The intrinsic bracket on the deformation complex of an associative algebra (Q687592)

Let \(A\) be an associative algebra and denote by \(BA\) the bar construction on \(A\). The author constructs an isomorphism of differential graded modules between the Hochschild complex, \((\Hom(BA,A),\delta)\), and the differential complex of coderivations, \((\text{Coder }BA,D)\), of the coalgebra \(BA\). The natural structure of graded Lie algebra of \((\text{Coder }BA,D)\), induces the Gerstenhaber structure of graded Lie algebra on the Hochschild cohomology, \(\text{Hoch}(A,A)\simeq H(\text{Coder }BA,D)\).