Aronszajn-Smith theorem

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In functional analysis, the Aronszajn-Smith theorem resolves the invariant subspace problem for compact operators on a Banach space. It was proved by Nachman Aronszajn and K. T. Smith.

The theorem states that a compact operator on a complex Banach space, of dimension greater than 1, has a nontrivial closed invariant subspace. The claim is trivial when the given compact operator has some non-zero complex number in its spectrum; however, this latter condition is not true in general. See, for instance, the Volterra operator.