Infinitesimal invariance of completely Random Measures for 2D Euler Equations

IF 0.4 Q4 STATISTICS & PROBABILITY
Francesco Grotto, G. Peccati
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引用次数: 7

Abstract

We consider suitable weak solutions of 2-dimensional Euler equations on bounded domains, and show that the class of completely random measures is infinitesimally invariant for the dynamics. Space regularity of samples of these random fields falls outside of the well-posedness regime of the PDE under consideration, so it is necessary to resort to stochastic integrals with respect to the candidate invariant measure in order to give a definition of the dynamics. Our findings generalize and unify previous results on Gaussian stationary solutions of Euler equations and point vortices dynamics. We also discuss difficulties arising when attempting to produce a solution flow for Euler’s equations preserving independently scattered random measures.
二维欧拉方程完全随机测度的无穷小不变性
我们考虑了有界域上二维欧拉方程的适当弱解,并证明了这类完全随机测度对动力学是无穷小不变的。这些随机场样本的空间正则性不在所考虑的PDE的适定性范围内,因此有必要求助于关于候选不变测度的随机积分,以给出动力学的定义。我们的发现推广和统一了以前关于欧拉方程高斯平稳解和点涡动力学的结果。我们还讨论了当试图为保留独立分散随机测度的欧拉方程产生解流时出现的困难。
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来源期刊
CiteScore
1.30
自引率
0.00%
发文量
22
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