Interior structure of black holes with nonlinear terms
Abstract
We investigate the oscillation of the Kasner exponent pt near critical point of the hairy black holes dual to holographic superfluid and reveal a clear inverse periodicity f(Tc/(Tc-T)) in a large region below the critical temperature. We first introduce the fourth-power term with a coefficient λ to adjust the oscillatory behavior of the Kasner exponent pt near the critical point. Importantly, we show that the nonlinear coefficient λ provides accurate control of this periodicity: a positive λ stretches the region, while a negative λ compresses it. By contrast, the influence of another coefficient τ is more concentrated in regions away from the critical point. This work provides a new perspective for understanding the complex dynamical structure inside black holes and extends the actively control from the fourth- and sixth-power term into the black hole interior region.
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