Invariant measure for continuous open chain of contours with discrete time

IF 0.9 Q3 MATHEMATICS, APPLIED
Marina V. Yashina, Alexander G. Tatashev
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引用次数: 0

Abstract

A dynamical system is studied. This system belongs to the class of contour networks introduced by A.P. Buslaev. The system is a version of the system called an open chain of contours. Continuous and discrete versions of the system were considered earlier. The system contains N contours. There is one adjacent contour for the utmost left and the utmost right contour, and there are two adjacent contours for any other contour. There is a common point of any two adjacent contours. This point is called a node. There is a cluster in each contour. For the continuous version, the cluster is a segment, moving with constant velocity if there is no delay. For the discrete version, the cluster is a group of adjacent particles. Delays are due to that two clusters may not move through the same node simultaneously. The main system characteristic, studied earlier, is the average velocity of clusters. In this paper, the continious and discrete version of the open chain of contours are considered. The following version of the system is also considered. Each cluster is a segment, and the cluster is shifted onto the distance α at any discrete moment if no delay occurs. We have obtained the limit distribution of the system states. We have also obtained the limit state distribution (invariant measure) for the open chain of contours with continuous state space and continuos time and for the open chain of contours with discrete state space and discrete time.

离散时间连续开链轮廓的不变测度
研究了一个动力系统。该系统属于A.P. Buslaev提出的等高线网络。该系统是称为开放轮廓链的系统的一个版本。前面已经考虑了系统的连续和离散版本。系统包含N个轮廓。最大左等高线和最大右等高线各有一条相邻的等高线,其他等高线各有两条相邻的等高线。任何两条相邻的等高线都有一个公点。这个点称为节点。每个轮廓线中都有一个簇。对于连续版本,集群是一个段,如果没有延迟,则以恒定速度移动。对于离散的版本,簇是一组相邻的粒子。延迟是由于两个集群可能不会同时通过同一个节点。前面研究过的主要系统特性是星团的平均速度。本文研究了轮廓开链的连续型和离散型。还考虑了系统的以下版本。每个簇是一个段,如果不发生延迟,簇在任意离散时刻移动到距离α上。得到了系统状态的极限分布。得到了具有连续状态空间和连续时间的开链等高线和具有离散状态空间和离散时间的开链等高线的极限状态分布(不变测度)。
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
CiteScore
2.20
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0.00%
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