On Nichols (braided) Lie algebras

Abstract

We prove (i) Nichols algebra B(V) of vector space V is finite-dimensional if and only if Nichols braided Lie algebra L(V) is finite-dimensional; (ii) If the rank of connected V is 2 and B(V) is an arithmetic root system, then B(V) = F L(V); and (iii) if ( B(V)) is an arithmetic root system and there does not exist any m-infinity element with puu = 1 for any u ∈ D(V), then ( B(V) ) = ∞ if and only if there exists V', which is twisting equivalent to V, such that ( L - (V')) = ∞. Furthermore we give an estimation of dimensions of Nichols Lie algebras and two examples of Lie algebras which do not have maximal solvable ideals.