Three remarks on the convergence of some discretized second order gradient-like systems

Mohamed Ali Jendoubi, Morgan Pierre
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Abstract

We study several discretizations of a second order gradient-like system with damping. We first consider an explicit scheme with a linear damping in finite dimension. We prove that every solution converges if the nonlinearity satisfies a global Lojasiewicz inequality. Convergence rates are also established. In the case of a strong nonlinear damping, we prove convergence of every solution for a fully implicit scheme in the one-dimensional case, even if the nonlinearity does not satisfy a Lojasiewicz inequality. The optimality of the damping is also established. Numerical simulations illustrate the theoretical results.

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关于某些离散化二阶梯度样系统收敛性的三点评论
我们研究了带有阻尼的二阶梯度样系统的几种离散方法。我们首先考虑的是有限维度下具有线性阻尼的显式方案。我们证明,如果非线性满足全局 Lojasiewicz 不等式,则每个解都会收敛。我们还确定了收敛率。在强非线性阻尼的情况下,即使非线性不满足 Lojasiewicz 不等式,我们也证明了一维情况下全隐式方案的每个解的收敛性。我们还确定了阻尼的最优性。数值模拟说明了理论结果。
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