On Ciesielski's problems

Abstract

We discuss some problems posed by Ciesielski. For example we show that, consistently, dc is a singular cardinal and ec<dc. Next we prove that the Martin Axiom for sigma --centered forcing notions implies that for every function f:R2 ---> R there are functions gn,hn:R ---> R, n< omega, such that f(x,y)= sumn=0infty gn(x)hn(y). Finally, we deal with countably continuous functions and we show that in the Cohen model they are exactly the functions f with the property that (for all U in [R]aleph1)(exists U* in [U]aleph1) (f restriction U* is continuous).

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