The main result of this paper asserts that a
monoid with finitely many left and right ideals is
finitely presented if and only if all its
Schützenberger groups are finitely presented. The most
important part of the proof is a rewriting theorem, giving a
presentation for a Schützenberger group, which is similar to
the Reidemeister-Schreier rewriting theorem for groups.
The main result of this paper asserts that a
monoid with finitely many left and right ideals is finitely
presented if and only if all its Schützenberger groups are
finitely presented. The most important part of the proof is a
rewriting theorem, giving a presentation for a
Schützenberger group, which is similar to the
Reidemeister-Schreier rewriting theorem for groups.
The main result of this paper asserts that a monoid with finitely many left and right
ideals is finitely presented if and only if all its Schützenberger groups are finitely
presented. The most important part of the proof is a rewriting theorem,
giving a presentation for a Schützenberger group, which is similar to the
Reidemeister-Schreier rewriting theorem for groups.
The main result of this paper asserts that a monoid with finitely many left and right
ideals is finitely presented if and only if all its Schützenberger groups are finitely
presented. The most important part of the proof is a rewriting theorem,
giving a presentation for a Schützenberger group, which is similar to the
Reidemeister-Schreier rewriting theorem for groups.
The main result of this paper asserts that a
monoid with finitely many left and right ideals is
finitely presented if and only if all its
Schützenberger groups are finitely presented. The most
important part of the proof is a rewriting theorem, giving a
presentation for a Schützenberger group, which is similar to
the Reidemeister-Schreier rewriting theorem for groups.
Berkeley, California.