Discontinuous Homomorphisms of C(X) with 20>2

Abstract

Assume that M is a c.t.m. of ZFC+CH containing a simplified (ω1,2)-morass, P∈ M is the poset adding 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 R-linear order-preserving monomorphism from the finite elements of an ultrapower of the reals, over a non-principal ultrafilter on ω, into the Esterle algebra of formal power series. Therefore it is consistent that 20=3 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. For n∈ N, If M contains a simplified (ω1,n)-morass, then in the Cohen extension of M adding n generic reals there exists a discontinuous homomorphism of C(X), for any infinite compact Hausdorff space X.