Integral weight filtration on cohomology with no compact support

Question

In "Descent, motives and K-theory", Gillet and Soule define a weight filtration on integral cohomology $H^{*}_{c}(X, \mathbb{Z})$ of a complex variety with compact support.

They write that one can obtain a filtration on non-compactly supported cohomology $H^{*}(X, \mathbb{Z})$ using the work of Guillen and Vicente Navarro Aznar; however, it's not clear to me which paper they have in mind. In more recent writing of Cirici and Guillen (https://arxiv.org/pdf/1403.6805.pdf), only a reference to compactly-supported cohomology is made.

Question: Do the methods of Guillen and Navarro Aznar yield a weight filtration on $H^{*}(X, \mathbb{Z})$? Where can the construction of integral weight filtration in the non-compactly supported case be found?

Answer 1

The results of the paper you mention (https://arxiv.org/pdf/1403.6805.pdf) are for analytic spaces, but the same proofs (actually simplified) give a weight filtration on the cohomology with coefficients in any commutative ring, of any complex algebraic varietiy. You can also have a look at https://arxiv.org/pdf/1811.08642.pdf where we put a weight filtration on singular cochains with arbitrary coefficients, compatible with the E-infinity structure. In particular, in cohomology we get what you are asking for.

As Dan points out in the comments, morphisms need not be strictly compatible with the weight filtration over the integers.

To answer your first question, I believe that the paper that Gillet and Soulé have in mind is "Un critère d'extension des foncteurs définis sur les schémas lisses". This is mainly what we use as well.