The solvable Lie group N_(6,28): an example of an almost C₀(mathcal{K})-C*-algebra

Motivated by the description of the C*-algebra of the affine automorphism group $N_{6,28}$ of the Siegel upper half-plane of degree 2 as an algebra of operator fields defined over the unitary dual $\widehat{N_{6,28}}$ of the group, we introduce a family of C*-algebras, which we call almost $C_0(\mathcal{K})$, and we show that the C*-algebra of the group $N_{6,28}$ belongs to this class.