Currently many methods of implementation are available if we want the com'seware to be used in e-learning interactivly with media rich. This paper focuses the attention to the relevance between various implementation...Currently many methods of implementation are available if we want the com'seware to be used in e-learning interactivly with media rich. This paper focuses the attention to the relevance between various implementations in presentation adopted in the courseware and students' learning styles, in order to consider what kind of implemenation or description is preferable to what kind of students or order to support their leaming. We carded out the canonical correlation analysis for this purpose and investigated this relevance on the basis of the experiments. Main results of the experiment are given with detailed disoussion.展开更多
We present a numerical method for efficiently detecting unstable periodic orbits(UPO’s)embedded in chaotic attractors of high-dimensional systems.This method,which we refer to as subspace fixed-point iteration, locat...We present a numerical method for efficiently detecting unstable periodic orbits(UPO’s)embedded in chaotic attractors of high-dimensional systems.This method,which we refer to as subspace fixed-point iteration, locates fixed points of Poincare maps using a form of fixed-point iteration that splits the phase space into appropriate subspaces.In this paper,among a number of possible implementations,we primarily focus on a subspace method based on the Schmelcher-Diakonos(SD)method that selectively locates UPO’s by varying a stabilizing matrix,and present some applications of the resulting subspace SD method to hyperchaotic attractors where the UPO’s have more than one unstable direction.展开更多
文摘Currently many methods of implementation are available if we want the com'seware to be used in e-learning interactivly with media rich. This paper focuses the attention to the relevance between various implementations in presentation adopted in the courseware and students' learning styles, in order to consider what kind of implemenation or description is preferable to what kind of students or order to support their leaming. We carded out the canonical correlation analysis for this purpose and investigated this relevance on the basis of the experiments. Main results of the experiment are given with detailed disoussion.
文摘We present a numerical method for efficiently detecting unstable periodic orbits(UPO’s)embedded in chaotic attractors of high-dimensional systems.This method,which we refer to as subspace fixed-point iteration, locates fixed points of Poincare maps using a form of fixed-point iteration that splits the phase space into appropriate subspaces.In this paper,among a number of possible implementations,we primarily focus on a subspace method based on the Schmelcher-Diakonos(SD)method that selectively locates UPO’s by varying a stabilizing matrix,and present some applications of the resulting subspace SD method to hyperchaotic attractors where the UPO’s have more than one unstable direction.
