## Functional analysis: proceedings of the seminar at the University of Texas at Austin, 1987-89 |

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### Contents

On certain classes of Baire1 functions with applications | 1 |

Normed spaces with a weakGordonLewis property | 36 |

On the geometry of the BanachMazur compactum | 48 |

Copyright | |

10 other sections not shown

### Common terms and phrases

assume bad u£p-array Banach lattice Banach space basic sequence Bi(K bounded linear operators bounded sequence Bourgain C C(K choose compact metric space converging pointwise convex block subsequence Corollary DBSC(K deduce defined denote equivalent exists factors finite function spaces hence induction inequality integers invariant function spaces isometric isomorphic Let F limited Lindenstrauss linear span lower 2-estimate Math measure space metric space n-dimensional nice measure spaces non-Dunford-Pettis operator normed space numbers obtain order bounded order continuous norm p-array procedure pointwise to F proof of Proposition proof of Theorem prove random variables Remark result satisfies the p-array scalars semi-normalized spreading model stable Banach space subarray subset subspace topology twisted types unconditional uniformly bounded uniformly integrable unit ball unit vector unit vector basis vector basis W.B. Johnson weak Schur space weakly Cauchy weakly compact weakly null sequence