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It is proved that if X is a rotund Banach space and M is a closed and proximinal subspace of X, then the quotient space X/M is also rotund. It is also shown that if Φ does not satisfy the δ₂-condition, then $h ⁰_{Φ}$ is not proximinal in $l ⁰_{Φ}$ and the quotient space $l ⁰_{Φ} / h ⁰_{Φ}$ is not rotund (even if $l ⁰_{Φ}$ is rotund). Weakly nearly uniform convexity and weakly uniform Kadec-Klee property are introduced and it is proved that a Banach space X is weakly nearly uniformly convex if and only if it is reflexive and it has the weakly...

Geometry of Spheres: On a Conjecture of J. J. Schäffer.

Thomas Landes (1981)

Mathematische Annalen

Geometry of the Banach spaces C(βℕ × K,X) for compact metric spaces K

Dale E. Alspach, Elói Medina Galego (2011)

Studia Mathematica

A classical result of Cembranos and Freniche states that the C(K,X) space contains a complemented copy of c₀ whenever K is an infinite compact Hausdorff space and X is an infinite-dimensional Banach space. This paper takes this result as a starting point and begins a study of conditions under which the spaces C(α), α < ω₁, are quotients of or complemented in C(K,X). In contrast to the c₀ result, we prove that if C(βℕ ×[1,ω],X) contains a complemented copy of $C (ω^{ω})$ then X contains a copy of c₀. Moreover,...

G-narrow operators and G-rich subspaces

Tetiana Ivashyna (2013)

Open Mathematics

Let X and Y be Banach spaces. An operator G: X → Y is a Daugavet center if ‖G +T‖ = ‖G‖+‖T‖ for every rank-1 operator T. For every Daugavet center G we consider a certain set of operators acting from X, so-called G-narrow operators. We prove that if J is the natural embedding of Y into a Banach space E, then E can be equivalently renormed so that an operator T is (J ○ G)-narrow if and only if T is G-narrow. We study G-rich subspaces of X: Z ⊂ X is called G-rich if the quotient map q: X → X/Z is...

Good $ℓ_{2}$ -subspaces of $L_{p}$ , $p > 2$ .

Alspach, Dale E. (2009)

Banach Journal of Mathematical Analysis [electronic only]

Greediness of the Haar system in rearrangement invariant spaces

P. Wojtaszczyk (2006)

Banach Center Publications

Greedy approximation and the multivariate Haar system

A. Kamont, V. N. Temlyakov (2004)

Studia Mathematica

We study nonlinear m-term approximation in a Banach space with regard to a basis. It is known that in the case of a greedy basis (like the Haar basis in $L_{p} ([0, 1])$ , 1 < p < ∞) a greedy type algorithm realizes nearly best m-term approximation for any individual function. In this paper we generalize this result in two directions. First, instead of a greedy algorithm we consider a weak greedy algorithm. Second, we study in detail unconditional nongreedy bases (like the multivariate Haar basis $^{d} = \times . . . \times$ in $L_{p} ({[0, 1]}^{d})$ ,...

Grothendieck Numbers and Volume Ratios of Operators on Banach Spaces.

Stefan Geiss (1990)

Forum mathematicum

Group representations in non-archimedean Banach spaces

A. C. M. van Rooij, W. H. Schikhof (1974)

Mémoires de la Société Mathématique de France

Growth of coefficients of universal Dirichlet series

A. Mouze (2007)

Annales Polonici Mathematici

We study universal Dirichlet series with respect to overconvergence, which are absolutely convergent in the right half of the complex plane. In particular we obtain estimates on the growth of their coefficients. We can then compare several classes of universal Dirichlet series.

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