RT Journal Article
T1 The Aron-Berner extension for polynomials defined in the dual of a Banach space
A1 Llavona, José G.
A1 Moraes, Luiza A.
AB Let E = F' where F is a complex Banach space and let pi(1) : E" - E circle plus F-perpendicular to --> E be the canonical projection. Let P(E-n) be the space of the complex valued continuous n-homogeneous polynomials defined in E. We characterize the elements P is an element of P(E-n) whose Aron-Berner extension coincides with P circle pi(1). The case of weakly continuous polynomials is considered. Finally we also study the same problem for holomorphic functions of bounded type.
PB European Mathematical Society
SN 0034-5318
YR 2004
FD 2004-03
LK https://hdl.handle.net/20.500.14352/50057
UL https://hdl.handle.net/20.500.14352/50057
LA eng
NO CNPq Brazil
DS Docta Complutense
RD 18 abr 2025