摘要
引入双参数随机置换,考虑了具有参数p,q的随机Sierpinski垫的各种形态的相位,讨论了当p,q跨跃某些相位曲线时,其构成形态的变化情形,它包括了q=0的Sierpinski垫和q=p的Mandelbrot渗流模型.
With the random substitution with double parameters introduced in, all forms of phase of therandom Sierpinski carpet with parameter p and q are taken into account. A discussion is made on the changesof structure forms as p or q jump over some phase curves,including Sierpinski carpet process if q = 0 andMandelbrot percolation process if q ̄p.
出处
《东北大学学报(自然科学版)》
EI
CAS
CSCD
1995年第2期214-218,共5页
Journal of Northeastern University(Natural Science)
基金
国家自然科学基金