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KEYNOTE LECTURES |
|
|
M. BONNET (Ecole Polytechnique, France)
|
Small obstacle expansion in 3-D inverse scattering
|
B08 |
|
F. NATTERER (Muenster University, Germany)
|
Helmholtz problems and tomography
|
NOT IN PROCEEDINGS |
|
R. KRESS (Gottingen University, Germany)
|
A hybrid method in inverse obstacle scattering
|
NOT IN PROCEEDINGS |
|
D.A. MURIO (University of Cincinnati, USA)
|
Some inverse problems in systems of non-linear parabolic equations
|
M07 |
|
IDENTIFICATION PROBLEMS |
|
|
J. Bernal-Ponce, A. Fraguela-Collar, J.A. Gomez, J. Oseguera-Pena
and F. CASTILLO - ARANGUREN (ITESM-CEM,
Mexico) |
Identification of diffusion coefficients during
post-discharge |
B05 |
|
I. Braems, N. RAMDANI, A. Boudenne, M. Kiefer, L. Jaulin, L.
Ibos, E. Walter and Y. Candou
(Universite Paris XII, France) |
New set-membership techniques for parameter estimation in
presence of model uncertainty |
B09 |
|
Y. FAVENNEC, M. Girault, O. Balima and
D. Petit (University
of Poitiers, France) |
The model identification method coupled with the adloint
method for reduced model identification |
F04 |
|
A. FAVARON (Universita di
Milano, Italy) |
An identification problem arising in the theory of heat
conduction for materials with memory |
F03 |
|
S.L.
KUKREJA
(NASA, USA) |
A least absolute shrinkage and selection operator (LASSO)
for non-linear system identification |
NOT IN PROCEEDINGS |
|
D.
LESNIC
(University of Leeds, UK) |
An inverse coefficient identification problem in a dynamic
plate model |
L05 |
|
K. SHIROTA
(Ibaraki University, Japan) |
Numerical method for the identification of Lame coefficients
in linear elastic wave equations |
S06 |
|
N.C. ROBERTY
(Federal University of Rio de Janeiro, Brazil) |
Remarks on coefficient determination for the stationary
anisotropic transport equation |
R04 |
|
K. NAKATANI, S. Kubo, T. Sakagmi, D. Shiozawa and M.
Takagi
(Osaka University, Japan) |
An experimental study on identification of delamination in
composite material by electric potential CT method |
N02 |
|
A.V. NENAROKOMOV and O.M.
Alifanov (Moscow
Aviation Institute, Russia) |
Identification of lumped parameter systems |
N04 |
|
ALGORITHMS |
|
|
S.Suram, K.M. BRYDEN and D.A.
Ashlock
(Iowa State University, USA) |
An evolutionary algorithm to estimate unknown heat flux in a
one-dimensional inverse heat conduction problem |
S14 |
|
N.S. MERA, L. Elliott, D.B. Ingham and D.
Lesnic (University of
Leeds, UK) |
Comparison of a genetic algorithm and a gradient based
optimisation technique |
M04 |
|
A. MANIATTY and E. Park
(Rensselaer Polytechic Institute, USA) |
Finite element approach to inverse problems in dynamic
elastography |
M01 |
|
L.MARIN
(University of Nottingham, UK) |
The method of fundamental solutions for solving inverse
boundary value problems in elasticity |
M02 |
|
V. GONTAR and O. Grechko (Ben-Gurion
University of the Negev, Israel) |
Retrieving oscillatory solutions from systems of difference
equations |
G03 |
|
T. JOHANSSON
(University of Leeds, UK) |
An iterative method for reconstruction of temperature |
J04 |
|
T. KAMEDA and K. Saito
(University of Tsukuba, Japan) |
Newly developed stress increment measurement technique in
plastic region based on stress inversion theory |
K01 |
|
S. KUBO and M. Shiotsuki (Osaka
University, Japan) |
Estimation of unknown boundary values from boundary and
inside observations |
K07 |
|
V. MELICHER and M. SLODICKA (Ghent
University, Belgium) |
The recovery of boundary data for the eddy-current problem
on polyhedra: Numerical approach |
M03 |
|
S.S. PEREVERZYEV, R. Pinnau and
Siedow
(Kaiserslautern, Germany) |
Initial temperature reconstruction for a non-linear heat
equation: Application to radiative and conductive heat
transfer |
P02 |
S. CHAABANE, C. Elhechmi and M.
Jaoua (Tunis-Belvedere, Tunisia)
|
A robust recovery algorithm for the Robin inverse problem |
C02 |
|
OPTIMIZATION |
|
|
Y. HAITIAN, C. Guosheng, Z. Changliang, X. Qiwen and Z.
Zhifeng (University of
Dalian, China) |
Solving inverse couple-stress problems via an aggragate
function approach |
Y01 |
|
L. BLANK
(University of Regensburg, Germany) |
Analyical considerations of state estimation: Regularization
and error propogation |
B07 |
|
A.A. SKORDOS, C.Monroy Aceves and M.P.F.
