TY  - JOUR
AU  - Jaramillo Aguado, Jesús Ángel
AU  - Prieto Yerro, M. Ángeles
PY  - 1993
DO  - 10.2307/2160323
SN  - 0002-9939
UR  - https://hdl.handle.net/20.500.14352/57615
T2  - Proceedings of the American Mathematical Society
AB  - We show that any super-reflexive Banach space is a LAMBDA-space (i.e., the weak-polynomial convergence for sequences implies the norm convergence). We introduce the notion Of kappa-space (i.e., a Banach space where the weak-polynomial convergence for...
LA  - eng
M2  - 463
PB  - American Mathematical Society
KW  - Tight algebras
KW  - super-reflexive Banach space
KW  - equivalent uniformly convex norm
KW  - -space
KW  - weak-polynomial convergence for sequences implies the norm convergence
KW  - weak polynomial convergence for sequences is different from the weakconvergence
KW  - dual Banach space
KW  - approximation property
KW  - uniform algebra
KW  - not weaklycompact Hankel-type operator
TI  - Weak-Polynomial Convergence on a Banach Space
TY  - journal article
VL  - 118
ER  -