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Abstract

In this paper, we examine the holographic complexity of a theory of Einstein-Maxwell with a non-minimal coupling $R^2 F_{\mu \nu }F^{\mu \nu} $ term via complexity=anything. We introduce a perturbative black brane solution in AdS spacetime up to the first order of the non-minimal coupling. Because the model exhibits the resistivity proportional to the temperature, it could describe strange metals. The complexity of the solution could be characterized by three quantities: the conserved charge, the non-minimal coupling and the generalized term in the complexity. The generalized term is chosen to be $C^2$, the Weyl squared tensor, $R^2F^2$ and $F^2$. The physical interpretation of the three quantities has been provided where the generalized term is interpreted as a bulk penalty factor, the non-minimal coupling and the conserved charge as an effective scrambling time of the dual theory which contains the choice of the generalization parameter.