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Closed ideals of operators on the Tsirelson and Schreier spaces
- 1.0525128 - MÚ 2021 RIV US eng J - Článek v odborném periodiku
Beanland, K. - Kania, Tomasz - Laustsen, N. J.
Closed ideals of operators on the Tsirelson and Schreier spaces.
Journal of Functional Analysis. Roč. 279, č. 8 (2020), č. článku 108668. ISSN 0022-1236. E-ISSN 1096-0783
Grant CEP: GA ČR(CZ) GJ19-07129Y
Institucionální podpora: RVO:67985840
Klíčová slova: closed operator ideal * ideal lattice * Schreier space * Tsirelson space
Obor OECD: Pure mathematics
Impakt faktor: 1.748, rok: 2020
Způsob publikování: Omezený přístup
https://doi.org/10.1016/j.jfa.2020.108668
Let B(X) denote the Banach algebra of bounded operators on X, where X is either Tsirelson's Banach space or the Schreier space of order n for some n∈N. We show that the lattice of closed ideals of B(X) has a very rich structure, in particular B(X) contains at least continuum many maximal ideals. Our approach is to study the closed ideals generated by the basis projections. Indeed, the unit vector basis is an unconditional basis for each of the above spaces, so there is a basis projection PN∈B(X) corresponding to each non-empty subset N of N. A closed ideal of B(X) is spatial if it is generated by PN for some N. We can now state our main conclusions as follows: • the family of spatial ideals lying strictly between the ideal of compact operators and B(X) is non-empty and has no minimal or maximal elements, • for each pair I⫋J of spatial ideals, there is a family {ΓL:L∈Δ}, where the index set Δ has the cardinality of the continuum, such that ΓL is an uncountable chain of spatial ideals, ⋃ΓL is a closed ideal that is not spatial, and I⫋L⫋JandL+M‾=J whenever L,M∈Δ are distinct and L∈ΓL, M∈ΓM.
Trvalý link: http://hdl.handle.net/11104/0309335
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