Аннотация
At present, the strongest upper limit on $m_\nu$, the sum of neutrino
masses, is from cosmological measurements. However, this bound assumes that the
neutrinos are stable on cosmological timescales, and is not valid if the
neutrino lifetime is less than the age of the universe. In this paper, we
explore the cosmological signals of theories in which the neutrinos decay into
invisible dark radiation on timescales of order the age of the universe, and
determine the bound on the sum of neutrino masses in this scenario. We focus on
the case in which the neutrinos decay after becoming non-relativistic. We
derive the Boltzmann equations that govern the cosmological evolution of
density perturbations in the case of unstable neutrinos, and solve them
numerically to determine the effects on the matter power spectrum and lensing
of the cosmic microwave background. We find that the results admit a simple
analytic understanding. We then use these results to perform a Monte Carlo
analysis based on the current data to determine the limit on the sum of
neutrino masses as a function of the neutrino lifetime. We show that in the
case of decaying neutrinos, values of $m_\nu$ as large as 0.9 eV are
still allowed by the data. Our results have important implications for
laboratory experiments that have been designed to detect neutrino masses, such
as KATRIN and KamLAND-ZEN.
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