跳到主要內容

簡易檢索 / 詳目顯示

研究生: 李世仁
Lee, Shih-Jen
論文名稱: 凸多邊形的三角形化與二元樹的一對一證明
A Bijective Proof from Triangulated Convex Polygons to Binary Trees
指導教授: 李陽明
Li, Young-Ming
學位類別: 碩士
Master
系所名稱: 理學院 - 應用數學系
Department of Mathematical Sciences
論文出版年: 1996
畢業學年度: 84
語文別: 英文
論文頁數: 31
中文關鍵詞: 凸多邊的三角形化
相關次數: 點閱:266下載:0
分享至:
查詢本校圖書館目錄 查詢臺灣博碩士論文知識加值系統 勘誤回報

  • How many ways can a convex polygon of n(≥3) sides be triangulated by diagonals that do not intersect? The problem was first proposed by Leonard Euler. Instead of setting up a recurrence relation and using the method of generating function to solve it, we shall set up a one-to-one correspondence between the convex-polygon triangulations we are trying to count the rooted binary trees that have already been counted. Let bn denote the number of rooted ordered binary trees with n vertices and let tn denote the number of triangulations of convex polygon with n sides. We conclude that tn=bn=1/(n-1) ((2n-4)¦(n-2)).

    1 Introduction 1
    2 Triangulation of Polygon 2
    2.1Traversal of triangulation..........2
    2.2Triangulating..........5
    3 Binary Search Trees 7
    3.1Preliminary..........7
    3.2Mapping..........8
    4 Bijection on Unlabeled Binary Tress 14
    4.1Existence..........14
    4.2Bijectin..........16
    5 Conclusion 20
    A Counting Binary Tress 21
    B Note 23

    [1] Ralph P. Grimaldi. Discrete and Combinatorial Mathematics: A n Applied Introduction.3rd ed .Addison- Wesley, 1994.
    [2] Ellis Horowit.z and Sartaj Sahni . Fundamentals of Data Struchlres. Computer Science Press,Inc., 1982.
    [3] Richard A. Brualdi. Introductory Combinatorics. Elsevier North-Holland; Inc., 1977.
    [4] Jean-Paul Tremblay and Richard B. Bunt. An Introduction to Computer Science: An Algorithmic Approach.McGraw-Hill: Inc. , 1979.
    [5] C. L. Liu . Introduction to Combinatorial 111athcmatics. McGraw-Hill; Inc., 1968.

    無法下載圖示 (限達賢圖書館四樓資訊教室A單機使用)
    QR CODE
    :::