Let
G be an exponential solvable Lie group, and π be an irreducible unitary representation of
G. Then by induction from a unitary character of a connected subgroup, π is realized in an
L2-space of functions on a homogeneous space. We are concerned with
C∞vectors of π from a viewpoint of rapidly decreasing properties. We show that the subspace \\mathcal{S}\\mathcal{E} consisting of vectors with a certain property of rapidly decreasing at infinity can be embedded as the space of the
C∞vectors in an extension of π to an exponential group including
G. Using the space \\mathcal{S}\\mathcal{E}, we also give a description of the space \\mathcal{A}\\mathcal{S}\\mathcal{E} related to Fourier transforms of
L1-functions on
G. We next obtain an explicit description of
C∞vectors for a special case. Furthermore, we consider a space of functions on
G with a similar rapidly decreasing property and show that it is the space of the
C∞vectors of an irreducible representation of a certain exponential solvable Lie group acting on
L2(
G).
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