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http://dbpedia.org/ontology/abstract The finest locally convex topological vectThe finest locally convex topological vector space (TVS) topology on the tensor product of two locally convex TVSs, making the canonical map (defined by sending to ) separately continuous is called the inductive topology or the -topology. When is endowed with this topology then it is denoted by and called the inductive tensor product of andcalled the inductive tensor product of and
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rdfs:comment The finest locally convex topological vectThe finest locally convex topological vector space (TVS) topology on the tensor product of two locally convex TVSs, making the canonical map (defined by sending to ) separately continuous is called the inductive topology or the -topology. When is endowed with this topology then it is denoted by and called the inductive tensor product of andcalled the inductive tensor product of and
rdfs:label Inductive tensor product
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