Decompositions of generalized wavelet representations

Abstract: Abstract. Let N be a simply connected, connected nilpotent Lie group which admits a uniform subgroup Γ. Let α be an automorphism of N defined by α (exp X) = exp AX. We assume that the linear action of A is diagonalizable and we do not assume that N is commutative. Let W be a unitary wavelet representation of the semi-direct product group. We obtain a decomposition of W into a direct integral of unitary representations. Moreover, we provide an explicit unitary operator intertwining the representations, a precis… Show more

“…If x = j 3 ℓ+1 u + k 3 ℓ+1 v + 1 6 z, for some (j, k) ∈ Z 2 , we need to consider the two possibilities for z. Either z = v or z = u + v. We note that 1 6 = 1 2 − 3 ℓ 3 ℓ+1 . So…”

“…Thus, it was interesting that its natural representation on L 2 (R n ) can be so nicely decomposed into irreducibles. See [1], [4], [5], and [6] for works partially motivated by the direct integral decomposition obtained in [14].…”

Decomposing the wavelet representation for shifts by wallpaper groups

“…If x = j 3 ℓ+1 u + k 3 ℓ+1 v + 1 6 z, for some (j, k) ∈ Z 2 , we need to consider the two possibilities for z. Either z = v or z = u + v. We note that 1 6 = 1 2 − 3 ℓ 3 ℓ+1 . So…”

“…Thus, it was interesting that its natural representation on L 2 (R n ) can be so nicely decomposed into irreducibles. See [1], [4], [5], and [6] for works partially motivated by the direct integral decomposition obtained in [14].…”

Decomposing the wavelet representation for shifts by wallpaper groups

Decomposing the Wavelet Representation for Shifts by Wallpaper Groups