**Title:** Field theories and cohomology

**Speaker:** Stephan Stolz

**Speaker Info:** Notre Dame

**Brief Description:**

**Special Note**:

**Abstract:**

Graeme Segal suggested two decades ago that the generalized cohomology theory now known as "Topological Modular Form Theory" of a manifold X should be related to families of 2-dimensional field theories parametrized by X. This is an analog of the well-known statement that homotopy classes of families of Fredholm operators parametrized by X can be identified with the K-theory of X.In this talk on joint work with Peter Teichner, I will present a conjectural picture of TMF(X) as homotopy classes of families of supersymmetric 2-dimensional Euclidean field theories parametrized by X. Evidence for the conjecture comes from an analogous description of K(X) in terms of 1-dimensional field theories, and our result that the partition function of a supersymmetric 2-dimensional Euclidean field theory is a modular form. The latter is the main focus of the talk.

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