The authors consider the random iteration of serval functions.Denote byJ(R)the Julia set for the random iteration dynamical system formed by a set of complex functionsR={R 1,R 2,…,R M}.Some sufficient conditions are ...The authors consider the random iteration of serval functions.Denote byJ(R)the Julia set for the random iteration dynamical system formed by a set of complex functionsR={R 1,R 2,…,R M}.Some sufficient conditions are given forJ(R)to have no interior points.Also some conditions are given forJ(R)to have interior points but fail to be the extended plane.In addition,J(az n,bz n)(n≥2,ab≠0)andJ(z 2+c 1,z 2+c 2)are investigated and some interesting results are obtained.展开更多
Random iterated function systems (IFSs) is discussed, which is one of the methods for fractal drawing. A certain figure can be reconstructed by a random IFS. One approach is presented to determine a new random IFS, th...Random iterated function systems (IFSs) is discussed, which is one of the methods for fractal drawing. A certain figure can be reconstructed by a random IFS. One approach is presented to determine a new random IFS, that the figure reconstructed by the new random IFS is the image of the origin figure reconstructed by old IFS under a given affine transformation. Two particular examples are used to show this approach.展开更多
文摘The authors consider the random iteration of serval functions.Denote byJ(R)the Julia set for the random iteration dynamical system formed by a set of complex functionsR={R 1,R 2,…,R M}.Some sufficient conditions are given forJ(R)to have no interior points.Also some conditions are given forJ(R)to have interior points but fail to be the extended plane.In addition,J(az n,bz n)(n≥2,ab≠0)andJ(z 2+c 1,z 2+c 2)are investigated and some interesting results are obtained.
文摘Random iterated function systems (IFSs) is discussed, which is one of the methods for fractal drawing. A certain figure can be reconstructed by a random IFS. One approach is presented to determine a new random IFS, that the figure reconstructed by the new random IFS is the image of the origin figure reconstructed by old IFS under a given affine transformation. Two particular examples are used to show this approach.
