English

The Cauchy problem for the generalized KdV equation with rough data and random data

Analysis of PDEs 2021-08-31 v2

Abstract

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)u(x,t)\longrightarrow u(x,0) as t0t\longrightarrow0 for a.e. xRx\in \mathbb{R} with u(x,0)Hs(R)(s>122k,k8).u(x,0)\in H^{s}(\mathbb{R})(s>\frac{1}{2}-\frac{2}{k},k\geq8). Secondly, we prove that u(x,t)etx3u(x,0)u(x,t)\longrightarrow e^{-t\partial_{x}^{3}}u(x,0) as t0t\longrightarrow0 for a.e. xRx\in \mathbb{R} with u(x,0)Hs(R)(s>122k,k8).u(x,0)\in H^{s}(\mathbb{R})(s>\frac{1}{2}-\frac{2}{k},k\geq8). Thirdly, we prove that limt0u(x,t)etx3u(x,0)Lx=0\lim\limits_{t\longrightarrow 0}\left\|u(x,t)-e^{-t\partial_{x}^{3}}u(x,0)\right\|_{L_{x}^{\infty}}=0 with u(x,0)Hs(R)(s>122k+1,k5)u(x,0)\in H^{s}(\mathbb{R})(s>\frac{1}{2}-\frac{2}{k+1},k\geq5). Fourthly, by using Strichartz estimates, probabilistic Strichartz estimates, we establish the probabilistic well-posedness in Hs(R)(s>max{1k+1(122k),162k})H^{s}(\mathbb{R})\left(s>{\rm max} \left\{\frac{1}{k+1}\left(\frac{1}{2}-\frac{2}{k}\right), \frac{1}{6}-\frac{2}{k}\right\}\right) 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,\forall \epsilon>0, ωΩT,\forall \omega \in \Omega_{T}, limt0u(x,t)etx3uω(x,0)Lx=0\lim\limits_{t\longrightarrow0}\left\|u(x,t)-e^{-t\partial_{x}^{3}}u^{\omega}(x,0)\right\|_{L_{x}^{\infty}}=0 with u(x,0)Hs(R)(s>16,k6),u(x,0)\in H^{s}(\mathbb{R})(s>\frac{1}{6},k\geq6), where P(ΩT)1C1exp(CTϵ48ku(x,0)Hs2){\rm P}(\Omega_{T})\geq 1- C_{1}{\rm exp} \left(-\frac{C}{T^{\frac{\epsilon}{48k}}\|u(x,0)\|_{H^{s}}^{2}}\right) and uω(x,0)u^{\omega}(x,0) is the randomization of u(x,0)u(x,0). Finally, we prove that ϵ>0,\forall \epsilon>0, ωΩT,limt0u(x,t)uω(x,0)Lx=0\forall \omega \in \Omega_{T}, \lim\limits_{t\longrightarrow0}\left\|u(x,t)-u^{\omega}(x,0)\right\|_{L_{x}^{\infty}}=0 with P(ΩT)1C1exp(CTϵ48ku(x,0)Hs2){\rm P}(\Omega_{T})\geq 1- C_{1}{\rm exp} \left(-\frac{C}{T^{\frac{\epsilon}{48k}}\|u(x,0)\|_{H^{s}}^{2}}\right) and u(x,0)Hs(R)(s>16,k6)u(x,0)\in H^{s}(\mathbb{R})(s>\frac{1}{6},k\geq6).

Keywords

Cite

@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}
}
R2 v1 2026-06-23T20:12:05.738Z