Glasnik Matematicki, Vol. 34, No.2 (1999), 263-265.
A NECESSARY AND SUFFICIENT CONDITION FOR A
SPACE TO BE INFRABARRELLED OR POLYNOMIALLY INFRABARRELLED
Miguel Caldas Cueva and Dinamerico P. Pombo Jr.
Instituto de Matematica, Universidade Federal Fluminese,
Rua Mario Santos Braga, 24020-140 Niteroi-RJ, Brasil
e-mail: gmamccs@vm.uff.br
e-mail: marifer@domain.com.br
Abstract. A locally convex space E is
infrabarrelled (resp. polynomially infrabarrelled) if and only if,
for every Banach space F (resp. for every positive integer
m and for every Banach space F), the space of all
continous linear mappings from E into F
(resp. the space of all continuous m-homogeous polynomials
form E into F) is quasi-complete for the topology
of bounded convergence.
1991 Mathematics Subject Classification.
46E40.
Key words and phrases. Locally convex spaces, continuous
m-homogeneous polynomials, topology of bounded convergence,
equicontinuous sets.
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