Consequences of the choice of a particular basis of L2(S3) for the cubic wave equation on the sphere and the Euclidian space
Abstract
In this paper, the almost sure global well-posedness of the cubic non linear wave equation on the sphere is studied when the initial datum is a random variable with values in low regularity spaces. The domain is first the 3D sphere, thanks to the existence of a uniformly bounded in Lp basis of L2(S3) and then the result is extended to 3 thanks to the Penrose transform.
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