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Calabi-Yau object

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Functorial quantum field theory

functorial quantum field theory

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Physics

physics, mathematical physics

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theory (physics), model (physics)

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Definition

Definition

For C a symmetric monoidal (infinity,2)-category, a Calabi-Yau object in C is

  • a dualizable object;

  • a morphism η:dim(X):ev Xcircoev XId x in Ω xC which is equivariant with respect to the canonical action of the circle group on dim(X) and which is the counit for an adjunction between ev X and coev X.

This is (Lurie, def. 4.2.6).

Examples

Calabi-Yau algebras

Example

Let S be a good symmetric monoidal (∞,1)-category. Write Alg(S) for the symmetric monoidal (∞,2)-category whose objects are algebra objects in S and whose morphisms are bimodule objects.

Then a Calabi-Yau object in Alg(S) is an algebra object A equipped with an SO(2)-equivariant morphism

tr: S 1A1tr : \int_{S^1} A \to 1

satisfying the condition that the composite morphism

AA S 0A S 1Atr1A \otimes A \simeq \int_{S^0} A \to \int_{S^1} A \stackrel{tr}{\to} 1

exhibits A as its own dual A .

Such an algebra object is called a Calabi-Yau algebra object.

This is (Lurie, example 4.2.8).

Properties

A version of the cobordism hypothesis says that symmetric monoidal (,2)-functors

Z:Bord 2 nc𝒞Z : Bord_2^{nc} \to \mathcal{C}

out of a version of the (infinity,2)-category of cobordisms where all 2-cobordisms have at least one outgoing (ingoing) boundary component, are equivalently given by their value on the point, which is a Calabi-Yau object in 𝒞.

This is Lurie, 4.2.11.

This is closely related to the description of TCFTs (Lurie, theorem 4.2.13).

References

Section 4.2 of

Revised on July 21, 2011 22:32:27 by Urs Schreiber (82.113.99.58)
Edit | Back in time (2 revisions) | See changes | History | Views: Print | TeX | Source | Linked from: On the Classification of Topological Field Theories, cobordism hypothesis, TCFT, Calabi-Yau category, Calabi-Yau variety, Calabi-Yau algebra, generalized Calabi-Yau manifold