## Progress in Industrial Mathematics at ECMI 2000Angelo M. Anile, Vincenzo Capasso, Antonio Greco Realizing the need of interaction between universities and research groups in industry, the European Consortium for Mathematics in Industry (ECMI) was founded in 1986 by mathematicians from ten European universities. Since then it has been continuously extending and now it involves about all Euro pean countries. The aims of ECMI are • To promote the use of mathematical models in industry. • To educate industrial mathematicians to meet the growing demand for such experts. • To operate on a European Scale. Mathematics, as the language of the sciences, has always played an im portant role in technology, and now is applied also to a variety of problems in commerce and the environment. European industry is increasingly becoming dependent on high technology and the need for mathematical expertise in both research and development can only grow. These new demands on mathematics have stimulated academic interest in Industrial Mathematics and many mathematical groups world-wide are committed to interaction with industry as part of their research activities. ECMI was founded with the intention of offering its collective knowledge and expertise to European Industry. The experience of ECMI members is that similar technical problems are encountered by different companies in different countries. It is also true that the same mathematical expertise may often be used in differing industrial applications. |

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### Contents

3 | |

16 | |

State of the Art Simulations of High Intense Particle Beams | 28 |

Effective BuckleyLeverett Equations by Homogenization | 42 |

Finance | 53 |

TwoScale Asymptotics for Stochastic Volatility Models | 63 |

Fuel Pipelines | 72 |

Recent Results in the Dynamics of Liquid Dispersions | 80 |

Asymptotic Methods for AirFlow Around Fibers | 301 |

E M Lee H Ockendon | 308 |

Central Schemes for Balance Laws | 313 |

K A Lie S Noelle | 320 |

F Filbet L Pareschi | 326 |

Similarity and Numerical Analysis of a Singular Moving Boundary | 339 |

Quantum Kinetic Equation Including Phonon Scattering | 347 |

On a Variational Approach to the Time Evolution of the Mean Field | 358 |

Some New Results on the Flow of Waxy Crude Oils in a Loop | 85 |

Image Restoration Problems for NewGeneration Telescopes | 91 |

Multiwavelets and Image Processing | 105 |

ICT and Effective Learning | 113 |

E Bilotta P Pantano | 120 |

Evolutionary Music and Fitness Functions | 126 |

Integrating Active Study Tools | 140 |

Kinetic Transport in Semiconductor Devices | 155 |

TimeDepending Solutions to Spherical Harmonic Equations | 164 |

An Extended FluidDynamical Model Describing Electron Transport | 174 |

Modeling of Quantum Ballistic Transport in Electron Waveguide | 185 |

LiquidSolid Phase Transictions and Interfaces | 195 |

Computational Model for Solidification Process of a Binary Alloy | 204 |

Numerical Study for Solutal Convection in Liquid Alloy by Spectral | 210 |

Equipment and Process Modelling of Industrial Crystal Growth | 218 |

Optimal Design of ThermoElectrical Flanges | 225 |

K Laevsky R M M Mattheij | 232 |

Status | 239 |

Energy Transport Model for Silicon Semiconductors Derived from | 246 |

Neural Networks with Higher Level Architecture for Bipolar Device | 252 |

Multirate Methods in Electrical Circuit Simulation | 258 |

An Accelerated PoincaréMap Method for Finding the PSS of | 266 |

Iterative Solution of Linear Systems in Circuit Simulation | 272 |

Models of Highway Traffic | 279 |

Discovering of Synchronized Flow as a New Traffic Phase and Related | 286 |

Gipps Model of Highway Traffic | 293 |

Wavefronts in Photoexcited Semiconductor Superlattices | 365 |

Nonlinear Transport in Semiconductor Superlattices | 372 |

Periodic Recycling and Motion of Wavefronts in a Model of the Gunn | 386 |

Polymers | 399 |

Modeling and Simulating the Crystallization of Polymers | 408 |

FlowInduced Deformation of Drops | 415 |

Postponing Polymer Processing Instabilities | 427 |

Thermally Induced Flow Front Instabilities in Injection Moulding | 433 |

Some Applications of Fluid and Gas Dynamics | 439 |

Towards a Twodimensional Modelling Element in River Flow | 446 |

Teaching of Industrial Mathematics at ECMI Centers | 457 |

Solving Industrial Problems Learning by Doing | 466 |

Recent Developments and Open Problems in Composites Materials | 473 |

NonIsothermal Mathematical Model of Wood and Paper Drying | 488 |

Some Mathematical Problems in the Designing of Subsoil Decontami | 506 |

Production Planning in a Multiproduct Batch Plant Under Uncertainty | 526 |

Coupled Frequencies of a Fluid in Closed Circular Cylindrical Rigid | 544 |

Optimal Shape Design and Optimal Sizing of Industrial Components | 560 |

Mathematical Modelling of LDSteelmaking Process | 577 |

A New Finite Difference Scheme for the Boltzmann Poisson System | 592 |

A Penalty Scheme for Solving American Option Problems | 608 |

Inverse Modeling of Sedimentary Basins | 625 |

F Raciti E Venturino | 638 |

An Asymptotic Method for a Conjugate Heat Transfer Problem | 651 |

Relations Between the MotionResponses Caused by Fixed and Moving | 657 |

### Other editions - View all

Progress in Industrial Mathematics at ECMI 2000 Angelo M. Anile,Vincenzo Capasso,Antonio Greco Limited preview - 2002 |

Progress in Industrial Mathematics at ECMI 2000 Angelo M. Anile,Vincenzo Capasso,Antonio Greco No preview available - 2014 |

Progress in Industrial Mathematics at ECMI 2000 Angelo M. Anile,Vincenzo Capasso,Antonio Greco No preview available - 2010 |

### Common terms and phrases

2DEG agent algorithm analysis applied approach approximation assume asymptotic behaviour Boltzmann Boltzmann equation boundary conditions calculated cellular automata circuit coefficients collision components computational conservation laws consider constant convection crystal defined denote density depends derived described devices differential equations diffusion discrete distribution function domain dynamics ECMI effects electric field electron energy Euler equations evolution experimental finite flow fluid flux frequency given grid heat industry initial input integral interaction interface introduced inverse kinetic lattice Boltzmann method linear lithosphere macroscopic Math mathematical model matrix melt method momentum multiwavelet nonlinear obtained optimization oscillations parameters particle phase phonon Phys physical polymer present problem scale scheme semiconductor sequence shallow water equations simulation solve solver space step stochastic stochastic volatility techniques temperature theory Tikhonov regularization tion traffic transport turbidity current values variables vector velocity viscoelastic