Algebras defined by Lyndon words and Artin-Schelter regularity

Abstract

Let X= \x1, x2, ·s, xn\ be a finite alphabet, and let K be a field. We study classes C(X, W) of graded K-algebras A = K X / I, generated by X and with a fixed set of obstructions W. Initially we do not impose restrictions on W and investigate the case when all algebras in C (X, W) have polynomial growth and finite global dimension d. Next we consider classes C (X, W) of algebras whose sets of obstructions W are antichains of Lyndon words. The central question is "when a class C (X, W) contains Artin-Schelter regular algebras?" Each class C (X, W) defines a Lyndon pair (N,W) which determines uniquely the global dimension, gl A, and the Gelfand-Kirillov dimension, GK A, for every A ∈ C(X, W). We find a combinatorial condition in terms of (N,W), so that the class C(X, W) contains the enveloping algebra Ug of a Lie algebra g. We introduce monomial Lie algebras defined by Lyndon words, and prove results on Groebner-Shirshov bases of Lie ideals generated by Lyndon-Lie monomials. Finally we classify all two-generated Artin-Schelter regular algebras of global dimensions 6 and 7 occurring as enveloping U = Ug of standard monomial Lie algebras. The classification is made in terms of their Lyndon pairs (N, W), each of which determines also the explicit relations of U.