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An answer is given in Theorem 3.5 'On the computation of stable stems' by Kochman and Mahowald. In light of the recent work of Isaksen, Xu, Wang and others, I'm not sure how reliable this result is.

There are two preprints available: https://arxiv.org/abs/1910.11598 https://www.utsc.utoronto.ca/people/kupers/wp-content/uploads/sites/50/2021/01/k8zshorter.pdf

As noted in the comments, there is no reason for the functor to have a left adjoint in general, as the inclusion will not preserve limits. For the other two questions, the inclusion functor is fully-f …

In case anyone stumbles across this question, there is now a published reference in this generality: Theorem 3.4.22 of Schwede's Global Homotopy Theory book.

This is Proposition 1.6 of 'Duality, Trace and Transfer' by Dold and Puppe, http://www.maths.ed.ac.uk/~aar/papers/doldpup2.pdf.

Let $MGL$ denote the motivic spectrum representing algebraic cobordism. Over $\mathop{Spec}(\mathbb{C})$ there is a Betti realization functor $\mathop{SH}(\mathbb{R}) \to \mathop{SH}$, which takes $MG …

Simon King and David Green maintain a computer calculated computation of the mod p cohmology of many finite $p$-groups ('order at most 128, of all but 6 groups of order 243, and of some sporadic examp …