Given a regular expression *R* that describes a regular language (no fancy backreferences). Is there an algorithmic way to construct a regular expression *R** that describes the language of all words except those described by *R*? It should be possible as Wikipedia says:

The regular languages are closed under the various operations, that is, if the languages

KandLare regular, so is the result of the following operations: […] the complement¬L

For example, given the alphabet *{a,b,c}*, the inverse of the language *(abc*)+* is *(a|(ac|b|c).*)?*

As DPenner has already pointed out in the comments, the inverse of a regular expresion can be exponentially larger than the original expression. This makes inversing regular expressions unsuitable to implement negative partial expression syntax for searching purposes. Is there an algorithm that preserves the *O(n*m)* runtime characteristic (where *n* is the size of the regex and *m* is the length of the input) of regular expression matching and allows for negated subexpressions?

We feel the best Stack Overflow questions have a bit of source code in them, but if your question generally covers … • a specific programming problem • a software algorithm– FUZxxl Mar 11 '13 at 19:43