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| has gloss | eng: In mathematics, the Browder–Minty theorem states that a bounded, continuous, coercive and monotone function T from a real, reflexive Banach space X into its continuous dual space X∗ is automatically surjective. That is, for each continuous linear functional g ∈ X∗, there exists a solution u ∈ X of the equation T(u) = g. (Note that T itself is not required to be a linear map.) |
| lexicalization | eng: Browder-Minty theorem |
| lexicalization | eng: Browder–Minty theorem |
| instance of | e/Banach space |
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