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dispersive partial differential equations. More specifically, they will work on the study of dark solitons for the logarithmic Gross–Pitaevskii equation. This research, led by Guillaume Ferriere, will be
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methods to fail and necessitates the development of new approaches. - main mission: Develop and analyze structured partial differential equations models to investigate the mechanisms driving bacterial
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differential equations (PDEs). While all applicants with a background in the analysis of PDEs will be considered, candidates with prior experience in theoretical physics, fluid mechanics, kinetic theory
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strong experience in the analysis of partial differential equations. The research topic of the postdoc will be on issues of long time dynamics and singularity formation, for waves, fluids, or reaction
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, Berlin 10099, Germany [map ] Subject Areas: Numeric Analysis, Partial Differential Equations Appl Deadline: 2026/04/11 04:59 AM UnitedKingdomTime (posted 2026/02/13 05:00 AM UnitedKingdomTime) Position
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Okinawa Institute of Science and Technology, Analysis and Partial Differential Equations Unit Position ID: 3260-POSTDOC [#26877] Position Title: Position Type: Postdoctoral Position Location: Onna
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, Lausanne 1015, Switzerland [map ] Subject Areas: • stochastic differential equations (SDEs); stochastic partial differential equations (SPDEs); stochastic processes on manifolds; multi-scale stochastic
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should hold a master in physics, materials science, or applied mathematics. Previous experience with the numerical solution of partial differential equations is mandatory. The post requires sound knowledge
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-dynamical or environmental systems Research on quantum and hybrid quantum–classical algorithms for solving partial differential equations Implementation, testing, and benchmarking of computational methods
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differential equations, spectral analysis, and scientific computing techniques. Proficiency in programming (MATLAB, Python, or equivalent) is required for developing and implementing numerical models. Experience