Well-Posedness for Quintic Energy Critical Wave in 3D Cylindrical Convex Domains
Abstract
In this paper, we establish the well-posedness in energy space for the quintic energy critical wave inside a cylindrical convex domain ⊂R3 with smooth boundary ∂≠. The key tools to prove local well-posedness are the dispersive estimates obtained in L,L1,L3 and the Strichartz estimates in L2. We point out that our result on the local and global existence of the solution to the wave equation in the cylindrical domain setting interpolates between that of in Euclidean space R3 (see MG) and in any bounded domains in R3 (see BLP). Moreover, the result of the Strichartz estimates in our setting is strong enough when combined with the arguments in BLP,SS2 so that we can extend local to global well-posedness.
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