Finite-N Bootstrap Constraints in Matrix and Tensor Models

Abstract

We explore how matrix bootstrap techniques can be used to constrain matrix and tensor models at finite N, where N is the dimension of the matrix/tensor, taking a Gaussian model with a quartic interaction as example. For matrix models, we find further evidence that bounds do not depend explicitly on N, but rather on properties of multi-trace expectation values. For tensor models, the structure of the Schwinger-Dyson equations allow for bounds that vary as a function of N, admitting a broader scan of the parameter space of the theory. In the latter case, we find novel bounds on the two-point function as a function of the quartic coupling of the theory.

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