Black-bounce solutions in a k-essence theory under the effects of bumblebee gravity
Abstract: In the present study, we analyze the effects of violation of Lorentz symmetry for black-bounce solutions in a $k$-essence theory that has the form of a power law for the configuration $n=1/3$. We perform such analysis for a known model explored in previous work $\Sigma2=x2+a2$ and complement the proposal with a new black-bounce model for the area functions $\Sigma2_1=\sqrt{x4+d4}$. This model has the Schwarzschild-de Sitter asymptomatic behavior for $x\to{-\infty}$, and we investigate the scalar field, potential, and energy conditions for both models. We have shown that the violation of Lorentz symmetry can be generated through $k$-essence without the need for an additional field. These results corroborate the validation of other previously investigated wormhole solutions.
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