A new general filter regularization method for Cauchy problems for elliptic equations with a locally Lipschitz nonlinear source

Up to now, studies on the semi-linear Cauchy problem for elliptic partial differential equations needed to assume that the source term present in the governing equation is a global Lipschitz function. The current paper is the first investigation to not only the more general but also the more practical case of interest when the source term is only a local Lipschitz function. In such a situation, the methods of solution from the previous studies with a global Lipschitz source term are not directly applicable and therefore, novel ideas and techniques need to be developed to tackle the local Lipschitz nonlinearity. This locally Lipschitz source arises in many applications of great physical interest governed by, for example, the sine-Gordon, Lane–Emden, Allen–Cahn and Liouville equations. The inverse problem is severely ill-posed in the sense of Hadamard by violating the continuous dependence upon the input Cauchy data. Therefore, in order to obtain a stable solution we consider theoretical aspects of regularization of the problem by a new generalized filter method. Under some priori assumptions on the exact solution, we prove and obtain rigorously convergence estimates.

[1]  A. Kirsch An Introduction to the Mathematical Theory of Inverse Problems , 1996, Applied Mathematical Sciences.

[2]  Palghat A. Ramachandran,et al.  A Particular Solution Trefftz Method for Non-linear Poisson Problems in Heat and Mass Transfer , 1999 .

[3]  Vladimir Maz’ya,et al.  An iterative method for solving the Cauchy problem for elliptic equations , 1991 .

[4]  Athanassios S. Fokas,et al.  The Dirichlet-to-Neumann map for the elliptic sine-Gordon equation , 2012 .

[5]  A. Nachaoui,et al.  Convergence analysis for finite element approximation to an inverse Cauchy problem , 2006 .

[6]  Ting Wei,et al.  A Fourier truncated regularization method for a Cauchy problem of a semi-linear elliptic equation , 2014 .

[7]  Nguyen Van Duc,et al.  A non-local boundary value problem method for the Cauchy problem for elliptic equations , 2009 .

[8]  Teresa Regińska,et al.  Approximate solution of a Cauchy problem for the Helmholtz equation , 2006 .

[9]  Palghat A. Ramachandran,et al.  Osculatory interpolation in the method of fundamental solution for nonlinear Poisson problems , 2001 .

[10]  Jérémi Dardé,et al.  About stability and regularization of ill-posed elliptic Cauchy problems: the case of Lipschitz domains , 2010 .

[11]  A. Shlapunov The cauchy problem for laplace's equation , 1992 .

[12]  Chao-Jiang Xu,et al.  Ultra-analytic effect of Cauchy problem for a class of kinetic equations , 2009, 0903.3703.

[13]  W. Mccrea An Introduction to the Study of Stellar Structure , 1939, Nature.

[14]  Luca Rondi,et al.  The stability for the Cauchy problem for elliptic equations , 2009, 0907.2882.

[15]  A stability estimate for an elliptic problem , 2004 .

[17]  E. S. Gutshabash,et al.  Boundary-value problem for the two-dimensional elliptic sine-Gordon equation and its application to the theory of the stationary Josephson effect , 1994 .

[18]  Huy Tuan Nguyen,et al.  Some remarks on a modified Helmholtz equation with inhomogeneous source , 2013 .

[19]  Michael V. Klibanov,et al.  A computational quasi-reversiblility method for Cauchy problems for Laplace's equation , 1991 .

[20]  Chu-Li Fu,et al.  The Fourier regularization for solving the Cauchy problem for the Helmholtz equation , 2009 .

[21]  Pham Hoang Quan,et al.  A note on a Cauchy problem for the Laplace equation: Regularization and error estimates , 2010, Appl. Math. Comput..

[22]  Ting Wei,et al.  Some filter regularization methods for a backward heat conduction problem , 2011, Appl. Math. Comput..

[23]  Ai-Lin Qian,et al.  On a quasi-reversibility regularization method for a Cauchy problem of the Helmholtz equation , 2010, J. Comput. Appl. Math..

[24]  Chu-Li Fu,et al.  Two regularization methods for a Cauchy problem for the Laplace equation , 2008 .

[25]  U. Tautenhahn,et al.  Conditional Stability Estimates and Regularization with Applications to Cauchy Problems for the Helmholtz Equation , 2009 .

[26]  S. Kabanikhin,et al.  Optimizational method for solving the Cauchy problem for an elliptic equation , 1995 .

[27]  Van Thinh Nguyen,et al.  A general filter regularization method to solve the three dimensional Cauchy problem for inhomogeneous Helmholtz-type equations: Theory and numerical simulation , 2014 .

[28]  Edriss S. Titi,et al.  The Navier-Stokes equations on the rotating 2-D sphere: Gevrey regularity and asymptotic degrees of freedom , 1999 .

[29]  Fredrik Berntsson,et al.  Numerical solution of a Cauchy problem for the Laplace equation , 2001 .

[30]  Xiang-Tuan Xiong,et al.  Fourth-order modified method for the Cauchy problem for the Laplace equation , 2006 .

[31]  W. Flórez,et al.  Extending The Local Radial Basis FunctionCollocation Methods For Solving Semi-linearPartial Differential Equations , 2009 .

[32]  L. Eldén,et al.  A quasi-boundary-value method for the Cauchy problem for elliptic equations with nonhomogeneous Neumann data , 2010 .

[33]  B. Johansson,et al.  A Variational Method and Approximations of a Cauchy Problem for Elliptic Equations , 2010 .

[34]  A. M. Denisov,et al.  Numerical methods for some inverse problems of heart electrophysiology , 2009 .