Project-team AROMATH AlgebRa, geOmetry, Modeling and AlgoriTHms Geometry is involved in many domains (manufacturing, simulation, communication, virtual world ...)...
Project-team EPIONE E-Patient: Images, Data & MOdels for e-MediciNE Description Our long-term goal is to contribute to the development of what we call the e-patient...
Project-team MATHNEURO Mathematics for Neuroscience The research of the MathNeuro team focuses on the applications of multi-scale dynamics to...
Project-team LEMON Littoral Environment: M0dels and Numerics LEMON is a research team between Inria Sophia-Antipolis Méditerranée , Hydrosciences Montpellier...
Project-team STAMP Safety Techniques based on Formalized Mathematical Proofs The STAMP project-team studies the formal verification of algorithms and mathematical results using...
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 COATI Combinatorics, Optimization and Algorithms for Telecommunications COATI's main objective is to develop algorithmic methods and tools, with particular emphasis on the...
Project-team MORPHEME Morphologie et Images The scientific objectives of MORPHEME are to characterize and model the development and the...
Project-team WIMMICS Web-Instrumented Man-Machine Interactions, Communities and Semantics The web is no longer the simple documentary system built on a simple protocol (HTTP), a simple...
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 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 EVERGREEN Earth obserVation and machine lEarning foR aGRo-Environmental challENges The EVERGREEN team actively works on the design and implementation of cutting-edge machine learning...
Project-team MCTAO Mathematics for Control, Transport and Applications Our goal is to develop methods in geometric control theory for nonlinear systems, mostly finite...
Project-team NEO Network Engineering and Operations The team is positioned at the intersection of Operations Research and Network Science. By using the...