Daniel Carando, Silvia Lassalle, Martín Mazzitelli
Published 2012-06-14Version 1
Under certain hypotheses on the Banach space $X$, we show that the set of $N$-homogeneous polynomials from $X$ to any dual space, whose Aron-Berner extensions are norm attaining, is dense in the space of all continuous $N$-homogeneous polynomials. To this end we prove an integral formula for the duality between tensor products and polynomials. We also exhibit examples of Lorentz sequence spaces for which there is no polynomial Bishop-Phelps theorem, but our results apply. Finally we address quantitative versions, in the sense of Bollob\'as, of these results.
Journal: J. Funct. Anal. 263 (7), (2012), 1809-1824
Stone-Weierstrass theorem for homogeneous polynomials and its role in convex geometry
M-ideals of homogeneous polynomials
Multilinear Hölder-type inequalities on Lorentz sequence spaces
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