rn中一阶Hamilton-Jacobi方程无界解的大时间行为

Asymptot. Anal. Pub Date : 2017-09-25 DOI:10.3233/ASY-181488
G. Barles, Olivier Ley, Thi-Tuyen Nguyen, T. Phan
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引用次数: 5

摘要

研究了Eikonal型一阶凸Hamilton-Jacobi方程$u\_t+H(x,Du)=l(x),$集在整个空间中解的大时间行为$\R^N\times [0,\infty).$。我们假设$l$从下有界,但可以任意增长,因此解也可以任意增长。完整地研究了遍历问题$H(x,Dv)=l(x)+c$的解的结构:与周期设置相反,遍历常数不再是唯一的,从而导致解的大时间行为不同。本文建立了柯西问题(i)在有界初始条件下解的遍历性,以及(ii)在有界初始条件下解的遍历性,在这两种情况下,我们有不同的遍历常数起作用。当解不从下有界时,给出了一般情况下收敛失败的例子。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Large time behavior of unbounded solutions of first-order Hamilton-Jacobi equations in R N
We study the large time behavior of solutions of first-order convex Hamilton-Jacobi Equations of Eikonal type $u\_t+H(x,Du)=l(x),$ set in the whole space $\R^N\times [0,\infty).$ We assume that $l$ is bounded from below but may have arbitrary growth and therefore the solutions may also have arbitrary growth. A complete study of the structure of solutions of the ergodic problem $H(x,Dv)=l(x)+c$ is provided : contrarily to the periodic setting, the ergodic constant is not anymore unique, leading to different large time behavior for the solutions. We establish the ergodic behavior of the solutions of the Cauchy problem (i) when starting with a bounded from below initial condition and (ii) for some particular unbounded from below initial condition, two cases for which we have different ergodic constants which play a role. When the solution is not bounded from below, an example showing that the convergence may fail in general is provided.
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