## The universal Banach space with a $$K$$-suppression unconditional basis.(English)Zbl 1463.46017

Commentat. Math. Univ. Carol. 59, No. 2, 195-206 (2018); corrigendum ibid. 61, No. 1, 127-128 (2020).
Summary: Using the technique of Fraïssé theory, for every constant $$K\geq 1$$, we construct a universal object $$\mathbb{U}_K$$ in the class of Banach spaces possessing a normalized $$K$$-suppression unconditional Schauder basis.

### MSC:

 46B04 Isometric theory of Banach spaces 46M15 Categories, functors in functional analysis 46M40 Inductive and projective limits in functional analysis
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### References:

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