Liviu Marin

Education:

1989-1994: B.Sc. in Mathematics-Mechanics, Faculty of Mathematics and Computer Science, University of Bucharest, Romania

1994-1995: M.Sc. (Diploma for Advanced Studies) in Continuum Mechanics, Faculty of Mathematics and Computer Science, University of Bucharest, Romania

1996-1998: M.Sc. in Mathematics for Industry, Department of Applied Mathematics, University of Kaiserslautern, Germany

1999-2002: Ph.D. in Applied Mathematics, Department of Applied Mathematics, University of Leeds, UK

2014: Habilitation in Mathematics, University of Bucharest, Faculty of Mathematics and Computer Science, Department of Mathematics, Bucharest, Romania

Employment History:

1994-1998: Research Assistant, National Institute for Research and Development in Microtechnologies, Romania

2002-2005: Research Fellow, University of Leeds, School of Earth & Environment, Environment Centre, UK

2005-2007: Research Fellow, University of Nottingham, School of Mechanical, Materials and Manufacturing Engineering, UK

2008-2009: Senior Research Fellow III, Institute of Solid Mechanics, Romanian Academy, Romania

2009-2010: Senior Research Fellow III (part-time), Centre for Continuum Mechanics, Faculty of Mathematics and Computer Science, University of Bucharest, Romania

2010-2013: Senior Research Fellow II, Institute of Solid Mechanics, Romanian Academy, Romania

2010-2013: Senior Research Fellow II (part-time), Centre for Continuum Mechanics, Faculty of Mathematics and Computer Science, University of Bucharest, Romania

2013-present: Professor, Faculty of Mathematics and Computer Science, University of Bucharest, Romania

2013-present: Senior Research Fellow I (part-time), Institute of Solid Mechanics, Romanian Academy, Romania

University of Bucharest, Bucharest, .

E-mail: trimite un mesaj.

Pagina web a instituţiei: http://fmi.unibuc.ro/ro
Pagina web personala: https://sites.google.com/site/marinliviu/home

Urmareste linkul ResearcherID pentru toate articolele cercetatorului: C-4726-2011. Tabelul detaliat al articolelor este in josul paginii.

Nascut(a) in: 1969

Interese: Computational Mechanics; Inverse Problems; Regularization; Boundary Integral Equations; Boundary Element Methods; Meshless Methods; Finite Element Methods.

Publicații selectate:

* A. Karageorghis, D. Lesnic, L. Marin, The method of fundamental solutions for the detection of rigid inclusions and cavities in plane linear elastic bodies, Computers & Structures, 106-107, 2012.

* L. Marin, A relaxation method of an alternating iterative MFS algorithm for the Cauchy problem associated with the two-dimensional modified Helmholtz equation, Numerical Methods for Partial Differential Equation, 28(3), 2012.

* M.R. Hematiyan, M. Mohammadi, L. Marin, A. Khosravifard, Boundary element analysis of uncoupled transient thermo-elastic problems with time- and space-dependent heat sources, Applied Mathematics and Computation, 218(5), 2011.

* A. Khosravifard, M.R. Hematiyan, L. Marin, Nonlinear heat conduction transient analysis of functionally graded materials in the presence of heat sources using an improved meshless radial point interpolation method, Applied Mathematical Modelling, 35(9), 2011.

* A. Karageorghis, D. Lesnic, L. Marin, A survey of applications of the MFS to inverse problems, Inverse Problems in Science and Engineering, 19(3), 2011.

* L. Marin, Relaxation procedures for an iterative MFS algorithm for two-dimensional steady-state isotropic heat conduction Cauchy problems, Engineering Analysis with Boundary Elements, 35(3), 2011.

* L. Marin, A. Karageorghis, D. Lesnic, The MFS for numerical boundary identification in two-dimensional harmonic problems, Engineering Analysis with Boundary Elements, 35(3), 2011.

