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We investigate Banach space automorphisms $T: ℓ_{∞}/c₀ → ℓ_{∞}/c₀$ focusing on the possibility of representing their fragments of the form
$T_{B,A}: ℓ_{∞}(A)/c₀(A) → ℓ_{∞}(B)/c₀(B)$
for A,B ⊆ ℕ infinite by means of linear operators from $ℓ_{∞}(A)$ into $ℓ_{∞}(B)$, infinite A×B-matrices, continuous maps from B* = βB∖B into A*, or bijections from B to A. This leads to the analysis of general bounded linear operators on $ℓ_{∞}/c₀$. We present many examples, introduce and investigate several classes of operators, for some of them we obtain satisfactory representations and for others give examples showing that this is impossible. In particular, we show that there are automorphisms of $ℓ_{∞}/c₀$ which cannot be lifted to operators on $ℓ_{∞}$, and assuming OCA+MA we show that every automorphism T of $ℓ_{∞}/c₀$ with no fountains or with no funnels is locally induced by a bijection, i.e., $T_{B,A}$ is induced by a bijection from some infinite B ⊆ ℕ to some infinite A ⊆ ℕ. This additional set-theoretic assumption is necessary as we show that the Continuum Hypothesis implies the existence of counterexamples of diverse flavours. However, many basic problems, some of which are listed in the last section, remain open.
$T_{B,A}: ℓ_{∞}(A)/c₀(A) → ℓ_{∞}(B)/c₀(B)$
for A,B ⊆ ℕ infinite by means of linear operators from $ℓ_{∞}(A)$ into $ℓ_{∞}(B)$, infinite A×B-matrices, continuous maps from B* = βB∖B into A*, or bijections from B to A. This leads to the analysis of general bounded linear operators on $ℓ_{∞}/c₀$. We present many examples, introduce and investigate several classes of operators, for some of them we obtain satisfactory representations and for others give examples showing that this is impossible. In particular, we show that there are automorphisms of $ℓ_{∞}/c₀$ which cannot be lifted to operators on $ℓ_{∞}$, and assuming OCA+MA we show that every automorphism T of $ℓ_{∞}/c₀$ with no fountains or with no funnels is locally induced by a bijection, i.e., $T_{B,A}$ is induced by a bijection from some infinite B ⊆ ℕ to some infinite A ⊆ ℕ. This additional set-theoretic assumption is necessary as we show that the Continuum Hypothesis implies the existence of counterexamples of diverse flavours. However, many basic problems, some of which are listed in the last section, remain open.
Słowa kluczowe
Kategorie tematyczne
Czasopismo
Rocznik
Tom
Numer
Strony
49-99
Opis fizyczny
Daty
wydano
2016
Twórcy
autor
- Institute of Mathematics, Polish Academy of Sciences, Śniadeckich 8, 00-656 Warszawa, Poland
- Departamento de Matemáticas, Facultad de Ciencias, Universidad de Los Andes, 5101 Mérida, Venezuela
- Equipe de Logique, UFR de Mathématiques, Université Denis Diderot Paris 7, 75013 Paris, France
Bibliografia
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Bibliografia
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bwmeta1.element.bwnjournal-article-doi-10_4064-fm117-1-2016