English

Homological Algebra for Commutative Monoids

K-Theory and Homology 2015-03-10 v1

Abstract

We first study commutative, pointed monoids providing basic definitions and results in a manner similar commutative ring theory. Included are results on chain conditions, primary decomposition as well as normalization for a special class of monoids which lead to a study monoid schemes, divisors, Picard groups and class groups. It is shown that the normalization of a monoid need not be a monoid, but possibly a monoid scheme. After giving the definition of, and basic results for, AA-sets, we classify projective AA-sets and show they are completely determine by their rank. Subsequently, for a monoid AA, we compute K0K_0 and K1K_1 and prove the Devissage Theorem for G0G_0. With the definition of short exact sequence for AA-sets in hand, we describe the set Ext(X,Y)Ext(X,Y) of extensions for AA-sets X,YX,Y and classify the set of square-zero extensions of a monoid AA by an AA-set XX using the Hochschild cosimplicial set. We also examine the projective model structure on simplicial AA-sets showcasing the difficulties involved in computing homotopy groups as well as determining the derived category for a monoid. The author defines the category Da(C)\operatorname{Da}(\mathcal{C}) of double-arrow complexes for a class of non-abelian categories C\mathcal{C} and, in the case of AA-sets, shows an adjunction with the category of simplicial AA-sets.

Keywords

Cite

@article{arxiv.1503.02309,
  title  = {Homological Algebra for Commutative Monoids},
  author = {Jaret Flores},
  journal= {arXiv preprint arXiv:1503.02309},
  year   = {2015}
}

Comments

PhD thesis, Rutgers Univ

R2 v1 2026-06-22T08:47:01.515Z