Global dynamics of a supercritical wave equation in a large data regime
Abstract
We prove the existence of global solutions to the nonlinear wave equation in R1+3 Φtt - ΔΦ Φ|Φ|p-1 = 0 in the energy-supercritical regime p>5, for a class of large initial data. Our initial data can be decomposed into two pieces, one which is dispersed in the sense of having large L2 norm, while the other piece takes a localised short-pulse form. Consequently, we can obtain global existence for a class of initial data which is large in every homogeneous Sobolev norm Hsx with s ≥ 0.
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