Sort by
Refine Your Search
-
Listed
-
Category
-
Country
-
Program
-
Field
-
Application deadline: 30/04/2026 Research theme: Nuclear Engineering How to apply: https://uom.link/pgr-apply-2425 This 3.5-year PhD project is fully funded; home students are eligible to apply
-
combines state-of-the-art computational multiscale modelling (using DFT/TDDFT methods, collision theory, molecular dynamics, stochastic dynamics, Monte Carlo and analytical methods) and its thorough
-
amplitude estimation to improve extreme adaptive optics (XAO) performance of the Extremely Large Telescope’s future Planetary Camera and Spectrograph instrument Compare via Monte Carlo models viable wavefront
-
combines state-of-the-art computational multiscale modelling (using DFT/TDDFT methods, collision theory, molecular dynamics, stochastic dynamics, Monte Carlo and analytical methods) and its thorough
-
to determine these materials’ chemical structure and its effect on their properties. This project will use theoretical modelling (density-functional theory and Monte Carlo calculations) to investigate
-
: https://www.sheffield.ac.uk/postgraduate/phd/apply/english-language. How to apply: Please see this link for information on how to apply: https://www.sheffield.ac.uk/cbe/postgraduate/phd/how-apply. Please
-
the development and refinement of Monte Carlo simulation generators to accurately model neutrino interactions with various target materials. Detailed comparisons of these simulations to data from existing neutrino
-
theory/quantum Monte-Carlo. The starting date is in 2026 and is negotiable. We are looking for the researcher with experience in numerical lattice simulations in high energy physics and/or condensed matter
-
, including sequential Monte Carlo methods, Gaussian processes and Bayesian compressed sensing. Applicants from different backgrounds are encouraged to apply depending on the specific nature of the project
-
for uncertainty quantification, such as the multilevel Monte Carlo method. For access to experimental data to validate mathematical models for wave motion, it will be natural to interact with ongoing experimental