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dc.contributor.author李明佳en_US
dc.contributor.authorLI MING-CHIAen_US
dc.date.accessioned2014-12-13T10:31:08Z-
dc.date.available2014-12-13T10:31:08Z-
dc.date.issued2005en_US
dc.identifier.govdocNSC94-2115-M009-020zh_TW
dc.identifier.urihttp://hdl.handle.net/11536/90738-
dc.identifier.urihttps://www.grb.gov.tw/search/planDetail?id=1093445&docId=205910en_US
dc.description.abstract在[1]中,我們已經考慮了一大類能夠轉成差分方程的多項式動態系統,而且證明了此類的動態系統的非遊蕩集是有界的。在[2]中,我們研究非退化性的同臨相切,證明了同臨相切點會被一串一致雙曲不變集所聚集。在[3]中,我們證明高維度的Henon函數和ACT函數有混沌現象。 在此研究計畫中,我們打算結合上述的數學結論與想法,進一步考慮一類能夠轉化成差分方程的動態系統函數族,使用即將建立的推廣性隱函數定理,我們希望證明當參數接近奇異極限時,動態函數會具有馬蹄結構所以有混沌現象。zh_TW
dc.description.abstractIn the previous work [1], we have considered a wild class of polynomial maps which turns into a class of difference equations and showed that for any dynamical systems from this class, the nonwandering set is bounded. In [2], we also consider nondegenerate homoclinic tangency and shows that the homoclinic point is accumulated by a sequence of uniformly hyperbolic invariant sets. In [3], we have shown that the generalized high-dimensional Henon maps and the ACT map have chaotic behaviors. In this project, we intend to combine the above mathematical ideas. First, we consider a wild family of dynamical systems which can be derived into a family of difference equations. Then using a generalized version of the implicit function theorem which we will establish, we want to show that for any dynamical systems near 「singular limit」, there exists a horseshoe structure and hence chaotic phenomena occur.en_US
dc.description.sponsorship行政院國家科學委員會zh_TW
dc.language.isozh_TWen_US
dc.title奇異差分方程擾動後的混沌動態現象(I)zh_TW
dc.titleChaotic Dynamics of Perturbed Singular Difference Equations(I)en_US
dc.typePlanen_US
dc.contributor.department國立交通大學應用數學系(所)zh_TW
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