Anticommutativity equation in topological quantum mechanics

We consider the topological quantum mechanics as an example of topological field theory and show that it special properties lead to numerous interesting relations for topological corellators in this theory. We prove that the generating function $\mathcal{F}$ for this correlators satisfies the anticommutativity equation $(\mathcal{D}- \mathcal{F})^2=0$. We show that commutativity equation $[dB,dB]=0$ could be considered as a special case of anticommutativity equation.