Hamiltonian operators and Hochschild homologies

We construct families \(\left\{\rho_{n}^{(t, k)}\right\}\) of orthogonal idempotents of the hyperoctahedral group algebras \(Q\left[B_{n}\right]\), which commute with the Hochschild boundary operators \(h_{n}=\sum_{i=0}^{n}(-1)^{i} d\). We show that those idempotents are projections onto some hypero

We show that the Hochschild homology of a differential operator k-algebra E = A# f U g is the homology of a deformation of the Chevalley-Eilenberg complex of with coefficients in M ⊗ A \* b \* . Moreover, when A is smooth and k is a characteristic zero field, we obtain a type of Hochschild-Kostant-R

We study the Hochschild homology of algebras related via split pairs, and apply this to fiber products, trivial extensions, monomial algebras, graded-commutative algebras and quantum complete intersections. In particular, we compute lower bounds for the dimensions of both the Hochschild homology and