Highly Oscillatory Problems: Computation, Theory and Application Cambridge University
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- Educação
High oscillation pervades a very wide range of applications: electromagnetics, fluid dynamics, molecular modelling, quantum chemistry, computerised tomography, plasma transport, celestial mechanics, medical imaging, signal processing. It has been addressed by a wide range of mathematical techniques, inter alia from asymptotic theory, harmonic analysis, theory of dynamical systems, theory of integrable systems and differential geometry. The computation of highly oscillatory problems spawned a large number of different numerical approaches and algorithms. The purpose of this programme is to foster research into different aspects of high oscillation – the theoretical, the computational and the applied – from a united standpoint and to promote the synergy implicit in an interdisciplinary activity.
Read more at: http://www.newton.ac.uk/programmes/HOP/
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Welcome by ESF Rapporteur
Sanz-Serna, C
Monday 13 September 2010, 08:50-09:00 -
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Existence of approximate solitary waves in simplectic algorithms of integration
Bambussi, D (University of Milan, IT)
Friday 17 September 2010, 11:30-12:30 -
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Coercivity of boundary integral operators in high frequency scattering
Spence, E (University of Bath, UK)
Friday 17 September 2010, 10:40-11:10 -
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Nonlinear hyperbolic conservation laws: diffusive-dispersive limits
Correia, JMC (Universidade de Évora, PT)
Friday 17 September 2010, 10:10-10:40 -
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Global and Blow-up patterns of the Cauchy problem of a fourth-order thin film equation
Alvarez-Caudevilla, P (Scuola Normale Superiore, IT)
Thursday 16 September 2010, 18:00-18:30 -
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An Effective Finite Difference Approach for Optical Beam Propagations
Sheng, Q (Baylor University, US)
Thursday 16 September 2010, 17:30-18:00