Invariance of the white noise for KdV
Abstract
We prove the invariance of the mean 0 white noise for the periodic KdV. First, we show that the Besov-type space bsp, ∞, sp <-1, contains the support of the white noise. Then, we prove local well-posedness in bsp, ∞ for p= 2+, s = -1/2+ such that sp <-1. In establishing the local well-posedness, we use a variant of the Bourgain spaces with a weight. This provides an analytical proof of the invariance of the white noise under the flow of KdV obtained in Quastel-Valko.
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