In mathematics, the Atlas of Lie Groups and Representations is a project to solve the problem of the unitary dual for real reductive Lie groups. Euclid, Greek mathematician, 3rd century BC, as imagined by by Raphael in this detail from The School of Athens. ... In mathematics, a unitary representation of a group G is a linear representation π of G on a complex Hilbert space V such that π(g) is a unitary operator for every g ∈ G. The general theory is well-developed in case G is a locally compact (Hausdorff) topological... In mathematics, a reductive group is an algebraic group G such that the unipotent radical of the identity component of G is trivial. ... In mathematics, a Lie group is a group whose elements can be continuously parametrized by real numbers, such as the rotation group, which can be parametrized by the Euler angles. ...

As of March 2007, the following mathematicians are listed as members:

• Jeffrey Adams
• Dan Barbasch
• Birne Binegar
• Bill Casselman
• Dan Ciubotaru
• Fokko du Cloux
• Alfred Noel
• Tatiana Howard
• Alessandra Pantano
• Annegret Paul
• Siddhartha Sahi
• Susana Salamanca
• John Stembridge
• Peter Trapa
• Marc van Leeuwen
• David Vogan
• Wai-Ling Yee
• Jiu-Kang Yu

External links

• Atlas web page