標題: | 圖的圈覆蓋 Cycle Cover of Graphs |
作者: | 連敏筠 傅恆霖 Hung-Lin Fu 應用數學系所 |
關鍵字: | 圈覆蓋;cycle cover |
公開日期: | 2007 |
摘要: | ㄧ個圖G的圈覆蓋(cycle cover)是收集一些G裡面的圈(cycle),使得G裡面的邊都被覆蓋住(cover)。ㄧ個整數流(integer
flow)是在圖上賦予方向,且給定一個整數函數phi對應到G上所有的邊,使得對所有G裡的點v都滿足由v流出的量等於流入的量。
當所有的phi(e),都滿足-k<phi(e)<k,則phi稱為一個k-整數流(k-flow),如果對所有G上的邊,給的值都不為零,
則phi稱為處處不為零的k-整數流(nowhere-zero k-flow)。在這篇論文中,我們證明:如果Tutte的3-整數流猜測(Tutte's
3-flow conjecture)是對的,則當k是奇數時,對所有的(k-1)-邊連通圖滿足最小度數為k,會有一個處處不為零的6-整數流(6-flow)
phi,使得那些給定奇數值的邊數會大於等於(k-1)/k的總邊數,這會推得圖G有一個圈覆蓋最多只需要(13k+5)/(9k)的總邊數。
當k是偶數時,對所有的(k-1)-邊連通圖滿足最小度數為k,會有一個處處不為零的6-整數流(6-flow)
phi,使得那些給定奇數值的邊數會大於等於(k-2)/(k-1)的總邊數,這會推得圖G有一個圈覆蓋最多只需要(13k-8)/(9(k-1))的總邊數。 A cycle cover of a graph G is a collection of cycles of G which covers all edges of G. The size of a cycle cover is the sum of the lengths of the cycles in the cover. A flow in G under orientation D is an integer-valued function on E(G) such that the output value is equal to the input value for each v in V(G). The support of ph(i) is defined by S(ph(i)) = {e in E(G) : phi(e) not equalto 0}. For a positive integer k, if −k < (e) < k for every e in E(G), then is called a k-flow, and furthermore, if S(phi) = E(G), then is called a nowhere-zero k-flow. In this thesis we prove: (1) if Tutte’s 3-Flow Conjecture is true, then every (k − 1)-edge-connected graph G with ?minimum degree = k has a nowhere-zero 6-flow such that when k is odd |Eodd(phi)| not less than (k-1)\k |E(G)| and when k is even |Eodd(phi)| not less than (k-2)\(k-1) |E(G)| ; (2) If a (k−1)-edge-connected graph G with minimum degree = k has a nowhere-zero 6-flow such that when k is odd |Eodd(phi)| not less than (k-1)\k |E(G)|, then G has a cycle cover in which the size of the cycle cover is at most (13k+5)\9k |E(G)| and when k is even |Eodd(phi)| not less than (k-2)\(k-1) |E(G)|, then G has a cycle cover in which the size of the cycle cover is at most (13k−8)\9(k−1) |E(G)|, where Eodd(phi)={e in E(G) : phi(e) is odd }. |
URI: | http://140.113.39.130/cdrfb3/record/nctu/#GT009422539 http://hdl.handle.net/11536/81317 |
Appears in Collections: | Thesis |
Files in This Item:
If it is a zip file, please download the file and unzip it, then open index.html in a browser to view the full text content.