Sort by
Refine Your Search
-
Listed
-
Category
-
Country
-
Program
-
Field
-
Environments and Materials in Poitiers (IC2MP, UMR CNRS 7285), within the Applied Quantum Chemistry group of the Catalysis and Unconventional Environments team (https://ic2mp.labo.univ-poitiers.fr/ ). Where
-
of an oxygen-graded titanium: Experimental and computational analyses. Materials & Design, 114801 [5] Jullien, M., Legros, M., Calvat, M., Stinville, J. C., & Texier, D. (2025). Quantifying the impact of
-
Programme? Not funded by a EU programme Is the Job related to staff position within a Research Infrastructure? No Offer Description The thesis will be carried out within the framework of the "Sciences
-
Research Framework Programme? Not funded by a EU programme Is the Job related to staff position within a Research Infrastructure? No Offer Description Candidates must hold a Master's degree or equivalent
-
modeling of polymeric, reinforced, and porous materials, with strong expertise in large deformations and numerical homogenization. Where to apply Website https://emploi.cnrs.fr/Candidat/Offre/UMR7649-JULDIA
-
funded through the EU Research Framework Programme? Not funded by a EU programme Is the Job related to staff position within a Research Infrastructure? No Offer Description The position described in
-
, particularly in the synthesis of promising materials and in spectroscopic techniques such as EPR (Electron Paramagnetic Resonance). Where to apply Website https://emploi.cnrs.fr/Candidat/Offre/UMR7314-FRESAU-017
-
funded through the EU Research Framework Programme? Not funded by a EU programme Is the Job related to staff position within a Research Infrastructure? No Offer Description The post-doc will aim to develop
-
Programme? Not funded by a EU programme Is the Job related to staff position within a Research Infrastructure? No Offer Description -Aromatic polymers are essential for the production of high-performance
-
criteria 1) Mastery of computational approaches of nonlinear propagation in optical fibers 2) Knowledge of nonlinear Schrödinger-type equations in nonlinear materials 3) Knowledge of multimodal propagation