Finding unknown heat source in a nonlinear Cauchy problem by the Lie-group differential algebraic equations method

Abstract We consider an inverse heat source problem of a nonlinear heat conduction equation, for recovering an unknown space-dependent heat source under the Cauchy type boundary conditions. With the aid of measured initial temperature and initial heat flux, which are disturbanced by random noise causing measurement error, we develop a Lie-group differential algebraic equations (LGDAE) method to solve the resultant differential algebraic equations. The Lie-group numerical method has a stabilizing effect to retain the solution on the associated manifold, which thus naturally has a regularization effect to overcome the ill-posed property of the nonlinear inverse heat source problem. As a consequence, we can quickly recover the unknown heat source under noisy input data only through a few iterations. The initial data used in the recovery of heat source are assumed to be the analytic continuation ones which are not given arbitrarily. Certainly, the measured initial data belong to this type data.

[1]  T. Wei,et al.  Simultaneous determination for a space-dependent heat source and the initial data by the MFS , 2012 .

[2]  Chein-Shan Liu A two-stage LGSM to identify time-dependent heat source through an internal measurement of temperature , 2009 .

[3]  Chein-Shan Liu A self-adaptive LGSM to recover initial condition or heat source of one-dimensional heat conduction equation by using only minimal boundary thermal data , 2011 .

[4]  Chein-Shan Liu An iterative algorithm for identifying heat source by using a DQ and a Lie-group method , 2015 .

[5]  Chein-Shan Liu,et al.  A State Feedback Controller Used to Solve an Ill-posed Linear System by a GL(n, R) Iterative Algorithm , 2013 .

[6]  E. G. SAVATEEV,et al.  On problems of determining the source function in a parabolic equation , 1995 .

[7]  C. Fu,et al.  The method of fundamental solutions for the inverse heat source problem. , 2008 .

[8]  Mehdi Dehghan,et al.  Determination of a control function in three‐dimensional parabolic equations by Legendre pseudospectral method , 2012 .

[9]  Mehdi Dehghan,et al.  Computation of two time-dependent coefficients in a parabolic partial differential equation subject to additional specifications , 2010, Int. J. Comput. Math..

[10]  Weichung Yeih,et al.  A Three-Point BVP of Time-Dependent Inverse Heat Source Problems and Solving by a TSLGSM , 2009 .

[11]  Mehdi Dehghan,et al.  Solution of the differential algebraic equations via homotopy perturbation method and their engineering applications , 2010, Int. J. Comput. Math..

[12]  G. Stolz Numerical Solutions to an Inverse Problem of Heat Conduction for Simple Shapes , 1960 .

[13]  M. Arab,et al.  The method of fundamental solutions for the inverse space-dependent heat source problem , 2009 .

[14]  Mehdi Dehghan,et al.  The use of Chebyshev cardinal functions for the solution of a partial differential equation with an unknown time-dependent coefficient subject to an extra measurement , 2010, J. Comput. Appl. Math..

[15]  Mehdi Dehghan,et al.  High-order scheme for determination of a control parameter in an inverse problem from the over-specified data , 2010, Comput. Phys. Commun..

[16]  Mehdi Dehghan,et al.  Identification of a time‐dependent coefficient in a partial differential equation subject to an extra measurement , 2005 .

[17]  Daniel Lesnic,et al.  The boundary-element method for the determination of a heat source dependent on one variable , 2006 .

[18]  Chein-Shan Liu A new sliding control strategy for nonlinear system solved by the Lie-group differential algebraic equation method , 2014, Commun. Nonlinear Sci. Numer. Simul..

[19]  Mehdi Dehghan,et al.  The radial basis functions method for identifying an unknown parameter in a parabolic equation with overspecified data , 2007 .

[20]  Masahiro Yamamoto,et al.  A numerical method for solving the inverse heat conduction problem without initial value , 2010 .

[21]  Chung-Lun Kuo,et al.  The Modified Polynomial Expansion Method for Solving the Inverse Heat Source Problems , 2013 .

[22]  Mehdi Dehghan,et al.  Parameter determination in a partial differential equation from the overspecified data , 2005, Math. Comput. Model..

[23]  Chein-Shan Liu Solving Nonlinear Differential Algebraic Equations by an Implicit GL(n, R) Lie-Group Method , 2013, J. Appl. Math..

[24]  Leevan Ling,et al.  Identification of source locations in two-dimensional heat equations , 2006 .

[25]  Liu Yang,et al.  Optimization method for the inverse problem of reconstructing the source term in a parabolic equation , 2009, Math. Comput. Simul..

[26]  J. Dorroh,et al.  The Application of the Method of Quasi-reversibility to the Sideways Heat Equation , 1999 .

[27]  Chein-Shan Liu Lie-group differential algebraic equations method to recover heat source in a Cauchy problem with analytic continuation data , 2014 .

[28]  Chein-Shan Liu,et al.  A method of Lie-symmetry GL(n,R) for solving non-linear dynamical systems , 2013 .

[29]  Ji-Chuan Liu,et al.  A quasi-reversibility regularization method for an inverse heat conduction problem without initial data , 2013, Appl. Math. Comput..

[30]  P. N. Vabishchevich,et al.  Numerical solution of the inverse problem of reconstructing a distributed right-hand side of a parabolic equation , 2000 .

[31]  Chein-Shan Liu An Iterative Method to Recover the Heat Conductivity Function of a Nonlinear Heat Conduction Equation , 2014 .

[32]  B. Johansson,et al.  A procedure for determining a spacewise dependent heat source and the initial temperature , 2008 .

[33]  J. Cannon,et al.  Structural identification of an unknown source term in a heat equation , 1998 .