A comparison of Hochschild homology in algebraic and smooth settings

Abstract

Consider a complex affine variety V and a real analytic Zariski-dense submanifold V of V. We compare modules over the ring O ( V) of regular functions on V with modules over the ring C∞ (V) of smooth complex valued functions on V. Under a mild condition on the tangent spaces, we prove that C∞ (V) is flat as a module over O ( V). From this we deduce a comparison theorem for the Hochschild homology of finite type algebras over O ( V) and the Hochschild homology of similar algebras over C∞ (V). We also establish versions of these results for functions on V (resp. V) that are invariant under the action of a finite group G. As an auxiliary result, we show that C∞ (V) has finite rank as module over C∞ (V)G.