Near-extremal hydrodynamics and the holographic product formula
Abstract
The holographic product formula is used to determine the general form taken by holographic spectral functions in the near-extremal hydrodynamic regime, with energy ω, momentum k and temperature T much smaller than a hard scale μ. The resulting expressions simplify in the extremal limit T ω,k μ, for which the low-temperature gapless modes and the IR conformal behavior factorize. In some cases, this factorization extends to the general near-extremal regime ω,k,Tμ at leading order in T/μ. Several examples are discussed with different types of gapless modes and IR CFTs, including new numerical results for low temperature quasi-normal modes. We end with a concrete application that shows how the inclusion of the IR conformal behavior improves the description of the spectral function at low energies.
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