Inclusion of regular and linear languages in group languages

Abstract

Let = X X-1 = \ x1 ,x2 ,..., xm ,x1-1 ,x2-1 ,..., xm-1 \ and let G be a group with set of generators . Let L (G) =\ . ω ∈ * \; \;ω e \; (mod \; G) \ ⊂eq * be the group language representing G, where * is a free monoid over and e is the identity in G. The problem of determining whether a context-free language is subset of a group language is discussed. Polynomial algorithms are presented for testing whether a regular language, or a linear language is included in a group language. A few finite sets are built, such that each of them is included in the group language L (G) if and only if the respective context-free language is included in L (G).