Karpatsʹkì Matematičnì Publìkacìï (Jun 2013)

Weak Darboux property and transitivity of linear mappings on topological vector spaces

  • V. K. Maslyuchenko,
  • V. V. Nesterenko

Journal volume & issue
Vol. 5, no. 1
pp. 79 – 88

Abstract

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It is shown that every linear mapping ontopological vector spaces always has weak Darboux property, therefore, it is continuous ifand only if it is transitive. For finite-dimensional mapping $f$ with values in Hausdorfftopological vector space the following conditions are equivalent: (i) $f$ iscontinuous; (ii) graph of $f$ is closed; (iii) kernel of $f$ is closed; (iv) $f$ istransition map.

Keywords