Sequential Continuity of Linear Mappings in Constructive Mathematics


This paper deals, constructively, with two theorems on the sequential continuity of linear mappings. The classical proofs of these theorems use the boundedness of the linear mappings, which is a constructively stronger property than sequential continuity; and constructively inadmissable versions of the Banach-Steinhaus theorem. 
DOI: 10.3217/jucs-003-11-1250


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