The Hilbert scheme of infinite affine space and algebraic K-theory

Abstract

We study the Hilbert scheme Hilbd(A∞) from an A1-homotopical viewpoint and obtain applications to algebraic K-theory. We show that the Hilbert scheme Hilbd(A∞) is A1-equivalent to the Grassmannian of (d-1)-planes in A∞. We then describe the A1-homotopy type of Hilbd(An) in a range, for n large compared to d. For example, we compute the integral cohomology of Hilbd(An)(C) in a range. We also deduce that the forgetful map FFlat from the moduli stack of finite locally free schemes to that of finite locally free sheaves is an A1-equivalence after group completion. This implies that the moduli stack FFlat, viewed as a presheaf with framed transfers, is a model for the effective motivic spectrum kgl representing algebraic K-theory. Combining our techniques with the recent work of Bachmann, we obtain Hilbert scheme models for the kgl-homology of smooth proper schemes over a perfect field.