Gradient Flows and the Curvature of Theory Space
Abstract
The metric and potential associated with the gradient property of renormalisation group flow in multiscalar models in d=4- dimensions are studied. The metric is identified with the Zamolodchikov metric of nearly marginal operators on the sphere. An explicit form for the associated Ricci scalar in d=4- is derived, which shows that the space of multiscalar field theories is curved. The potential is identified with a quantity F that was previously proposed as a weakly monotonic function interpolating between the a-theorem in four dimensions and the F-theorem in three dimensions. This implies that the F-theorem can be extended perturbatively to a theorem about gradient flow in d=4-.
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