Operators on the Fourier Algebra with Weakly Compact Extensions
Canadian journal of mathematics, Tome 26 (1974) no. 2, pp. 450-454

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

We let G denote an infinite compact group, and Ĝ its dual. We use the notation of our book [3, Chapters 7 and 8]. Recall that A(G) denotes the Fourier algebra of G (an algebra of continuous functions on G), and denotes its dual space under the pairing 〈f, φ〉 , (f ∊ A (G), φ ∊ ). Further, note is identified with the C*-algebra of bounded operators on L 2(G) commuting with left translation. The module action of A (G) on is defined by the following: for f ∊ A (G), φ ∊ , f · φ ∊ by
Dunkl, Charles F.; Ramirez, Donald E. Operators on the Fourier Algebra with Weakly Compact Extensions. Canadian journal of mathematics, Tome 26 (1974) no. 2, pp. 450-454. doi: 10.4153/CJM-1974-044-6
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