Project-team AUCTUS Robots for Humans at work The objective of the Auctus team is to imagine the collaborative robots of the future. The ability...
Project-team BIOVISION Biologically plausible Integrative mOdels of the Visual system : towards synergIstic Solutions for visually-Impaired people and artificial visiON Vision is a key function to sense the world and perform complex tasks, with a high sensitivity and a...
Project-team CAGIRE Computational AGility for internal flows sImulations and compaRisons with Experiments CAGIRE has been bringing together researchers from different backgrounds (turbulence modeling...
Project-team CARDAMOM Certified Adaptive discRete moDels for robust simulAtions of CoMplex flOws with Moving fronts From PDEs to certified computational models : this is the motto of CARDAMOM . We aim at providing a...
Project-team COMPO COMPutational pharmacology and clinical Oncology The ambition of the COMPO Inria-Inserm joint project-team is to develop novel mathematical models...
Project-team CONVECS Construction of verified concurrent systems CONVECS is a research team working on the formal modeling and verification of asynchronous...
Project-team DATASHAPE Understanding the shape of data DataShape is a research project in Topological Data Analysis ( TDA), a recent field whose aim is to...
Project-team DIANA Design, Implementation and Analysis of Networking Architectures The DIANA team conducts research in the domain of networking, with an emphasis on designing...
Project-team DYOGENE Dynamics of Geometric Networks The scientific focus of DYOGENE is on geometric network dynamics arising in communications...
Project-team EMPENN Neuroimaging: methods and applications Empenn ( means "Brain" in Breton language) ERL U1228 research team is jointly affiliated with Inria...
Project-team EPICURE Semantic analysis and compilation for secure execution environments The frequent announcements of yet another cybersecurity breach show that the security of the...
Project-team GAMBLE Geometric Algorithms & Models Beyond the Linear & Euclidean realm Classical computational geometry usually deals with linear objects in a Euclidean setting and when...
Project-team I4S Statistical Inference for Structural Health Monitoring The overall objective of this project-team is the development of Structural Health Monitoring (SHM)...
Project-team IDEFIX Inversion of Differential Equations For Imaging and physiX The research activity of our team is dedicated to the design, analysis and implementation of...