In the present paper, we investigate the structural and geometric properties of the non-absolute type sequence space ℓ_p^λ. Our primary novel contribution lies in demonstrating that the natural norm on its β-dual coincides with the dual norm of ℓ_p^λ. We then investigate geometric properties of the space and prove that ℓ_p^λ inherits uniform convexity and uniform smoothness from the classical space ℓ_p for 1 < p < ∞, while these properties fail in the case p = 1. Finally, by considering finite-dimensional truncations, we interpret the dual norm geometrically through the Wulff construction. This yields a visualization of the norm unit sphere as a Wulff shape and shows that geometric features of the resulting shape reflect the convexity and smoothness properties of the underlying sequence space.

$\beta$-dual; Dual norm; Wulff shape; Sequence space; Geometric properties

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