In this paper, we consider the Cauchy problem for the generalized KdV equation with rough data and random data. Firstly, we prove that u(x,t)⟶u(x,0) as t⟶0 for a.e. x∈R with u(x,0)∈Hs(R)(s>21−k2,k≥8). Secondly, we prove that u(x,t)⟶e−t∂x3u(x,0) as t⟶0 for a.e. x∈R with u(x,0)∈Hs(R)(s>21−k2,k≥8). Thirdly, we prove that t⟶0limu(x,t)−e−t∂x3u(x,0)Lx∞=0 with u(x,0)∈Hs(R)(s>21−k+12,k≥5). Fourthly, by using Strichartz estimates, probabilistic Strichartz estimates, we establish the probabilistic well-posedness in Hs(R)(s>max{k+11(21−k2),61−k2}) with random data. Our result improves the result of Hwang, Kwak (Proc. Amer. Math. Soc. 146(2018), 267-280.). Fifthly, we prove that ∀ϵ>0,∀ω∈ΩT,t⟶0limu(x,t)−e−t∂x3uω(x,0)Lx∞=0 with u(x,0)∈Hs(R)(s>61,k≥6), where P(ΩT)≥1−C1exp(−T48kϵ∥u(x,0)∥Hs2C) and uω(x,0) is the randomization of u(x,0). Finally, we prove that ∀ϵ>0,∀ω∈ΩT,t⟶0lim∥u(x,t)−uω(x,0)∥Lx∞=0 with P(ΩT)≥1−C1exp(−T48kϵ∥u(x,0)∥Hs2C) and u(x,0)∈Hs(R)(s>61,k≥6).
@article{arxiv.2011.07128,
title = {The Cauchy problem for the generalized KdV equation with rough data and random data},
author = {Wei Yan and Xiangqian Yan and Jinqiao Duan and Jianhua Huang},
journal= {arXiv preprint arXiv:2011.07128},
year = {2021}
}