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Project
Factorization theorems for smooth vectors of Lie group representations
The goal of this project is to make significant progress in factorization theory for smooth vectors of large classes of representations of real Lie groups on locally convex spaces. Our chief aim is to settle a number of conjectures in the area by showing strong Dixmier-Malliavin type theorems for smooth and analytic vectors.
Date:1 Jan 2021 → 31 Dec 2024
Keywords:Translation-invarant spaces of smooth functions, Representations of Lie groups on locally convex spaces, Dixmier-Malliavin type factorization theorems
Disciplines:Functions of a complex variable, Topological groups, Lie groups, Functional analysis, Abstract harmonic analysis