Köthe Amalgams: The Ideal Type of Infinite Direct Sums
[ 1 ] Instytut Matematyki, Wydział Automatyki, Robotyki i Elektrotechniki, Politechnika Poznańska | [ P ] employee
2025
scientific article
english
- quasi-Banach ideal spaces
- infinite direct sums
- amalgam spaces
- Lorentz spaces
- Orlicz spaces
- Herz spaces
- interpolation
- integral operators
EN We study a special type of infinite direct sums E(X) which can be seen as the amalgam spaces characterized by a local component given by a countable family X = (Xα)α∈I of quasi-normed function spaces and by a global component E, which is a quasinormed sequence space. We characterize some fundamental properties of E(X) such as completeness, Köthe-duality, order continuity and the Fatou property. We also provide its Banach function space characterization. Then, we apply our general results to the appropriate amalgamations of Lorentz (Orlicz) function spaces and Lebesgue sequence spaces. Moreover, for the Lorentz-type amalgams, we derive interpolation results and prove the boundedness of a class of sublinear integral operators whose kernels satisfy a size condition.
2-1 - 2-33
Article number: 2
CC BY (attribution alone)
czasopismo hybrydowe
final published version
public
70
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