Mathematics – Representation Theory
Scientific paper
2011-09-26
Mathematics
Representation Theory
51 pages
Scientific paper
We obtain necessary and sufficient conditions for the admissible vectors of a new unitary non irreducible representation $U$. The group $G$ is an arbitrary semidirect product whose normal factor $A$ is abelian and whose homogeneous factor $H$ is a locally compact second countable group acting on a Riemannian manifold $M$. The key ingredient in the construction of $U$ is a $C^1$ intertwining map between the actions of $H$ on the dual group $\hat A$ and on $M$. The representation $U$ generalizes the restriction of the metaplectic representation to triangular subgroups of $Sp(d,\R)$, whence the name "mock metaplectic". For simplicity, we content ourselves with the case where $A=\R^n$ and $M=\R^d$. The main technical point is the decomposition of $U$ as direct integral of its irreducible components. This theory is motivated by some recent developments in signal analysis, notably shearlets. Many related examples are discussed.
Mari Filippo de
Vito Ernesto de
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