* L. Marin, B.T. Johansson, A relaxation method of an alternating iterative algorithm for the Cauchy problem in linear isotropic elasticity, Computer Methods in Applied Mechanics and Engineering, 199(49-52), 2010.

* L. Marin, Stable boundary and internal data reconstruction in two-dimensional anisotropic heat conduction Cauchy problems using relaxation procedures for an iterative MFS algorithm, CMC: Computers, Materials & Continua, 17(3), 2010.

* L. Marin, B.T. Johansson, Relaxation procedures for an iterative MFS algorithm for the stable reconstruction of elastic fields from Cauchy data in two-dimensional isotropic linear elasticity, International Journal of Solids and Structures, 47(25-26), 2010.

* L. Marin, Regularized method of fundamental solutions for boundary identification in two-dimensional isotropic linear elasticity, International Journal of Solids and Structures, 47(24), 2010.

* L. Marin, L. Munteanu, Boundary reconstruction in two-dimensional steady state anisotropic heat conduction using a regularized meshless method, International Journal of Heat and Mass Transfer, 53(25-26), 2010.

* L. Marin, Reconstruction of boundary data in two-dimensional isotropic linear elasticity from Cauchy data using an iterative MFS algorithm, CMES: Computer Modeling in Engineering & Sciences, 60(3), 2010.

* M. Mohammadi, M.R. Hematiyan, L. Marin, Boundary element analysis of nonlinear heat conduction problems involving non-homogeneous and nonlinear heat sources using time-dependent fundamental solutions, Engineering Analysis with Boundary Elements, 34(7), 2010.

* B.T. Johansson, L. Marin, Relaxation of alternating iterative algorithms for the Cauchy problem associated with the modified Helmholtz equation, CMC: Computers, Materials & Continua, 13(2), 2010.

* L. Marin, An alternating iterative MFS algorithm for the Cauchy problem for the modified Helmholtz equation, Computational Mechanics, 45(6), 2010.

* L. Marin, Treatment of singularities in the method of fundamental solutions for two-dimensional Helmholtz-type equations, Applied Mathematical Modelling, 34(6), 2010.

* L. Marin, A meshless method for the stable solution of singular inverse problems for two-dimensional Helmholtz-type equations, Engineering Analysis with Boundary Elements, 34(3), 2010.

* L. Marin, An alternating iterative MFS algorithm for the Cauchy problem in two-dimensional anisotropic heat conduction, CMC: Computers, Materials & Continua, 12(1), 2009.

* L. Marin, A. Karageorghis, Regularized MFS-based boundary identification in two-dimensional Helmholtz-type equations, CMC: Computers, Materials & Continua, 10(3), 2009.

* L. Marin, An iterative MFS algorithm for the Cauchy problem associated with the Laplace equation, CMES: Computer Modeling in Engineering & Sciences, 48(2), 2009.

* L. Marin, Boundary reconstruction in two-dimensional functionally graded materials using a regularized MFS, CMES: Computer Modeling in Engineering & Sciences, 46(3), 2009.

* C. Cobos Sanchez, R.W. Bowtell, H. Power, P. Glover, L. Marin, A.A. Becker, I.A. Jones, Forward electric field calculation using BEM for time-varying magnetic field gradients and motion in strong static fields, Engineering Analysis with Boundary Elements, 33(8-9), 2009.

* L. Marin, Boundary element-minimal error method for the Cauchy problem associated with Helmholtz-type equations, Computational Mechanics, 44(2), 2009.

* L. Marin, The minimal error method for the Cauchy problem in linear elasticity. Numerical implementation for two-dimensional homogeneous isotropic linear elasticity, International Journal of Solids and Structures, 46(5), 2009.

* L. Marin, Stable MFS solution to singular direct and inverse problems associated with the Laplace equation subjected to noisy data, CMES: Computer Modeling in Engineering & Sciences, 37(3), 2008.

* L. Marin, The method of fundamental solutions for inverse problems associated with the steady-state heat conduction in the presence of sources, CMES: Computer Modeling in Engineering & Sciences, 30(2), 2008.

