Estimates of matrix solutions of operator equations with random parameters under uncertainties

Q3 Mathematics
O. G. Nakonechnyi, P. Zinko
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引用次数: 0

Abstract

We investigate problems of estimating solutions of linear operator equations with random parameters under conditions of uncertainty. We establish that the guaranteed rms estimates of the matrices are found as solutions of special optimization problems under certain observations of the system state. As the output signals of the system, we have observations that are described by linear functions from the solutions of such equations with random right-hand sides, which have unknown second moments. Under the condition that the observation second moments of the right-hand parts and errors belong to certain sets, it is proved that the guaranteed estimates are expressed through solutions of operator equation systems. When the linear operator is given by the scalar product of rectangular matrices, a quasi-minimax estimate and its error are constructed. It is shown that the quasi-minimax estimation error tends to zero when the number of observations tends to infinity. An example of calculating the guaranteed rms estimate of the matrix's trace, which is a solution of a matrix equation with a random parameter, is given.
不确定条件下带有随机参数的算子方程矩阵解的估计值
我们研究了在不确定条件下对带有随机参数的线性算子方程的解进行估计的问题。我们确定,矩阵的保证均方根估计值是在对系统状态进行特定观测的情况下作为特殊优化问题的解找到的。作为系统的输出信号,我们的观测结果是由带有随机右边的此类方程解的线性函数描述的,这些函数具有未知的第二矩。在观测值右手部分的第二矩和误差属于特定集合的条件下,可以证明保证的估计值是通过算子方程系统的解来表达的。当线性算子由矩形矩阵的标量积给出时,构建了准最小估计及其误差。结果表明,当观测次数趋于无穷大时,准最小估计误差趋于零。给出了计算矩阵迹的保证均方根估计值的示例,矩阵迹是带有随机参数的矩阵方程的解。
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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来源期刊
Matematychni Studii
Matematychni Studii Mathematics-Mathematics (all)
CiteScore
1.00
自引率
0.00%
发文量
38
期刊介绍: Journal is devoted to research in all fields of mathematics.
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