User:Quantum Knot/Institut de mathématiques de Jussieu – Paris Rive Gauche

The Mathematics Institute of Jussieu–Paris Rive Gauche (Institut de mathématiques de Jussieu–Paris Rive Gauche, IMJ-PRG) is a French research institute in fundamental mathematics. It is a "mixed research unit", administratively supervised by the Centre national de la recherche scientifique, Sorbonne University, and Paris Diderot University. It is located in Paris, split between two campuses: Jussieu and Paris Rive Gauche.

More than 200 permanents researchers work at the institute, as well as more than 100 PhD students, and emeritus professors, postdocs, invited researchers, and ATERs, and support personnel.

The IMJ-PRG is the largest research unit linked to the doctoral school of mathematical sciences of Paris center (École doctorale de sciences mathématiques de Paris-Centre). It has its own journal, the Journal de l'institut de mathématiques de Jussieu, published by Cambridge University Press and covering all areas of fundamental mathematics.

Each year since 2001, the institute organizes an international summer school dedicated to a hot topic in current mathematical research.

History
The institute was created on January 1st, 1994, under the name Institut de mathématiques de Jussieu. It moved in 1999 to the Chevaleret location in Paris. In 2010, half of the institute moved back to Jussieu; in 2013, the other half moved to Paris Rive Gauche and the institute changed its name to the current one.

The institute is one of the founding members of the Research Federation in Mathematics of Paris Center (Fédération de recherche en mathématiques de Paris centre). Since 2007, it has been affiliated with the Mathematical Sciences Foundation of Paris (Fondation sciences mathématiques de Paris).

Themes
The research at the IMJ-PRG covers most of fundamental mathematics. It is subdivided in twelve team-projects: Algebraic Analysis; Complex Analysis and Geometry; Functional Analysis; Operator Algebra; Combinatorics and Optimization; Automorphic Forms; History of Mathematical Sciences; Geometry and Dynamics; Groups, Representations, and Geometry; Mathematical Logic; Number Theory; and Algebraic Topology and (Algebraic) Geometry.