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• Browder–Minty_theorem abstract "In mathematics, the Browder–Minty theorem states that a bounded, continuous, coercive and monotone function T from a real, separable 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.)".
• Browder–Minty_theorem wikiPageID "11908534".
• Browder–Minty_theorem wikiPageRevisionID "551299068".
• Browder–Minty_theorem subject Category:Banach_spaces.
• Browder–Minty_theorem subject Category:Operator_theory.
• Browder–Minty_theorem subject Category:Theorems_in_analysis.
• Browder–Minty_theorem comment "In mathematics, the Browder–Minty theorem states that a bounded, continuous, coercive and monotone function T from a real, separable 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.)".
• Browder–Minty_theorem label "Browder–Minty theorem".
• Browder–Minty_theorem label "Théorème du point fixe de Browder".
• Browder–Minty_theorem sameAs Browder%E2%80%93Minty_theorem.
• Browder–Minty_theorem sameAs Théorème_du_point_fixe_de_Browder.
• Browder–Minty_theorem sameAs Q2687556.
• Browder–Minty_theorem sameAs Q2687556.
• Browder–Minty_theorem wasDerivedFrom Browder–Minty_theorem?oldid=551299068.