Elliptic cohomology

In mathematics, elliptic cohomology is a cohomology theory in the sense of algebraic topology. It is related to elliptic curves and modular forms.

History and motivation

Historically, elliptic cohomology arose from the study of elliptic genera. It was known by Atiyah and Hirzebruch that if ${\displaystyle S^{1}}$  acts smoothly and non-trivially on a spin manifold, then the index of the Dirac operator vanishes. In 1983, Witten conjectured that in this situation the equivariant index of a certain twisted Dirac operator is at least constant. This led to certain other problems concerning ${\displaystyle S^{1}}$ -actions on manifolds, which could be solved by Ochanine by the introduction of elliptic genera. In turn, Witten related these to (conjectural) index theory on free loop spaces. Elliptic cohomology, invented in its original form by Landweber, Stong and Ravenel in the late 1980s, was introduced to clarify certain issues with elliptic genera and provide a context for (conjectural) index theory of families of differential operators on free loop spaces. In some sense it can be seen as an approximation to the K-theory of the free loop space.

Definitions and constructions

Call a cohomology theory ${\displaystyle A^{*}}$  even periodic if ${\displaystyle A^{i}=0}$  for i odd and there is an invertible element ${\displaystyle u\in A^{2}}$ . These theories possess a complex orientation, which gives a formal group law. A particularly rich source for formal group laws are elliptic curves. A cohomology theory ${\displaystyle A}$  with

${\displaystyle A^{0}=R}$ 

is called elliptic if it is even periodic and its formal group law is isomorphic to a formal group law of an elliptic curve ${\displaystyle E}$  over ${\displaystyle R}$ . The usual construction of such elliptic cohomology theories uses the Landweber exact functor theorem. If the formal group law of ${\displaystyle E}$  is Landweber exact, one can define an elliptic cohomology theory (on finite complexes) by

${\displaystyle A^{*}(X)=MU^{*}(X)\otimes _{MU^{*}}R[u,u^{-1}].\,}$ 

Franke has identified the condition needed to fulfill Landweber exactness:

1. ${\displaystyle R}$  needs to be flat over ${\displaystyle \mathbb {Z} }$ 
2. There is no irreducible component ${\displaystyle X}$  of ${\displaystyle {\text{Spec }}R/pR}$ , where the fiber ${\displaystyle E_{x}}$  is supersingular for every ${\displaystyle x\in X}$ 

These conditions can be checked in many cases related to elliptic genera. Moreover, the conditions are fulfilled in the universal case in the sense that the map from the moduli stack of elliptic curves to the moduli stack of formal groups

${\displaystyle {\mathcal {M}}_{1,1}\to {\mathcal {M}}_{fg}}$ 

is flat. This gives then a presheaf of cohomology theories

${\displaystyle {\mathcal {O}}_{e\ell \ell }^{pre}:{\text{Aff}}/({\mathcal {M}}_{1,1})_{flat}\to {\textbf {Spectra}}}$ 

over the site of affine schemes flat over the moduli stack of elliptic curves. The desire to get a universal elliptic cohomology theory by taking global sections has led to the construction of the topological modular forms^{[1]pg 20}

${\displaystyle \mathbf {Tmf} ={\underset {X\to {\mathcal {M}}_{1,1}}{\textbf {Holim}}}{\text{ }}{\mathcal {O}}_{e\ell \ell }^{pre}(X)}$ 

as the homotopy limit of this presheaf over the previous site.

See also

• Spectral algebraic geometry
• Intermediate Jacobian
• Chromatic homotopy theory

References

1. Goerss, Paul G. (2009-05-08). "Realizing Families of Landweber Exact Homology Theories". arXiv:0905.1319 [math.AT].

• Franke, Jens (1992), "On the construction of elliptic cohomology", Mathematische Nachrichten, 158 (1): 43–65, doi:10.1002/mana.19921580104.
• Landweber, Peter S. (1988), "Elliptic genera: An introductory overview", in Landweber, P. S. (ed.), Elliptic Curves and Modular Forms in Algebraic Topology, Lecture Notes in Mathematics, vol. 1326, Berlin: Springer, pp. 1–10, ISBN 3-540-19490-8.
• Landweber, Peter S. (1988), "Elliptic cohomology and modular forms", in Landweber, P. S. (ed.), Elliptic Curves and Modular Forms in Algebraic Topology, Lecture Notes in Mathematics, vol. 1326, Berlin: Springer, pp. 55–68, ISBN 3-540-19490-8.
• Landweber, P. S.; Ravenel, D. & Stong, R. (1995), "Periodic cohomology theories defined by elliptic curves", in Cenkl, M. & Miller, H. (eds.), The Čech Centennial 1993, Contemp. Math., vol. 181, Boston: Amer. Math. Soc., pp. 317–338, ISBN 0-8218-0296-8.
• Lurie, Jacob (2009), "A Survey of Elliptic Cohomology", in Baas, Nils; Friedlander, Eric M.; Jahren, Björn; et al. (eds.), Algebraic Topology: The Abel Symposium 2007, Berlin: Springer, pp. 219–277, doi:10.1007/978-3-642-01200-6, hdl:2158/373831, ISBN 978-3-642-01199-3.

Founding articles

• Elliptic cohomology - Graeme Segal

Extensions to Calabi-Yau manifolds

• K3 Spectra
• Constructing explicit K3 spectra
• The Elliptic curves in gauge theory, string theory, and cohomology