Simplicial commutative ring

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 ${\displaystyle \pi _{0}A}$ is a ring and ${\displaystyle \pi _{i}A}$ are modules over that ring (in fact, ${\displaystyle \pi _{*}A}$ is a graded ring over ${\displaystyle \pi _{0}A}$.)

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

Examples

• The ring of polynomial differential forms on simplexes.

Graded ring structure

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

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

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

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

Spec

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 ${\displaystyle \operatorname {Spec} A}$ .

See also

• E_n-ring

References

• 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