Anomalies, conformal manifolds, and spheres

Abstract

Abstract: The two-point function of exactly marginal operators leads to a universal contribution to the trace anomaly in even dimensions. We study aspects of this trace anomaly, emphasizing its interpretation as a sigma model, whose target space (Formula presented.) is the space of conformal field theories (a.k.a. the conformal manifold). When the underlying quantum field theory is supersymmetric, this sigma model has to be appropriately supersymmetrized. As examples, we consider in some detail (Formula presented.) and (Formula presented.) supersymmetric theories in d = 2 and (Formula presented.) supersymmetric theories in d = 4. This reasoning leads to new information about the conformal manifolds of these theories, for example, we show that the manifold is Kähler-Hodge and we further argue that it has vanishing Kähler class. For (Formula presented.) theories in d = 2 and (Formula presented.) theories in d = 4 we also show that the relation between the sphere partition function and the Kähler potential of (Formula presented.) follows immediately from the appropriate sigma models that we construct. Along the way we find several examples of potential trace anomalies that obey the Wess-Zumino consistency conditions, but can be ruled out by a more detailed analysis.