We investigate a notion of inverse for neutrices inspired by Van den Berg and
Koudjeti's decomposition of a neutrix as the product of a real number and an
idempotent neutrix. We end up with an algebraic structure that can be
characterized axiomatically and generalizes involutive meadows. The latter are
algebraic structures where the inverse for multiplication is a total operation.
As it turns out, the structures satisfying the axioms of flexible involutive
meadows are of interest beyond nonstandard analysis