Sutcliffe
(University of Cambridge, UK) |
Drape optimization in woven composite manufacturing |
S09 |
Z. OSTROWSKI, R.A. Bialeki and A.J. Kassab (Silesian
University of Technollogy, Poland)
|
Advances in application of proper orthogonal decomposition
in inverse problems |
O01 |
|
HEAT AND MASS TRANSFER |
|
|
M. LAZARD and P. Corvisier (Saint
Die, France) |
Inverse method for transient temperature estimation during
machining |
L02 |
|
S. Abboudi and E. ARTIOUKHINE (Belfort,
France) |
Simultaneous estimation of two boundary conditions in a
two-dimensional heat conduction problem |
A01 |
|
L. CAUDILL
(University of Richmond, USA) |
Thermal imaging in defect analysis |
NOT IN PROCEEDINGS |
|
DUNG DUC DOAN, P. Le Masson and Y. Yarny
(Gif sur Yvette, France) |
An inverse approach for the analysis of heat transfer at the
liquid-solid interface in arc welding |
NOT IN PROCEEDINGS |
|
R.P. Souto, S. STEPHANY, J.C. Becceneri, H.F. Campos Velho
and J. Silva Neto
(Instituto Nacional de Pesquias Espacias, Brazil) |
On the use of the ant colony system for radiative properties
estimation |
S10 |
|
J. FRANKEL (University of
Tennessee, USA) |
Stabilization of ill-posed problems through the data space:
Heat conduction theory |
F08 |
|
K.A. WOODBURY and A
Gupta
(The University of Alabama, USA) |
Effect of deterministic thermocouple errors (bias) on the
solution of the inverse heat conduction problem |
W03 |
|
A.J. Nowak and I. NOWAK (Silesian
University of Technology, Poland) |
2D and 3D inverse boundary and inverse geometry BEM solution
in continuous casting |
N06 |
|
J.V.
BECK
(Michigan University, USA) |
Filter solutions for the nonlinear inverse heat conduction
problem |
B03 |
|
SOURCE PROBLEMS |
|
|
J. Guo, P. LE MASSON, S. Rouquette, T. Loulou and E.
Artioukhine (Universite de Bretagne
Sud, France) |
Estimation of a source term in a 2-dimensional heat transfer
problem: Application to electron beam welding, Theoretical
and experimental validations |
G05 |
|
P.M.P. Silva, H.R.B. ORLANDE, M.J. Colaco, S. Panayiotis and
Dulikravich (Federal University of Rio
de Janeiro, Brazil) |
Estimation of spatially and time dependent source term in a
two-region problem |
S07 |
|
A. EL BADIA
(University of Technology of Compiegne, France) |
An inverse source problem in an elliptic equation from
measurements |
NOT IN PROCEEDINGS |
|
REGULARIZATION PROBLEMS |
|
|
F. BAUER (University of Gottingen, Germany) |
Automatic regularization for ill-posed problems with
stochastical noise estimate |
B02 |
|
L. COMINO, L. Marin and R. Gallego
(University of Granada, Spain) |
Regularized BEM solution for inverse boundary value problems
in anisotropic elasticity |
C05 |
|
U. Hamarik and T. RAUS (University of
Tartu, Estonia) |
On the choice of the regularization parameter in the case of
the approximately given noise level of data |
H01 |
|
A.J. SILVA NETO and N. Cella (Universidada
do Estado do Rio de Janeiro, Brazil) |
A regularized solution for the inverse problem of
photoacoustic spectroscopy |
S08 |
|
A.AZIMI, S. Kazemzadeh Hannani and B.
Farhanieh (Sharif
University of Technology, Iran) |
Application of multiblock method for solution of
two-dimensional transient inverse heat conduction problems |
A10 |
|
EXPERIMENTAL |
|
|
A. MOULTANOVSKY and M. Rekada (ACC
Climate Control, USA) |
Investigation of two-phase process of aluminium ingot
cooling by means of inverse heat transfer problem approach |
M06 |
|
N. DAOUAS and M. S. Radhouani
(Ecole Nationale d'Ingenieurs de Monastir, Tunisia) |
Experimental validation of an extended Kalman smoothing
technique for solving non-linear inverse heat conduction
problems |
D01 |
|
X. HAN, G.R. Liu and Z.H. Zhong
(Hunan University, P.R. China) |
Applications of computational inverse techniques to
automotive engineering |
H02 |
|
M. JANICKI and A. Napieralski
(Technical University of Lodz, Poland) |
Practical application of inverse problem solution algorithms
for water pollution measurements using ion selective
transistors |
J01 |
|
K. MOMOSE, K. Abe and H. Kimoto (Osaka
University, Japan) |
Inverse measurement of thermal boundary conditions using a
transient temperature history |
M05 |
|
A. TESTU, S. Didierjean, D. Maillet, C. Moyne and T.
Niass (University of Nancy, France) |
Experimentation of thermal dispersion coefficients in
granular media through which a gas is flowing:Porous versus
porous grain |
T01 |
|
M. Karkri, Y. JARNY and P. Mousseau
(University of Nantes, France) |
Estimation of the initial temperature profile in a channel
of an experimental extrusion die |
K03 |
|
G.H. Kanevce, L.P. KANEVCE, V.B. Mitrevski, G.S. Dulikravich
and H.R.B.
