¹-summability and Fourier series of B-splines with respect to their knots

Abstract We study the ¹ ℓ 1 -summability of functions in the d -dimensional torus { {T}}ᵈ T d and so-called ¹ ℓ 1 -invariant functions. Those are functions on the torus whose Fourier coefficients depend only on the ¹ ℓ 1 -norm of their indices. Such functions are characterized as divided differences that have ₁, , d cos θ 1, …, cos θ d as knots for (₁\, , d) { {T}}ᵈ (θ 1 …, θ d) ∈ T d. It leads us to consider the d -dimensional Fourier series of univariate B-splines with respect to its knots, which turns out to enjoy a simple bi-orthogonality that can be used to obtain an orthogonal series of the B-spline function.