Wyniki wyszukiwania

Sortuj według:

Ogranicz wyniki do:

Operator Segal algebras in Fourier algebras

100%

Forrest B., Spronk N., Wood P.

Studia Mathematica

2007

tom 179

nr 3

277-295

Let G be a locally compact group, A(G) its Fourier algebra and L¹(G) the space of Haar integrable functions on G. We study the Segal algebra S¹A(G) = A(G) ∩ L¹(G) in A(G). It admits an operator space structure which makes it a completely contractive Banach algebra. We compute the dual space of S¹A(G). We use it to show that the restriction operator $u ↦ u|_{H}: S¹A(G) → A(H)$, for some non-open closed subgroups H, is a surjective complete quotient map. We also show that if N is a non-compact closed subgroup, then the averaging operator $τ_{N}: S¹A(G) → L¹(G/N)$, $τ_{N}u(sN) = ∫_{N} u(sn)dn$, is a surjective complete quotient map. This puts an operator space perspective on the philosophy that S¹A(G) is "locally A(G) while globally L¹". Also, using the operator space structure we can show that S¹A(G) is operator amenable exactly when when G is compact; and we can show that it is always operator weakly amenable. To obtain the latter fact, we use E. Samei's theory of hyper-Tauberian Banach algebras.

Ograniczanie wyników

1 Studia Mathematica

1 Forrest B.

1 Spronk N.

1 Wood P.

1 2007

Wyniki wyszukiwania

Operator Segal algebras in Fourier algebras