Leibniz homology of the affine indefinite orthogonal Lie algebra (Q728060)

Let \(\mathfrak{h}_n\) be the Lie algebra of the affine indefinite orthogonal group. In the paper several indefinite orthogonal invariants, and \(\mathfrak{h}_n\)-invariants which are detected by Leibniz homology are calculated. The main result of the paper is the isomorphism of graded vector spaces \[ HL_{*}(\mathfrak{h}_n) \cong \left( \mathbb{R} \oplus \langle \widetilde{\alpha}_{p,q} \rangle \right) \otimes \text{T}^*(\widetilde{\gamma}_{p,q}) \] where \(\langle \widetilde{\alpha}_{p,q} \rangle\) denotes a 1-dimensional vector space in degree \(n\) on \[ \widetilde{\alpha}_n = \sum_{\sigma \in S_n} sgn(\sigma) \frac{\partial}{\partial x^{\sigma(1)}} \otimes \frac{\partial}{\partial x^{\sigma(2)}} \otimes \dots \otimes \frac{\partial}{\partial x^{\sigma(n)}} \] and \(\text{T}^*(\widetilde{\gamma}_{p,q})\) denotes the tensor algebra on the \((n-1)\)-degree generator \(\widetilde{\gamma}_{p,q}\), which is given in the paper by means of tensorial formulas. Dually, there is an isomorphism of Zinbiel algebras \[ HL^{*}(\mathfrak{h}_n) \cong \left( \mathbb{R} \oplus \langle \widetilde{\alpha}_{p,q}^d \rangle \right) \otimes \text{T}^*(\widetilde{\gamma}_{p,q}^d) \] where \(\widetilde{\alpha}_{p,q}^d\) and \(\widetilde{\gamma}_{p,q}^d\) are the respective duals of \(\widetilde{\alpha}_{p,q}\) and \(\widetilde{\gamma}_{p,q}\) with respect to the basis of \(\mathfrak{h}_n\).