Definition 17.3.1 (Consistent).label Let $\dpn{E, F}{\lambda}$ be a duality over $K \in \RC$ and $\mathcal{T}\subset 2^{E}$ be a locally convex topology, then $\mathcal{T}$ is consistent with $\dpn{E, F}{\lambda}$ if $(E, \mathcal{T})^{*} = F$.
Definition 17.3.1 (Consistent).label Let $\dpn{E, F}{\lambda}$ be a duality over $K \in \RC$ and $\mathcal{T}\subset 2^{E}$ be a locally convex topology, then $\mathcal{T}$ is consistent with $\dpn{E, F}{\lambda}$ if $(E, \mathcal{T})^{*} = F$.
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