二阶系统未知特征重构问题的动态差异方法

IF 0.3 Q4 MATHEMATICS
M. Blizorukova
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引用次数: 1

摘要

本文研究了描述创新扩散过程的非线性方程组的未知特征的动态重构问题。设计了一个求解这些问题的动态变量。假定系统在给定的有限时间间隔上运行。系统相态的演化,即系统的解,是由一个未知输入决定的。一般来说,由于测量不准确,对实际输入(作用于系统)的精确重建是不可能的。因此,如果测量误差和输入信息的步长足够小,则构造对该输入的某种近似,该近似为实际输入提供任意小。基于差分法的动态版本,给出了两种求解该问题的算法。其中一个是针对测量相位矢量的所有坐标的情况,另一个是针对不完全测量的情况。所提出的算法相对于信息噪声和计算误差是稳定的。实际上,它们是来自动态逆问题理论的特殊正则化算法。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
The dynamical discrepancy method in problems of reconstructing unknown characteristics of a second-order system
This paper considers two problems of dynamical reconstruction of unknown characteristics of a system of nonlinear equations describing the process of innovation diffusion through inaccurate measurements of phase states. A dynamical variant for solving these problems is designed. The system is assumed to operate on a given finite time interval. The evolution of the system's phase state, i.e., the solution of the system, is determined by an unknown input. A precise reconstruction of the real input (acting on the system) is, generally speaking, impossible due to inaccurate measurements. Therefore, some approximation to this input is constructed which provides an arbitrary smallness to the real input if the measurement errors and the step of incoming information are sufficiently small. Based on the dynamical version of the discrepancy method, two algorithms for solving the problems in question are specified. One of them is oriented to the case of measuring all coordinates of the phase vector, and the other, to the case of incomplete measurements. The algorithms suggested are stable with respect to informational noises and computational errors. Actually, they are special regularizing algorithms from the theory of dynamic inverse problems.
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