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Realizing isomorphisms of category algebras
Published online by Cambridge University Press: 17 April 2009
Abstract
Let C(X) denote the complete boolean algebra of Borel sets modulo first category sets of the space X. Given an isomorphism τ between C(X) and C(Y), where X and Y are complete metric spaces, it is shown that there exists a homeomorphism T, between residual subsets A of X and B of Y, that induces τ. When X = Y one can make A = B. An analogous result is stated when τ is a complete isomorphism onto a subalgebra.
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- Copyright © Australian Mathematical Society 1979
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