Algebra over generalized rings

Abstract

For a commutative ring A, we have the category of (bounded-below) chain complexes of A-modules Ch+(A), a closed symmetric monoidal category with a compatible stable Quillen model structure. The associated homotopy category is the derived category D(A), where one inverts all the quasi-isomorphisms, and it has the good description as the chain complexes made up of projective A-module in each dimension, and chain maps taken up to chain homotopy. We give here the analogous theory for a (commutative) generalized ring in the sense of MR3605614. We refer to the new concept as ``''. For an ordinary commutative ring A, an A-set is just an A-module in the usual meaning, and our construction will be equivalent to D(A). For the initial object of the category of generalized rings F ``the field with one element'', we obtain the category of symmetric spectra, and the associated stable homotopy category with its smash product (an F-set is just a pointed set, i.e. a set X with a distinguish element OX∈ X). Thus the analogous theories of stable homotopy and of chain complexes of modules over a commutative ring appear as two sides of the same coin, and moreover, they appear in a context where they interact (via the forgetful functor and its left adjoint - the base change functor). For the ``real integers'' A=, the -sets include the symmetric convex subsets of -vector spaces. We also give the global theory of the derived category of X-sets, for a generalized scheme X, in a way that is based on the local projective model structure.