The homotopy groups of the simplicial mapping space between algebras

Abstract

Let be a commutative ring with unit. To every pair of -algebras A and B one can associate a simplicial set (A,B) so that π0(A,B) equals the set of polynomial homotopy classes of morphisms from A to B. We prove that πn(A,B) is the set of homotopy classes of morphisms from A to BSn, where BSn is the ind-algebra of polynomials on the n-dimensional cube with coefficients in B vanishing at the boundary of the cube. This is a generalization to arbitrary dimensions of a theorem of Corti\~nas-Thom, which addresses the cases n≤ 1. As an application we give a simplified proof of a theorem of Garkusha that computes the homotopy groups of his matrix-unstable algebraic KK-theory space in terms of polynomial homotopy classes of morphisms.