摘要
混沌投资时间序列的分形维数谱的异变有广泛的应用 .在文 [1]的基础上 ,该文探讨混沌投资时间序列的分形维数谱的静态异变和动态异变 ,获得五个有用的定理 .
Many investment organizations and researchers have respectively established their investment mathematics models so that they can be applied to policy making.However,it's difficult to do so in reality or the applied time period will disappear quickly.After being further studied,it's found that,besides the problem of investment mathematics model itself,the phasic change of spectrum of fractal dimension for chaotic investment time series is an important factor that shouldn't be neglected.On the basis of thesis,this thesis will focus on the static and dynamic states of the phasic change of spectrum of fractal dimension for chaotic investment time series and brief introduction of its application.
出处
《广西师范学院学报(自然科学版)》
2003年第1期23-25,共3页
Journal of Guangxi Teachers Education University(Natural Science Edition)
基金
泉州师范学院专款资助科研项目
关键词
混沌投资时间序列
分形维数谱
静态异变
动态异变
单峰混沌映射
投资决策
chaos
investment
time series
static state of phasic change
dynamic state of phasic change
spectrum of fractal dimension
