Stepwise Square Integrability for Nilradicals of Parabolic Subgroups and Maximal Amenable Subgroups
zbMath1396.22005arXiv1605.06191MaRDI QIDQ4604073
Publication date: 23 February 2018
Full work available at URL: https://arxiv.org/abs/1605.06191
parabolic subgroupsPlancherel formulaPfaffiannilpotent Lie groupsFourier inversion formulainfinite dimensional Lie groupsstepwise square integrable representations
Infinite-dimensional Lie groups and their Lie algebras: general properties (22E65) Nilpotent and solvable Lie groups (22E25) Representations of Lie and linear algebraic groups over real fields: analytic methods (22E45) Analysis on and representations of infinite-dimensional Lie groups (22E66)
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Cites Work
- Unnamed Item
- Stepwise square integrable representations of nilpotent Lie groups
- The Paley-Wiener theorem and limits of symmetric spaces
- Stepwise square integrable representations for locally nilpotent Lie groups
- Amenable subgroups of semi-simple groups and proximal flows
- Representations of \(AF\)-algebras and of the group \(U(\infty)\)
- The Plancherel formula for parabolic subgroups of the classical groups
- Differentiable actions of compact connected classical groups. II
- Algèbres quasi-unitaires
- The Plancherel Formula for Minimal Parabolic Subgroups
- Extension of Symmetric Spaces and Restriction of Weyl Groups and Invariant Polynomials
- Infinite Dimensional Multiplicity Free Spaces II: Limits of Commutative Nilmanifolds
- Introduction to the Schwartz Space of T\G
- UNITARY REPRESENTATIONS OF NILPOTENT LIE GROUPS
- Canonical Semi-Invariants and the Plancherel Formula for Parabolic Groups
- Square Integrable Representations of Nilpotent Groups
- Principal series representations of infinite-dimensional Lie groups, I: Minimal parabolic subgroups
- The plancherel formula for group extensions
- On a class of KMS states for the unitary group \(U(\infty)\)
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