Applied and Industrial Mathematics Venice - 1, 1989

Applied and Industrial Mathematics Venice - 1, 1989 / edited by Renato Spigler.

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Bibliographic Details
Corporate Author: SpringerLink (Online service)
Other Authors: Spigler, Renato (Editor)
Format: eBook
Language:English
Published: Dordrecht : Springer Netherlands : Imprint: Springer, 1991.
Edition:1st ed. 1991.
Series:Mathematics and Its Applications ; 56
Springer eBook Collection.
Subjects:
Mathematical models.
Mathematical analysis.
Analysis (Mathematics).
Applied mathematics.
Engineering mathematics.
Numerical analysis.
Electronic resources (E-books)
Online Access:Click to view e-book
Holy Cross Note:Loaded electronically.
Electronic access restricted to members of the Holy Cross Community.
Table of Contents:
  • I: Invited Papers
  • - C. Cercignani, “Physical Problems and Rigorous Results in Kinetic Theory
  • - A. Chorin, “Statistical Mechanics of Vortex Filaments” (abstract)
  • - Feng Kang, “The Hamiltonian Way for Computing Hamiltonian Dynamics”
  • - C. W. Gear (with Fen-Lien Juang), “The Speed of Waveform Methods for ODEs”
  • - J. B. Keller, “Diffusively Coupled Dynamical Systems”
  • - P. D. Lax, “Deterministic Turbulence” (extended abstract)
  • - J. L. Lions, “Exact Controllability for Distributed Systems. Some Trends and Some Problems”
  • - V. P. Maslov, “Beginning of Weakly Anisotropic Turbulence”
  • - S. K. Mitter, “Markov Random Fields, Stochastic Quantization and Image Analysis”
  • - H. Neunzert (with F. Gropengießer and J. Struckmeier),. “Computational Methods for the Boltzmann equation”
  • - J. R. Ockendon, “A Class of Moving Boundary Problems Arising in Industry”
  • - M. Primicerio, “Systems with Non-Fading Memory Encountered in the Modellization of Industrial Problems”
  • - M. Pulvirenti, “A Stochastic Particle System Modelling the Broadwell Equation”
  • -A. Quarteroni “(with A. Valli), “Theory and Application of Steklov-Poincare Operators for Boundary-Value Problems”
  • - S. Rionero (with B. Straughan), “On the Problem of Natural Convection”
  • II: Selected Contributed Papers
  • 1. Mathematical Modelling in Fluid Mechanics
  • - J. A. Nohel, “Non-Newtonian Phenomena in Shear Flow”
  • - O. Pironneau (with C. Bernardi, M. O. Bristeau and M. G. Vallet), “Numerical Analysis for Compressible Viscous Isothermal Stationary Flows”
  • - E. G. Virga (with D. Roccato), “Drops of Nematic Liquid Crystal Floating on a Fluid”
  • 2. Nonlinear waves
  • - S. Venakides, “The Korteweg-de Vries Equation with Small Dispersion: Higher Order Lax-Levermore Theory”
  • - P. L. Christiansen, “Solitons in Optical Fibres”
  • 3. Wave Propagation in Random Media
  • - R. Burridge, “Waves in Finely Layered Media”
  • - B. S. White (with Balan Nair), “Stochastic Geometry and the Intensity of Random Waves”
  • - V. I. Klyatskin, “Plane Waves in Layered Random Media. The Role of Boundary Conditions”
  • 4. Transport Phenomena
  • - P. A. Markowich (with A. Arnold), “Quantum Transport Models for Semiconductors”
  • - G. C. Pomraning, “Particle Transport in Random Media”
  • 5. Inverse Problems in the Applied Sciences
  • - G. Alessandrini, “Determining Conductivity by Boundary Measurements, the Stability Issue”
  • - G. Caviglia (with A. Morro), “Scattering Problems for Acoustic Waves”
  • - W.L. Dunn (with A. M. Yacout and F. O’Foghludha), “The Use of Single-Scatter Models in Medical Radiation Applications”
  • 6. Mathematical Modelling of Industrial Problems
  • - Li Tatsien (with Tan Yongji, Pen Yuejun and Li Hailong)“Mathematical Methods for the SP Well-Logging”
  • - C.D. Hill (with P. Susskind and V. Giambalvo), “Effective Computation of the Symmetric Lens”
  • - L. Brusa, “Mathematical Modelling of Structural Industrial Problems: Methodologies and Algorithms”
  • Author Index.

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