* L. Marin, H. Power, R.W. Bowtell, C. Cobos Sanchez, A.A. Becker, P. Glover, I.A. Jones, Numerical solution for an inverse MRI problem using a regularized boundary element method, Engineering Analysis with Boundary Elements, 32(8), 2008.

* H. Power, L. Marin , Application of the BEM to electromagnetic problems, Engineering Analysis with Boundary Elements, 32(8), 2008.

* B. Jin, L. Marin, The plane wave method for inverse problems associated with Helmholtz-type equations, Engineering Analysis with Boundary Elements, 32(3), 2008.

* L. Marin, H. Power, R.W. Bowtell, C. Cobos Sanchez, A.A. Becker, P. Glover, I.A. Jones, Boundary element method for an inverse problem in magnetic resonance imaging gradient coils, CMES: Computer Modeling in Engineering & Sciences, 23(3), 2008.

* L. Marin, D. Lesnic, The method of fundamental solutions for nonlinear functionally graded materials, International Journal of Solids and Structures, 44(21), 2007.

* L. Comino, L. Marin, R. Gallego, An alternating iterative algorithm for the Cauchy problem in anisotropic elasticity, Engineering Analysis with Boundary Elements, 31(8), 2007.

* B. Jin, L. Marin, The method of fundamental solutions for inverse source problems associated with steady-state heat conduction, International Journal for Numerical Methods in Engineering, 69(8), 2007.

* T. Johansson, L. Marin, A procedure for the temperature reconstruction in corner domains from Cauchy data, Inverse Problems, 23(1), 2007.

* L. Marin, L. Elliott, P.J. Heggs, D.B. Ingham, D. Lesnic, X. Wen, Parameter identification in Helmholtz-type equations with a variable coefficient using a regularized DRBEM, Inverse Problems in Science and Engineering, 14(8), 2006.

* L. Marin, L. Elliott, P.J. Heggs, D.B. Ingham, D. Lesnic, X. Wen, Parameter identification in two-dimensional fins using the boundary element method, Numerical Heat Transfer, Part A: Applications, 50(4), 2006.

* L. Marin, Numerical boundary identification for Helmholtz-type equations, Computational Mechanics, 39(1), 2006.

* L. Marin, L. Elliott, P.J. Heggs, D.B. Ingham, D. Lesnic, X. Wen, Dual reciprocity boundary element method solution of the Cauchy problem for Helmholtz-type equations with variable coefficients, Journal of Sound and Vibration, 297(1-2), 2006.

* B. Jin, Y. Zheng, L. Marin, The method of fundamental solutions for inverse boundary value problems associated with the steady-state heat conduction in anisotropic media, International Journal for Numerical Methods in Engineering, 65(11), 2006.

* L. Marin, D. Lesnic, The method of fundamental solutions for inverse boundary value problems associated with the two-dimensional biharmonic equation, Mathematical and Computer Modelling, 42(3-4), 2005.

* L. Marin, Numerical solution of the Cauchy problem for steady-state heat transfer in two-dimensional functionally graded materials, International Journal of Solids and Structures, 42(15), 2005.

* L. Marin, A meshless method for solving the Cauchy problem in three-dimensional elastostatics, Computers & Mathematics With Applications, 50(1-2), 2005.

* L. Marin, Detection of cavities in Helmholtz-type equations using the boundary element method, Computer Methods in Applied Mechanics and Engineering, 194(36-38), 2005.

* L. Marin, L. Elliott, P.J. Heggs, D.B. Ingham, D. Lesnic, X. Wen, Two-dimensional thermal analysis of a polygonal fin with two tubes on a square pitch, International Journal of Heat and Mass Transfer, 48(14), 2005.

* L. Marin, A meshless method for the numerical solution of the Cauchy problem associated with three-dimensional Helmholtz-type equations, Applied Mathematics and Computation, 165(2), 2005.

* L. Marin, D. Lesnic, Boundary element-Landweber method for the Cauchy problem in linear elasticity, IMA Journal of Applied Mathematics, 70(2), 2005.

