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Six leading experts lecture on a wide spectrum of recent results on the subject of the title, providing both a solid reference and deep insights on current research activity. Michael Cowling presents a survey of various interactions between representation theory and harmonic analysis on semisimple groups and symmetric spaces. Alain Valette recalls the concept of amenability and shows how it is used in the proof of rigidity results for lattices of semisimple Lie groups. Edward Frenkel describes the geometric Langlands correspondence for complex algebraic curves, concentrating on the ramified case where a finite number of regular singular points is allowed. Masaki Kashiwara studies the relationship between the representation theory of real semisimple Lie groups and the geometry of the flag manifolds associated with the corresponding complex algebraic groups. David Vogan deals with the problem of getting unitary representations out of those arising from complex analysis, such as minimal globalizations realized on Dolbeault cohomology with compact support. Nolan Wallach illustrates how representation theory is related to quantum computing, focusing on the study of qubit entanglement.
Complex Semisimple Lie Algebras Автор: Jean-Pierre Serre Год: 1987 |
Harmonic Analysis and Special Functions on Symmetric Spaces Автор: Gerrit Heckman Год: 1995 |
Complex semisimple Lie algebras Автор: Jean-Pierre Serre Год: 2001 |
Arithmetic Algebraic Geometry Автор: J. L. Colliot-Thelene, K. Kato, P. Vojta Год: 1994 |
An Introduction to Algebraic Geometry (Translations of Mathematical Monographs) Автор: Ueno K. Год: 1997 |