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The famous Gowers tree space is the first example of a space not containing c₀, ℓ₁ or a reflexive subspace. We present a space with a similar construction and prove that it is hereditarily indecomposable (HI) and has ℓ₂ as a quotient space. Furthermore, we show that every bounded linear operator on it is of the form λI + W where W is a weakly compact (hence strictly singular) operator.
2000 Mathematics Subject Classification: 46B20, 46B26.
We construct a non-reflexive, l^2 saturated Banach space such that every non-reflexive subspace has non-separable dual.
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