Chaotic uncertainty and statistical inference for natural chaotic systems: Choosing predictors for multiple season ahead prediction of precipitation, Extended and Annotated

Michael LuValle
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Abstract

Here we define natural chaotic systems, like the earths weather and climate system, as chaotic systems which are open to the world so have constantly changing boundary conditions, and measurements of their states are subject to errors. In such systems the chaoticity, amplifying error exponentially fast, is so confounded with the boundary condition fluctuations and the measurement error, that it is impossible to consistently estimate the trajectory of the system much less predict it. Although asymptotic theory exists for estimating the conditional predictive distributions, it is hard to find where this theory has been applied. Here the theory is reviewed, and applied to identifying useful predictive variables for simultaneous multiseason prediction of precipitation with potentially useful updating possible. This is done at two locations, one midocean the other landlocked. The method appears to show promise for fast exploration of variables for multiseason prediction.
自然混沌系统的混沌不确定性和统计推断:为多季降水超前预测选择预测因子》,扩展和注释版
在这里,我们将自然混沌系统(如地球的天气和气候系统)定义为对世界开放的混沌系统,其边界条件不断变化,对其状态的测量受到误差的影响。在这种系统中,混沌性会以指数级的速度放大误差,与边界条件波动和测量误差混杂在一起,因此不可能始终如一地估计系统的轨迹,更不用说预测它了。虽然存在估计条件预测分布的渐近理论,但很难找到应用这一理论的地方。本文对这一理论进行了回顾,并将其应用于识别有用的预测变量,以同时预测多季节降水量,并可能进行有用的更新。这是在两个地点进行的,一个在洋中,另一个在内陆。该方法似乎有望为多季节预测快速探索变量。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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