Solutions of the wave equation bounded at the Big Bang
Abstract
By solving a singular initial value problem, we prove the existence of solutions of the wave equation gφ=0 which are bounded at the Big Bang in the Friedmann-Lemaitre-Robertson-Walker cosmological models. More precisely, we show that given any function A ∈ H3() (where =Rn, Sn or Hn models the spatial hypersurfaces) there exists a unique solution φ of the wave equation converging to A in H1() at the Big Bang, and whose time derivative is suitably controlled in L2().
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