Point process operation

In algebraic topology, a symmetric spectrum X is a spectrum of pointed simplicial sets that comes with an action of the symmetric group $Σ_{n}$ on $X_{n}$ such that the composition of structure maps

S^{1} \land \dots \land S^{1} \land X_{n} \to S^{1} \land \dots \land S^{1} \land X_{n + 1} \to \dots \to S^{1} \land X_{n + p - 1} \to X_{n + p}

is equivariant with respect to $Σ_{p} \times Σ_{n}$ . A morphism between symmetric spectra is a morphism of spectra that is equivariant with respect to the actions of symmetric groups.

The technical advantage of the category $𝒮 p^{Σ}$ of symmetric spectra is that it has a closed symmetric monoidal structure (with respect to smash product). It is also a simplicial model category. A symmetric ring spectrum is a monoid in $𝒮 p^{Σ}$ ; if the monoid is commutative, it's a commutative ring spectrum. The possibility of this definition of "ring spectrum" was one of motivations behind the category.

A similar technical goal is also achieved by May's theory of S-modules, a competing theory.

References

43 year old Petroleum Engineer Harry from Deep River, usually spends time with hobbies and interests like renting movies, property developers in singapore new condominium and vehicle racing. Constantly enjoys going to destinations like Camino Real de Tierra Adentro.

Introduction to symmetric spectra I
M. Hovey, B. Shipley, and J. Smith, “Symmetric spectra”, Journal of the AMS 13 (1999), no. 1, 149 – 208.

Template:Topology-stub

Point process operation

References

Navigation menu

Search