Authors: Colin James III
“In descriptive set theory and mathematical logic, Lusin's separation theorem states that if A and B are disjoint analytic subsets of Polish space, then there is a Borel set C in the space such that A ⊆ C and B ∩ C = ∅.” We evaluate two renditions of that equation, both non tautologous, refuting it. Therefore, the separation theorem of Lusin forms a non tautologous fragment of the universal logic VŁ4.
Comments: 1 Page. © Copyright 2019 by Colin James III All rights reserved. Respond to author by email only: info@cec-services dot com. See updated abstract at ersatz-systems.com.
[v1] 2019-05-28 10:54:57
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