Pro-representability of $K^M$-cohomology in weight 3 generalizing a result of Bloch (2301.08307v1)

Abstract: We generalize a result, on the pro-representability of Milnor $K$-cohomology groups at the identity, that's due to Bloch. In particular, we prove, for $X$ a smooth, proper, and geometrically connected variety defined over an algebraic field extension $k/\mathbb{Q}$, that the functor [\mathscr{T}{X}^{i,3}(A)=\ker\left(H^i(X_A,\mathcal{K}{3,X_A}^M)\rightarrow H^i(X,\mathcal{K}_{3,X}^M)\right),] defined on Artin local $k$-algebras $(A,\mathfrak{m}_A)$ with $A/\mathfrak{m}_A\cong k$, is pro-representable provided that certain Hodge numbers of $X$ vanish.