Indecomposable continuum
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This article is not about the indecomposability attributed to the real line by constructive mathematics. See Indecomposability (constructive mathematics).
In point-set topology, an indecomposable continuum is a continuum that is indecomposable, i.e. that cannot be expressed as the union of any two of its proper subcontinua. In 1910, L. E. J. Brouwer was the first to describe an indecomposable continuum.
Indecomposable continua have been used by topologists as a source of counterexamples. They also occur in dynamical systems.