Issue Date | Title | Author(s) | Relation | scopus | WOS | Fulltext/Archive link |
1984 | A chaotic function whose non-wandering set is the Cantor ternary set | Du, Bau-Sen | Proc. Amer. Math. Soc. 92(2), 277-278 | | | |
1998 | A dense orbit almost implies sensitivity to initial conditions | Du, Bau-Sen | Bull. Inst. Math. Acad. Sinica 26(2), 85-94 | | | |
2008 | A note on circulant transition matrices in Markov chains | Du, Bau-Sen; Chou, Wun-Seng; Shiue, Peter J. -S. | LINEAR ALGEBRA AND ITS APPLICATIONS 429(7), 1699-1704 | | | |
1986 | A note on periodic points of expanding maps of the interval | Du, Bau-Sen | Bull. Austral. Math. Soc. 33(3), 435-447 | | | |
1981 | A note on periodic solutions in the vicinity of a center | Du, Bau-Sen | Proc. Amer. Math. Soc. 81(4), 579-584 | | | |
2003 | A refinement of Sharkovskii's theorem on orbit types characterized by two parameters | Du, Bau-Sen; Li, Ming-Chia | J. Math. Anal. Appl. 278(1), 77-82 | | | |
1989 | A simple method which generates infinitely many congruence identities | Du, Bau-Sen | Fibonacci Quarterly 27, 116-124 | | | |
2004 | A simple proof of Sharkovsky's theorem | Du, Bau-Sen | Amer. Math. Monthly 111(7), 595-599 | | | |
2013 | A simple proof of Sharkovsky's theorem rerevisited, Preprint (Version 8, March 13, 2013) | Du, Bau-Sen | A simple proof of Sharkovsky's theorem rerevisited, Preprint (Version 8, March 13, 2013) | | | |
2007 | A simple proof of Sharkovsky's theorem revisited | Du, Bau-Sen | AMERICAN MATHEMATICAL MONTHLY 114(2), 152-155 | | | |
1984 | Almost all points are eventually periodic with minimal period 3 | Du, Bau-Sen | Bull. Inst. Math. Acad. Sinica 12(4), 405-411 | | | |
1986 | An example of a bifurcation from fixed points to period 3 points | Du, Bau-Sen | Nonlinear Analysis: Theory, Methods & Applications 10(7), 639-641 | | | |
2007 | An improved stability criterion with application to the Arneodo-Coullet-Tresser map | Du, Bau-Sen; Hsiau, S. -R.; Li, M. -C.; Malkin, M. | Taiwanese Journal of Mathematics 11(5), 1369-1382 | | | |
1983 | Are chaotic functions really chaotic | Du, Bau-Sen | Bull. Austral. Math. Soc. 28(1), 53-66 | | | |
1985 | Bifurcation of periodic points of some diffeomorphisms on $R^3$ | Du, Bau-Sen | Nonlinear Analysis: Theory, Methods & Applications 9(4), 309-319 | | | |
1999 | Congruence identities arising from dynamical systems | Du, Bau-Sen | Appl. Math. Letters 12(5), 115-119 | | | |
1987 | Dense orbits and dense periodicity on the interval | Du, Bau-Sen | Bull. Inst. Math. Acad. Sinica 15(1), 35-48 | | | |
1989 | Every chaotic interval map has a scrambled set in the recurrent set | Du, Bau-Sen | Bulletin of the Australian Mathematical Society 39(2), 259-264 | | | |
1987 | Examples of expanding maps with some special properties | Du, Bau-Sen | Bull. Austral. Math. Soc. 36, 469-474 | | | |
2003 | Generalized Fermat, double Fermat and Newton sequences | Du, Bau-Sen; Huang, Sen-Shan; Li, Ming-Chia | J. Number Theory 98(1), 172-183 | | | |