Homological invariants relating the super Jordan plane to the Virasoro algebra

Nichols algebras are an important tool for the classification of Hopf algebras. Within those with finite GK dimension, we study homological invariants of the super Jordan plane, that is, the Nichols algebra $A=B(V(-1,2))$. These invariants are Hochschild homology, the Hochschild cohomology algebra, the Lie structure of the first cohomology space - which is a Lie subalgebra of the Virasoro algebra - and its representations $H^n(A,A)$ and also the Yoneda algebra. We prove that the algebra $A$ is $K_2$ . Moreover, we prove that the Yoneda algebra of the bosonization of $A$ is also finitely generated, but not $K_2$ .