A Duality Theorem for Interpolation Methods Associated to Polygons
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Publication:4303813
DOI10.2307/2161219zbMath0806.46020OpenAlexW4245928416MaRDI QIDQ4303813
Pedro Fernández-Martínez, Fernando Cobos
Publication date: 27 September 1994
Full work available at URL: https://doi.org/10.2307/2161219
Interpolation between normed linear spaces (46B70) Abstract interpolation of topological vector spaces (46M35)
Related Items (5)
The fundamental function of spaces generated by interpolation methods associated to polygons ⋮ On duality between K- and J-spaces ⋮ On interpolation of function spaces by methods defined by means of polygons ⋮ On an extreme class of real interpolation spaces ⋮ Reiteration formulae for interpolation methods associated to polygons
Cites Work
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- Real and complex interpolation methods for finite and infinite families of Banach spaces
- A theory of complex interpolation for families of Banach spaces
- One-sided compactness results for Aronszajn-Gagliardo functors
- Complex interpolation for \(2^ N\) Banach spaces
- Interpolation of several Banach spaces
- Norm estimates for interpolation methods defined by means of polygons
- Interpolation of Compact Operators: The Multidimensional Case
- Duality for Fernandez Type Spaces
- Interpolation of 2 d Banach Spaces and the Calderón Spaces X (E )
- Interpolation of $2^{n}$ Banach spaces
- Reiteration and a Wolff theorem for interpolation methods defined by means of polygons
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