Pages that link to "Item:Q968835"

The following pages link to The Banach spaces \(\ell _{\infty }(c_{0})\) and \(c_{0}(\ell _{\infty })\) are not isomorphic (Q968835):

Displaying 9 items.

• A classical Banach space: \(\ell_{\infty}/c_ 0\) (Q799896) (← links)
• \(L_p + L_q\) and \(L_p \cap L_q\) are not isomorphic for all \(1 \leq p\), \(q\leq \infty\), \(p\neq q\) (Q1636160) (← links)
• Extendibility of bilinear forms on Banach sequence spaces (Q2017147) (← links)
• The isomorphism class of \(c_0\) is not Borel (Q2421894) (← links)
• \(\ell _{\infty }(\ell _{1})\) and \(\ell _{1}(\ell _{\infty })\) are not isomorphic (Q2474936) (← links)
• On the mutually non isomorphic ℓp(ℓq) spaces (Q3096962) (← links)
• Isomorphic classification of mixed sequence spaces and of Besov spaces over [0, 1]^<i>d</i> (Q5275848) (← links)
• Complementations in $C(K,X)$ and $\ell _\infty (X)$ (Q6104326) (← links)
• Banach spaces of \(\mathcal{I} \)-convergent sequences (Q6126785) (← links)