Sort by
Refine Your Search
-
Listed
-
Category
-
Country
- United States
- France
- Sweden
- Germany
- Norway
- Netherlands
- Spain
- United Kingdom
- Denmark
- China
- Italy
- Belgium
- Poland
- Portugal
- Austria
- Finland
- Japan
- Hong Kong
- Singapore
- United Arab Emirates
- Ireland
- Morocco
- Switzerland
- Canada
- Czech
- Luxembourg
- Australia
- Andorra
- Armenia
- Brazil
- Croatia
- Cyprus
- Estonia
- Greece
- India
- Lithuania
- Mexico
- Romania
- Slovakia
- Uzbekistan
- 30 more »
- « less
-
Program
-
Field
-
Synchronization of turbulent channel flow School of Mathematical and Physical Sciences PhD Research Project Self Funded Dr Yi Li, Dr Ashley Willis Application Deadline: Applications accepted all
-
23 Jan 2026 Job Information Organisation/Company Public Works Research Institute Research Field Engineering Architecture Technology Physics Mathematics Astronomy Geosciences Chemistry Researcher
-
Engineering » Simulation engineering Engineering » Mechanical engineering Engineering » Computer engineering Engineering » Industrial engineering Mathematics » Applied mathematics Mathematics » Computational
-
differentiated lessons, assignments and assessments. Utilize relevant technology and resources for optimal engagement and differentiation. Provide timely, appropriate, and actionable feedback to students
-
degrees of understanding in the mathematical / mathematized science. Application deadline: April 10 For updates, please also check https://sharedocs.huma-num.fr/wl/?id=vMOHFDMLNLGROARW83MOznG7tcKvBd2u
-
Optimal Transport for Optimization and Machine Learning School of Engineering Sciences at KTH Project description Third-cycle subject: Applied and computational mathematics The project focuses on applying
-
material platforms exhibiting time-varying responses. Using adjoint-based optimization and spatial structuring, to realize complex time-modulated medium dynamics with realistic material constraints and
-
is home to a consortium of postdoctoral fellows who provide modeling expertise for a wide range of projects as integral members of those research teams. Unit URL https://imci.uidaho.edu/ www.uidaho.edu
-
methods from metric analysis, the theory of currents, fractal geometry, and the Calculus of Variations. Where to apply Website https://lavoraconnoi.unitn.it/en/post-doc-assignments/department-mathematics-ca
-
methods from metric analysis, the theory of currents, fractal geometry, and the Calculus of Variations. Where to apply Website https://lavoraconnoi.unitn.it/en/research-assignments/department-mathematics-ca