Results 101 to 110 of about 11,294 (215)
The strong limited p-Schur property in Banach lattices [PDF]
, 2022 H. Ardakani, h. Taghavinejad
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Variational regularisation for inverse problems with imperfect forward operators and general noise models. [PDF]
Inverse Probl, 2020 Bungert L +3 more
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Nuclear global spaces of ultradifferentiable functions in the matrix weighted setting. [PDF]
Banach J Math Anal, 2021 Boiti C, Jornet D, Oliaro A, Schindl G.
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Proceedings of the American Mathematical SocietyAn analogue of Kakutani’s representation theorem for Banach lattice algebras is provided. We characterize Banach lattice algebras that embed as a closed sublattice-algebra of C ( K ) C(K) precisely as those with a positive approximate identity ( e γ )
Muñoz-Lahoz, David, Tradacete, Pedro
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Interpolation of nonlinear positive or order preserving operators on Banach lattices [PDF]
, 2019 Ralph Chill +2 more
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Stability of maximum preserving functional equation on multi-Banach lattice by fixed point method [PDF]
, 2020 M.R. Velayati +1 more
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Decompositions of vector measures in Riesz spaces and Banach lattices [PDF]
, 1986 Klaus D. Schmidt
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Topology Applied to Machine Learning: From Global to Local. [PDF]
Front Artif Intell, 2021 Adams H, Moy M.
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Weak Dunford-Pettis Property for a Closed Sublattice of Compact Operators
Journal of Mathematical Extension, 2015 For several Banach lattices E and F, if K(E, F) denotes the space of all compact operators from E to F, it is shown that a necessary and sufficient condition for a closed subspace M of K(E, F) to have the weak Dunford–Pettis property is that all ...
H. Ardakani∗ +1 more
doaj
Lattice isomorphic Banach lattices of polynomials
We study Díaz-Dineen's problem for regular homogeneous vector-valued polynomials. In particular, we prove that whenever $E^*$ and $F^*$ are lattice isomorphic with at least one having order continuous norm, then $\mathcal{P}^r(^n E; G^*)$ and $\mathcal{P}^r(^n E; G^*)$ are lattice isomorphic for every $n\in \N$ and every Banach lattice $G$.
Boyd, Christopher, Miranda, Vinícius
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