On the kernel of the projection map T(V) S(V)

Abstract

If V is a vector space over a field F, then we consider the projection from the tensor algebra to the symmetric algebra, T,S:T(V) S(V). Our main result, in 1, gives a description of T,S. Explicitly, we consider the Z≥ 2-graded T(V)-bimodule T(V)2(V) T(V) and we define M(V)=(T(V)2(V) T(V))/WM(V), where WM(V) is the subbimodule of T(V)2(V) T(V) generated by [x,y] z t-x y [z,t], with x,y,z,t∈ V and ∈ T(V). [x,y z]+[y,z x]+[z,x y], with x,y,z∈ V. (If η∈ T(V) and ∈ T(V)2(V) T(V) (or vice-versa) then [η, ]:=η -η∈ T(V)2(V) T(V).) Then M(V) is a Z≥ 2-graded T(V)-bimodule. If η∈ T(V)2(V) T(V) the we denote by [η ] its class in M(V). Theorem We have an exact sequence 0 M(V)M,TT(V)T,SS(V) 0, where M,T is given by [η x y ]η [x,y] ∀ x,y∈ V, η,∈ T(V). In 2 we define the graded algebra S'(V)=T(V)/WS'(V), where S'(V)⊂eq T(V) is the ideal generated by x y z- y z x, x,y,z∈ V, and we prove that there is a n exact sequence 0≥ 2(V)≥ 2,S'S'(V)S',SS(V) 0. When we consider the homogeneous parts of degree 2 we have M2(V)=2(V) and S'2(V)=T2(V). Then both short exact sequences above become 02(V) T2(V) S2(V) 0 where the first morphism is given by x y [x,y]=x y-y x, a well known result.