Nichols algebras over classical Weyl groups, Fomin-Kirillov algebras and Lyndon basis

Abstract

We show that except in several cases conjugacy classes of classical Weyl groups W(Bn) and W(Dn) are of type D. We prove that except in three cases Nichols algebras of irreducible Yetter-Drinfeld ( YD in short )modules over the classical Weyl groups are infinite dimensional. We establish the relationship between Fomin-Kirillov algebra En and Nichols algebra B ( O(1, 2) , ε sgn) of transposition over symmetry group by means of quiver Hopf algebras. We generalize FK algebra. The characteristic of finiteness of Nichols algebras in thirteen ways and of FK algebras En in nine ways is given. All irreducible representations of finite dimensional Nichols algebras %( FK algebras En) and a complete set of hard super- letters of Nichols algebras of finite Cartan types are found. The sufficient and necessary condition for Nichols algebra B(M) of reducible YD module M over A Sn with supp (M) ⊂eq A to be finite dimensional is given. % Some conditions for a braided vector space to become a YD module over finite commutative group are obtained. It is shown that hard braided Lie Lyndon word, standard Lyndon word, Lyndon basis path, hard Lie Lyndon word and standard Lie Lyndon word are the same with respect to B(V), Cartan matrix Ac and U(L+), respectively, where V and L correspond to the same finite Cartan matrix Ac.