* L. Marin, D. Lesnic, The method of fundamental solutions for the Cauchy problem associated with two-dimensional Helmholtz-type equations, Computers & Structures, 83(4-5), 2005.

* L. Marin, D. Lesnic, V. Mantic, Treatment of singularities in Helmholtz-type equations using the boundary element method, Journal of Sound and Vibration, 278(1-2), 2004.

* L. Marin, L. Elliott, P.J. Heggs, D.B. Ingham, D. Lesnic, X. Wen, BEM solution for the Cauchy problem associated with Helmholtz-type equations by the Landweber method, Engineering Analysis with Boundary Elements, 28(9), 2004.

* L. Marin, L. Elliott, P.J. Heggs, D.B. Ingham, D. Lesnic, X. Wen, Comparison of regularization methods for solving the Cauchy problem associated with the Helmholtz equation, International Journal for Numerical Methods in Engineering, 60(11), 2004.

* L. Marin, D. Lesnic, The method of fundamental solutions for the Cauchy problem in two-dimensional linear elasticity, International Journal of Solids and Structures, 41(13), 2004.

* L. Marin, L. Elliott, P.J. Heggs, D.B. Ingham, D. Lesnic, X. Wen, Analysis of polygonal fins using the boundary element method, Applied Thermal Engineering, 24(8-9), 2004.

* L. Marin, L. Elliott, D.B. Ingham, D. Lesnic, The boundary element method for the numerical recovery of a circular inhomogeneity in an elliptic equation, Engineering Analysis with Boundary Elements, 28(4), 2004.

* L. Marin, L. Elliott, D.B. Ingham, D. Lesnic, Parameter identification in isotropic linear elasticity using the boundary element method, Engineering Analysis with Boundary Elements, 28(3), 2004.

* L. Marin, L. Elliott, P.J. Heggs, D.B. Ingham, D. Lesnic, X. Wen, Conjugate gradient-boundary element solution to the Cauchy problem for Helmholtz-type equations, Computational Mechanics, 31(3-4), 2003.

* L. Marin, L. Elliott, D.B. Ingham, D. Lesnic, Identification of material properties and cavities in two-dimensional linear elasticity, Computational Mechanics, 31(3-4), 2003.

* L. Marin, D. Lesnic, BEM first-order regularisation method in linear elasticity for boundary identification, Computer Methods in Applied Mechanics and Engineering, 192(16-18), 2003.

* L. Marin, L. Elliott, P.J. Heggs, D.B. Ingham, D. Lesnic, X. Wen, An alternating iterative algorithm for the Cauchy problem associated to the Helmholtz equation, Computer Methods in Applied Mechanics and Engineering, 192(5-6), 2003.

* L. Marin, L. Elliott, D.B. Ingham, D. Lesnic, Boundary element regularisation methods for solving the Cauchy problem in linear elasticity, Inverse Problems in Engineering, 10(4), 2002.

* L. Marin, L. Elliott, D.B. Ingham, D. Lesnic, An iterative boundary element algorithm for a singular Cauchy problem in linear elasticity, Computational Mechanics, 28(6), 2002.

* L. Marin, D. Lesnic, Boundary element solution for the Cauchy problem in linear elasticity using singular value decomposition, Computer Methods in Applied Mechanics and Engineering, 191(29-30), 2002.

* L. Marin, D. Lesnic, Regularized boundary element solution for an inverse boundary value problem in linear elasticity, Communications in Numerical Methods in Engineering, 18(11), 2002.

* L. Marin, D.N. Hào, D. Lesnic, Conjugate gradient-boundary element method for the Cauchy problem in elasticity, Quarterly Journal of Mechanics and Applied Mathematics, 55(2), 2002.

* L. Marin, L. Elliott, D.B. Ingham, D. Lesnic, Boundary element method for the Cauchy problem in linear elasticity, Engineering Analysis with Boundary Elements, 25(9), 2001.