A cardinal preserving extension making the set of points of countable V cofinality nonstationary

Assuming large cardinals we produce a forcing extension of V which preserves cardinals, does not add reals, and makes the set of points of countable V cofinality in κ⁺ nonstationary. Continuing to force further, we obtain an extension in which the set of points of countable V cofinality in ν is nonstationary for every regular ν ≥ κ⁺. Finally we show that our large cardinal assumption is optimal. This material is based upon work supported by the National Science Foundation under Grant no. DMS-0094174.