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EXACT BOUNDARY CONTROLLABILITY OF 1-D NONLINEAR SCHRODINGER EQUATION
引用本文:Zong Xiju Zhao Yi Yin Zhaoyang Chi Tao. EXACT BOUNDARY CONTROLLABILITY OF 1-D NONLINEAR SCHRODINGER EQUATION[J]. 高校应用数学学报(英文版), 2007, 22(3): 277-285. DOI: 10.1007/s11766-007-0304-4
作者姓名:Zong Xiju Zhao Yi Yin Zhaoyang Chi Tao
作者单位:[1]Dept. of Math., Zhongshan Univ., Guangzhou 510275, China [2]First Middle School of Tengzhou, Shandong 277013, China [3]School of Control Science and Engineering, Jinan Univ., Jinan 250022, China
摘    要:In this paper, the boundary control problem of a distributed parameter system described by the Schr(o)dinger equation posed on finite interval α≤ x ≤β:{iyt yxx |y|2y = 0,y(α,t) = h1(t),y(β,t) = h2(t) for t > 0 (S)is considered. It is shown that by choosing appropriate control inputs (hj), (j = 1,2) one can always guide the system (S) from a given initial state ψ∈ Hs(α,β),(s ∈ R) to a terminal state ψ∈ Hs(α,β), in the time period [0, T]. The exact boundary controllability is obtained by considering a related initial value control problem of Schr(o)dinger equation posed on the whole line R. The discovered smoothing properties of Schr(o)dinger equation have played important roles in our approach; this may be the first step to prove the results on boundary controllability of (semi-linear) nonlinear Schr(o)dinger equation.

关 键 词:边界可控性 一维非线性薛定谔方程 希尔伯特唯一性方法 控制论
文章编号:10.1007/s11766-007-0304-4
收稿时间:2006-06-28
修稿时间:2006-06-28

Exact boundary controllability of 1-D nonlinear Schrödinger equation
Zong Xiju,Zhao Yi,Yin Zhaoyang,Chi Tao. Exact boundary controllability of 1-D nonlinear Schrödinger equation[J]. Applied Mathematics A Journal of Chinese Universities, 2007, 22(3): 277-285. DOI: 10.1007/s11766-007-0304-4
Authors:Zong Xiju  Zhao Yi  Yin Zhaoyang  Chi Tao
Affiliation:(1) Dept. of Math., Zhongshan Univ., Guangzhou, 510275, China;(2) First Middle School of Tengzhou, Shandong, 277013, China;(3) School of Control Science and Engineering, Jinan Univ., Jinan, 250022, China
Abstract:In this paper, the boundary control problem of a distributed parameter system described by the Schrödinger equation posed on finite interval αxβ: (left{ begin{gathered} iy_t + y_{xx} + |y|^2 y = 0, hfill y(alpha ,t) = h_1 (t),y(beta ,t) = h_2 (t)fort > 0 hfill end{gathered} right.(S)) is considered. It is shown that by choosing appropriate control inputs (h j), (j = 1, 2) one can always guide the system (S) from a given initial state φH s(α, β), (sR) to a terminal state ψH s(α, β), in the time period [0, T]. The exact boundary controllability is obtained by considering a related initial value control problem of Schrödinger equation posed on the whole line R. The discovered smoothing properties of Schrödinger equation have played important roles in our approach; this may be the first step to prove the results on boundary controllability of (semi-linear) nonlinear Schrödinger equation.
Keywords:nonlinear Schr(o)dinger equation  exact boundary controllability  Hilbert uniqueness method.
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