Characterizing indecomposable plane continua from their complements
Abstract
We show that a plane continuum X is indecomposable iff X has a sequence (Un) of not necessarily distinct complementary domains satisfying what we call the double-pass condition: If one draws an open arc An in each Un whose ends limit into the boundary of Un, one can choose components of Un minus An whose boundaries intersected with the continuum (which we call shadows) converge to the continuum.
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