When automorphisms of $\mathcal{P}(\kappa)/[\kappa]^{<\aleph_0}$ are trivial off a small set

by Shelah and Steprans. [ShSr:1071]
Fundamenta Math, 2016
It is shown that if kappa > 2^{aleph_0} and kappa is less than the first inaccessible cardinal then every automorphism of {P} (kappa)/[kappa]^{< aleph_0} is trivial outside of a set of cardinality 2^{aleph_0} .


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