Sort by
Refine Your Search
-
Listed
-
Category
-
Country
-
Program
-
Field
-
computational model combining ODE-based fragmentation and PDE-based additive leaching processes. • Incorporate chemical reaction modules to simulate transformation product formation and redistribution during
-
in the analysis of nonlinear time-dependent PDEs and Operator Theory/Spectral Theory. Additional expertise in rigorous computer assisted methods (e.g. interval arithmetic) is a plus. Required
-
this Doctoral project, you will study the mathematics of general relativity. This includes investigations of quasi-linear PDE systems in strongly curved geometries. Of particular interest are problems related
-
, such as the Manin-Peyre conjecture, concern Diophantine equations. Even certain questions in harmonic analysis and PDE can be understood as Diophantine problems. This project will use analytic techniques
-
of Education (PDE) requirements for special education courses and certificate programs. Experience: The preferred candidates will demonstrate a record of teaching, understanding of current special education
-
research community. The position is based in the division for Analysis, Algebra, and Dynamical Systems (LTH). The postdoctoral position is connected to the study of partial differential equations (PDEs) in
-
account of the history of geometric mechanics is given in these slides: https://klasmodin.github.io/assets/pdf/modin-geometric-mechanics-lund-2023.pdf More posts related to our research are available here
-
, Okinawa 904-2211, Japan [map ] Subject Area: Analysis and Partial Differential Equations (PDE) Appl Deadline: 2026/02/28 11:59PM * (posted 2025/08/20, listed until 2026/02/28) Position Description: Apply
-
areas of stochastic PDEs / probabilistic aspects of QFT. The precise research topic(s) will be discussed with the successful candidate depending on their background and affinities. There will also be
-
investigations of quasi-linear PDE systems in strongly curved geometries. Of particular interest are problems related to black holes, their stability, uniqueness, decay of fields around them, details about their