shrinkage to solving the sideways heat equation. BIT, 41(5), 1101- 1110 (2001).
  • 6Regifiska, T., Eldan, L.: Solving the sideways heat equation by a wavelet-Calerkin method. Inverse Problem, 13, 1093-1106 (1997).
  • 7Regifiska, T., Eldan, L.: Stability and convergence of wavelet-Galerkin method for the sideways heat equation. J. Inverse Ill-Posed Probl., 8, 31-49 (2000).
  • 8Eldin, L., Berntsson, F., Regifiska, T.: Wavelet and Fourier methods for solving the sideways heat equation. SIAM J. Sci. Comput., 21(6), 2187-2205 (2000).
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Acta Mathematica Sinica,English Series
2013年 第5期

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