The Z2-graded dimensions of the free Jordan superalgebra J(D1|D2)

Abstract

Let k be a field of characteristic 0. For a superspace V=V0 V1 over k, we call the vector (k V0 ,k V1) the ( Z2-)graded dimension of V. Let J(D1|D2) be the free Jordan superalgebra generated by D1 even generators and D2 odd generators. In this paper, we study the graded dimensions of the n-components of J(D1|D2) and find the connection between them and the homology of Tits-Allison-Gao Lie superalgebra of J(D1|D2) following the method given by I.Kashuba and O.Mathieu in [KM], where they deal with the free Jordan algebra. And, four interesting conjectures of above contents are proposed in our paper.

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