6533b7cffe1ef96bd1258346

RESEARCH PRODUCT

POLYNOMIAL NUMERICAL INDEX FOR SOME COMPLEX VECTOR-VALUED FUNCTION SPACES

Domingo GarcíaYun Sung ChoiMiguel MartínManuel Maestre

subject

PolynomialRange (mathematics)Pure mathematicsFunction spaceGeneral MathematicsMathematical analysisBanach spaceHausdorff spaceOrder (group theory)Space (mathematics)Measure (mathematics)Mathematics

description

We study in this paper the relation between the polynomial numerical indices of a complex vector-valued function space and the ones of its range space. It is proved that the spaces C(K,X), and L∞(μ,X) have the same polynomial numerical index as the complex Banach space X for every compact Hausdorff space K and every σ-finite measure μ, which does not hold any more in the real case. We give an example of a complex Banach space X such that, for every k > 2, the polynomial numerical index of order k of X is the greatest possible, namely 1, while the one of X∗∗ is the least possible, namely k k 1−k . We also give new examples of Banach spaces with the polynomial Daugavet property, namely L∞(μ,X) when μ is atomless, and Cw(K,X), Cw∗ (K,X ∗) when K is perfect.

yearjournalcountryeditionlanguage
2007-12-12The Quarterly Journal of Mathematics
https://doi.org/10.1093/qmath/ham054