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The finest locally convex topological vect … The 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 vect … The 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:label |
Inductive tensor product
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