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In mathematics, particularly in functional analysis and convex analysis, the Ursescu theorem is a theorem that generalizes the closed graph theorem, the open mapping theorem, and the uniform boundedness principle.

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  • Ursescu theorem (en)
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  • In mathematics, particularly in functional analysis and convex analysis, the Ursescu theorem is a theorem that generalizes the closed graph theorem, the open mapping theorem, and the uniform boundedness principle. (en)
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  • Ursescu (en)
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  • In mathematics, particularly in functional analysis and convex analysis, the Ursescu theorem is a theorem that generalizes the closed graph theorem, the open mapping theorem, and the uniform boundedness principle. (en)
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  • Let and be Fréchet spaces and be a continuous surjective linear map. Then T is an open map. (en)
  • Let and be Fréchet spaces and be a bijective linear map. Then is continuous if and only if is continuous. Furthermore, if is continuous then is an isomorphism of Fréchet spaces. (en)
  • Let be a barreled first countable space and let be a subset of Then: # If is lower ideally convex then # If is ideally convex then (en)
  • Let and be normed spaces and be a multimap with non-empty domain. Suppose that is a barreled space, the graph of verifies condition condition (Hwx), and that Let denote the closed unit ball in . Then the following are equivalent: # belongs to the algebraic interior of # # There exists such that for all # There exist and such that for all and all # There exists such that for all and all (en)
  • Let and be Fréchet spaces and be a linear map. Then is continuous if and only if the graph of is closed in (en)
  • Let and be first countable with locally convex. Suppose that is a multimap with non-empty domain that satisfies condition (Hwx) or else assume that is a Fréchet space and that is lower ideally convex. Assume that is barreled for some/every Assume that and let Then for every neighborhood of in belongs to the relative interior of in . In particular, if then (en)
  • Let be a complete semi-metrizable locally convex topological vector space and be a closed convex multifunction with non-empty domain. Assume that is a barrelled space for some/every Assume that and let . Then for every neighborhood of in belongs to the relative interior of in . In particular, if then (en)
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