I believe the terminology you want is that "the augmentation ideal is locally nilpotent."  See, e.g. [Link](https://planetmath.org/NilAndNilpotentIdeals), although there are surely places in actual literature where this is used.  I think an ideal being nilpotent means that the powers of the ideal are eventually zero (and is stronger than just requiring it to be a nil-ideal, meaning it's comprised of individually nilpotent elements).  So a nilpotent ideal is one where there is a uniform bound, i.e. I^N=0 for some sufficiently large N.  Locally nilpotent means that for any finitely generated subalgebra there exists such an N.

Is that the notation you want?  I don't know a name for an augmented algebra whose ideal is locally nilpotent other than just that.