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For a countable compact metric space and a seminormalized weakly null sequence (fₙ)ₙ in C() we provide some upper bounds for the norm of the vectors in the linear span of a subsequence of (fₙ)ₙ. These bounds depend on the complexity of and also on the sequence (fₙ)ₙ itself. Moreover, we introduce the class of c₀-hierarchies. We prove that for every α < ω₁, every normalized weakly null sequence (fₙ)ₙ in $C\left({\omega }^{{\omega }^{\alpha }}\right)$ and every c₀-hierarchy generated by (fₙ)ₙ, there exists β ≤ α such that a sequence of β-blocks...

The results of the first part concern the existence of higher order ℓ₁ spreading models in asymptotic ℓ₁ Banach spaces. We sketch the proof of the fact that the mixed Tsirelson space T[(ₙ,θₙ)ₙ], ${\theta }_{n+m}\ge \theta ₙ\theta ₘ$ and $li{m}_n\theta {ₙ}^{1/n}=1$, admits an $\ell {₁}^{\omega }$ spreading model in every block subspace. We also prove that if X is a Banach space with a basis, with the property that there exists a sequence (θₙ)ₙ ⊂ (0,1) with $li{m}_n\theta {ₙ}^{1/n}=1$, such that, for every n ∈ ℕ, $\left|\right|{\sum }_{k=1}^m{x}_k\left|\right|\ge \theta ₙ{\sum }_{k=1}^m\left|\right|x_k\left|\right|$ for every ₙ-admissible block sequence ${\left(x_k\right)}_{k=1}^m$ of vectors in X, then there exists c > 0 such...

We introduce higher order spreading models associated to a Banach space X. Their definition is based on ℱ-sequences ${\left(x_s\right)}_{s\in ℱ}$ with ℱ a regular thin family and on plegma families. We show that the higher order spreading models of a Banach space X form an increasing transfinite hierarchy ${\left({ℳ}_{\xi }\left(X\right)\right)}_{\xi <\omega ₁}$. Each ${ℳ}_{\xi }\left(X\right)$ contains all spreading models generated by ℱ-sequences ${\left(x_s\right)}_{s\in ℱ}$ with order of ℱ equal to ξ. We also study the fundamental properties of this hierarchy.