Orlande (St.
Kliment Ohridski University, Macedonia) |
Inverse approaches to drying of bodies with significant
shrinkage effects |
K02 |
|
G.G. SENARATNE, R.B. Keam, W.L. Sweatman
and G.C. Wake (Massey University, New
Zealand) |
Inverse methods for detection of internal objects using
microwave technology: with potential for breast screening |
S01 |
|
SCATTERING AND ACOUSTICS |
|
|
D. LEDUC, X. Chapeleau, C. Lupi, F. Lopez Geja, M. Douay, R.
Le Ny and C. Boisrobert (University of
Nantes, France) |
Comparison of two inverse scattering algorithms for the
experimental synthesis of fiber Bragg gratings |
L04 |
|
V.S.SEROV
(University of Oulu,Finland) |
Some inverse scattering problems for two-dimensional
Schrodinger operator |
S02 |
|
G. Bellizzi, A. CAPOZZOLI and
G.D'Elia (University of Naples, Italy) |
A new method to evaluate the minimum volume including
radiating/scattering systems by means of supporting cones |
B04 |
|
MATHEMATICAL THEORY |
|
|
DINH NHO HAO, Pham Hinh Hien and H.
Sahli (Hanoi Institute
of Mathematics, Vietnam) |
A Cauchy problem for an elliptic equation in a ship |
H03 |
|
M Jaoua, J. Leblond, M. MAHJOUB and J.R.
Partington
(Tunis-Belvedere, Tunisia) |
Numerical solution of a Cauchy problem in annular domains |
J03 |
|
A.L.Bukhgeim and A.A. BUKHGEIM
(Schlumberger, Norway) |
Inversion of the Radon transform, based on the theory of
A-Analytic functions with application to 3D inverse
kinematic problem with local data |
B11 |
|
A.S. Blagovestchenskii, Ya. V. Kurylev and V.
ZALIPAEV (Loughborough University, UK) |
Inverse problem of velocity reconstruction in weakly
lateral heterogeneous half-space |
B06 |
|
J.J. JANNO and J. Engelbracht (Tallinn
University of Technology, Estonia) |
Determining properties of non-linear microstructured
materials by means of solitary waves |
J02 |
|
L.X. YANG, H. Sahli and D.N. Hao
(Vrije Universiteit Brussels, Belgium) |
A hybrid diffusion model for 2D dense motion estimation |
Y02 |
|
G. GARCIA and V. Burenkov (University
of Cardiff, UK) |
On estimates for convolutions in anisotropic
Nikolīskii-Besov spaces |
NOT IN PROCEEDINGS |
|
A.
RAMM (Kansas State
University, USA) |
On inverse problems for the heat equation |
NOT IN PROCEEDINGS |
|
STATISTICS |
|
|
S. LASANEN and L. ROININEN
(University of Oulu, Finland) |
Statistical inversion with Green's priors |
L01 |
|
B.A. CATTLE, C. Goddard and R.M. West (University
of Leeds, UK) |
A high-level model and statistical estimation for passive
Gamma ray tomography of nuclear waste vaults |
C01 |
|
A.F. EMERY, E. Valenti and D. Bardot
(University of Washington, USA) |
Parameter estimation for noisy data and nuisance variables
using Bayesian interference |
E02 |
|
R.G. AYKROYD, B.A. Cattle and R.M.
West (University of Leeds, UK) |
Boundary element method and Markov chain Monte Carlo for
object location in electrical impedance tomography |
A09 |
|
EXPERIMENTAL AND HEAT TRANSFER |
|
O.M. Alifanov, S.A. Budnik and V.V.
MIKHAYLOV
(Moscow Aviation Insitute, Russia)
|
An experimental-computational system for the determination
of thermal properties of materials. Equipment,
instrumentation and methodical support of thermal testing |
A02 |
|
O.M. ALIFANOV, S.A. Budnik, V.V. Mikhaylov, A.V. Nenarokomov
and V.M.
Yudin
(Moscow Aviation Insitute, Russia) and O.M. ALIFANOV, Y.
Jarny, P.V. Prosuntsov and
G.A.Ivanov (Moscow
Aviation Institute, Russia) |
Complex identification of thermophysical properties of
anisotropic composite material and an
experimental-computational system for the determination of
thermal properties of materials. III Application for
spacecraft structures testing. |
A03/A04 |
|
B. LECAMPION and J. Gunning (CSIRO
Petroleum, Australia) |
Model selection in hydraulic fra |