The de Rham cohomology of the algebra of polynomial functions on a simplicial complex

Abstract

We consider the algebra A0 (X) of polynomial functions on a simplicial complex X. The algebra A0 (X) is the 0th component of Sullivan's dg-algebra A (X) of polynomial forms on X. Our main interest lies in computing the de Rham cohomology of the algebra A0(X), that is, the cohomology of the universal dg-algebra A0(X). There is a canonical morphism of dg-algebras P: A0(X) A (X). We prove that P is a quasi-isomorphism. Therefore, the de Rham cohomology of the algebra A0 (X) is canonically isomorphic to the cohomology of the simplicial complex X with coefficients in k. Moreover, for k=Q the dg-algebra A0 (X) is a model of the simplicial complex X in the sense of rational homotopy theory.