Geodesic
On Multipliers with Unconditionally Converging Fourier Series
Canadian journal of mathematics, Tome 24 (1972) no. 3, pp. 477-484

Voir la notice de l'article provenant de la source Cambridge University Press

Let G be a compact abelian group with dual group Γ. For 1 ≦ p < ∞, 1 ≦ q < ∞, let denote the Banach space of complex-valued functions on Γ which are multipliers of type (p, q) and the subspace of compact multipliers.Grothendieck [10; 11] has proven that a function in LP (G), 1 ≦ p < 2, has an unconditionally converging Fourier series in LP (G) if and only if it is in L2 (G), and Helgason [12] has proven that the derived algebra of LP (G), 1 ≦ p < 2, is L2(G). Using these results we show in § 2 that a multiplier of type (p, g), 1 ≦ p ≦ 2, 1 ≦ q ≦ 2, has an unconditionally converging Fourier series in if and only if it is in (Theorem 2.1), and that, for 1 ≦ p ≦ q ≦ 2, the derived algebra of is (Theorem 2.2). Statements equivalent to the above are also given. 
Bachelis, Gregory F.; Pigno, Louis. On Multipliers with Unconditionally Converging Fourier Series. Canadian journal of mathematics, Tome 24 (1972) no. 3, pp. 477-484. doi: 10.4153/CJM-1972-040-6
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