Abstract
Let A,X,Y be Banach spaces and A×X→Y, (a,x)↦ax be a continuous bilinear function, called a Banach action. We say that this action preserves unconditional convergence if for every bounded sequence (an)n∈ω in A and unconditionally convergent series ∑n∈ωxn in X, the series ∑n∈ωanxn is unconditionally convergent in Y. We prove that a Banach action A×X→Y preserves unconditional convergence if and only if for any linear functional y*∈Y* the operator Dy*:X→A*, Dy*(x)(a)=y*(ax) is absolutely summing. Combining this characterization with the famous Grothendieck theorem on the absolute summability of operators from ℓ1 to ℓ2, we prove that a Banach action A×X→Y preserves unconditional convergence if A is a Hilbert space possessing an orthonormal basis (en)n∈ω such that for every x∈X, the series ∑n∈ωenx is weakly absolutely convergent. Applying known results of Garling on the absolute summability of diagonal operators between sequence spaces, we prove that for (finite or infinite) numbers p,q,r∈[1,∞] with 1r≤1p+1q, the coordinatewise multiplication ℓp×ℓq→ℓr preserves unconditional convergence if and only if one of the following conditions holds: (i) p≤2 and q≤r, (ii) 2<p<q≤r, (iii) 2<p=q<r, (iv) r=∞, (v) 2≤q<p≤r, (vi) q<2<p and 1p+1q≥1r+12.
Highlights
By a Banach action, we understand any continuous bilinear function A × X → Y,( a, x ) 7→ ax, defined on the product A × X of Banach spaces A, X with values in a Banach space Y
We say that a Banach action A × X → Y preserves unconditional convergence if for any unconditionally convergent series ∑n∈ω xn in X and any bounded sequencen∈ω in
The problem of recognition of Banach algebras whose multiplication preserves unconditional convergence has been considered in the paper [2], which motivated us to explore the following general question
Summary
( a, x ) 7→ ax, defined on the product A × X of Banach spaces A, X with values in a Banach space Y. We say that a Banach action A × X → Y preserves unconditional convergence if for any unconditionally convergent series ∑n∈ω xn in X and any bounded sequence ( an )n∈ω in. Given a Banach action, recognize whether it preserves unconditional convergence This problem is not trivial even for the Banach actionp × `q → `r assigning to every pair ( x, y) ∈ ` p × `q their coordinatewise product xy ∈ `r. A Banach action A × X → Y preserves unconditional convergence if A is a Hilbert space possessing an orthonormal basis (en )n∈ω such that for every x ∈ X the series ∑n∈ω en x is unconditionally convergent in Y. { Tn }n∈ω ⊆ G, the series ∑n∈ω Tn ( x ) converges (unconditionally or absolutely) in Y
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