Abstract
AbstractAssume that M is a transitive model of
$ZFC+CH$
containing a simplified
$(\omega _1,2)$
-morass,
$P\in M$
is the poset adding
$\aleph _3$
generic reals and G is P-generic over M. In M we construct a function between sets of terms in the forcing language, that interpreted in
$M[G]$
is an
$\mathbb R$
-linear order-preserving monomorphism from the finite elements of an ultrapower of the reals, over a non-principal ultrafilter on
$\omega $
, into the Esterle algebra of formal power series. Therefore it is consistent that
$2^{\aleph _0}>\aleph _2$
and, for any infinite compact Hausdorff space X, there exists a discontinuous homomorphism of
$C(X)$
, the algebra of continuous real-valued functions on X.
Publisher
Cambridge University Press (CUP)