Let $X$ be a smooth proper algebraic variety over $\mathbb{C}$. Let us consider an associative algebra $${p_2}_*{\mathcal{H}{om}}_{X\times X}(\mathcal{O}_\Delta, \mathcal{O}_\Delta) \in \text{Alg}_\text{Ass}(\text{Perf}(X))$$ in the category of perfect complexes on $X$, $p_2$ denotes projection $X\times X \to X$ on the second factor.
The HKR-theorem together with the adjunction isomorphism imply the following chain of isomorphisms of complexes: \begin{equation*} \begin{split} {p_2}_*{\mathcal{H}{om}}_{X\times X}(\mathcal{O}_\Delta, \mathcal{O}_\Delta) &\cong {\mathcal{H}{om}}_{X} (\Delta^* \Delta_* \mathcal{O}_X, \mathcal{O}_X) \cong \\ &\cong \oplus_i {\mathcal{H}{om}}_{X}(\Omega^i_X[i], \mathcal{O}_X) \cong \oplus_i {Sym}_X^i(T_X[-1]). \end{split} \end{equation*} My question is whether the resulting isomorphism \begin{equation}\label{eq1} {p_2}_*{\mathcal{H}{om}}_{X\times X}(\mathcal{O}_\Delta, \mathcal{O}_\Delta) \cong \oplus_i {Sym}_X^i(T_X[-1]) \end{equation} can be lifted to an isomorphism of associative algebras.
This could be partially motivated by the fact that the Lie algebra corresponding to the LHS controls deformations of $$ \mathcal{O}_\Delta \in \text{Perf}(X\times X)^{\le 0} $$ relatively over $X$. Deforming $\mathcal{O}_\Delta$ relatively over $X$ is ``kind of the same'' as deforming all skyscraper sheaves on $X$ simultaneously. But deformations of a skyscraper sheaf on $X$ are unobstructed in our case. Therefore the expectation of this Lie algebra to be abelian.
