Abstract
In an environment with high-density neutrinos formed in a core-collapse supernova (CCSN), the neutrinos exhibit nonlinear and complex oscillation behaviors due to their self-interactions. The onset of this nonlinear oscillation can be investigated by linearizing the evolution equation for small perturbations around the flavor eigenstates. While the condition under which the flavor eigenstates are unstable has been investigated in many studies, how the perturbations evolve in spacetime has yet to be elucidated. In this paper, we analytically and correctly derive the asymptotic behaviors of the linear perturbations in 4-dimensional spacetime in the linear regime for a 2-beam neutrino model using the recently proposed Lefschetz thimble formulation. The result suggests that the perturbations grow in the directions between the two neutrino beams. We also briefly discuss the possible effects of neutrino flavor conversion on the explosion mechanism of a CCSN. In particular, the result implies that the flavor instability in the preshock region may propagate into the postshock region, contrary to the previous study focusing on the group velocity in 1-dimensional space. How to treat the case of a more realistic continuous spectrum is also discussed.
Highlights
Neutrino oscillation is a well-known phenomenon in which the survival probability of each neutrino flavor oscillates due to the deviations between the flavor eigenstates and mass eigenstates of neutrinos
We have analytically derived the asymptotic form of the linear perturbations for a two-beam model and highlighted the importance of four-dimensional perturbations for collective neutrino oscillations
We have shown that collective neutrino oscillations might influence shock heating in the decoupling region and in the preshock region of a corecollapse supernova (CCSN)
Summary
Neutrino oscillation is a well-known phenomenon in which the survival probability of each neutrino flavor oscillates due to the deviations between the flavor eigenstates and mass eigenstates of neutrinos. We developed a general and powerful method to investigate the spatiotemporal evolution of linear perturbations by using the Lefschetz thimble formulation [57] This formulation can be used to treat multidimensional perturbations for arbitrary DRs. In this paper, we apply this method to the collective neutrino flavor conversion in a two-beam neutrino model and reveal the flavor conversion behaviors in four-dimensional spacetime. We apply this method to the collective neutrino flavor conversion in a two-beam neutrino model and reveal the flavor conversion behaviors in four-dimensional spacetime This is the first study to treat the spatiotemporal evolution of collective neutrino oscillations in four-dimensional spacetime, this is done in the linear regime.
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