<b>Update.</b> It is undecidable. Here is the proof. 

If $f,g\colon A^*\to \{a,b\}^*$ are two morphisms, then one can construct a rational Z-series over A whose support is the complement of the equalizer of f,g. This is how Post correspondence is reduced to universality of $\mathbb{Z}$-series and is based on a faithful 2x2 rep of the free monoid over $\mathbb{N}$. See the proof of Thm 27 of http://www.infres.enst.fr/~jsaka/ENSG/MPRI/Files/References/JS-HWA.pdf

So it suffices to prove it is undecidable whether the equalizer of two free monoid morphisms is rational.  

This is shown undecidable in Thm 5.2 [here](http://www.inf.u-szeged.hu/actacybernetica/prevvols/4_1/4_1_127_139.pdf). Thm 5.2. It is also shown undecidable for context-free.