Simplicial_commutative_ring Knowpia

In algebra, a simplicial commutative ring is a commutative monoid in the category of simplicial abelian groups, or, equivalently, a simplicial object in the category of commutative rings. If A is a simplicial commutative ring, then it can be shown that $\pi _{0}A$ is a ring and $\pi _{i}A$ are modules over that ring (in fact, $\pi _{*}A$ is a graded ring over $\pi _{0}A$ .)

A topology-counterpart of this notion is a commutative ring spectrum.

Examples edit

The ring of polynomial differential forms on simplexes.

Graded ring structure edit

Let A be a simplicial commutative ring. Then the ring structure of A gives $\pi _{*}A=\oplus _{i\geq 0}\pi _{i}A$ the structure of a graded-commutative graded ring as follows.

By the Dold–Kan correspondence, $\pi _{*}A$ is the homology of the chain complex corresponding to A; in particular, it is a graded abelian group. Next, to multiply two elements, writing $S^{1}$ for the simplicial circle, let $x:(S^{1})^{\wedge i}\to A,\,\,y:(S^{1})^{\wedge j}\to A$ be two maps. Then the composition

(S^{1})^{\wedge i}\times (S^{1})^{\wedge j}\to A\times A\to A

,

the second map the multiplication of A, induces $(S^{1})^{\wedge i}\wedge (S^{1})^{\wedge j}\to A$ . This in turn gives an element in $\pi _{i+j}A$ . We have thus defined the graded multiplication $\pi _{i}A\times \pi _{j}A\to \pi _{i+j}A$ . It is associative because the smash product is. It is graded-commutative (i.e., $xy=(-1)^{|x||y|}yx$ ) since the involution $S^{1}\wedge S^{1}\to S^{1}\wedge S^{1}$ introduces a minus sign.

If M is a simplicial module over A (that is, M is a simplicial abelian group with an action of A), then the similar argument shows that $\pi _{*}M$ has the structure of a graded module over $\pi _{*}A$ (cf. Module spectrum).

Spec edit

By definition, the category of affine derived schemes is the opposite category of the category of simplicial commutative rings; an object corresponding to A will be denoted by $\operatorname {Spec} A$ .

References edit

What is a simplicial commutative ring from the point of view of homotopy theory?
What facts in commutative algebra fail miserably for simplicial commutative rings, even up to homotopy?
Reference request - CDGA vs. sAlg in char. 0
A. Mathew, Simplicial commutative rings, I.
B. Toën, Simplicial presheaves and derived algebraic geometry
P. Goerss and K. Schemmerhorn, Model categories and simplicial methods

Summary

Examples edit

Graded ring structure edit

Spec edit

See also edit

References edit