基因组片段填充算法研究

目 录

第 1 章 绪论 ·········································································.1

1.1 研究背景和意义 ························································.1

1.2 研究现状 ···································································.4

1.3 算法知识简介 ···························································.6

1.3.1 算法及算法的计算复杂性 ···········································.6

1.3.2 P 类、NP 类及 NPC 类问题 ·········································.7

1.3.3 近似算法和近似性能比 ··············································.9

1.3.4 贪婪、局部搜索策略·················································10

1.4 本书的主要贡献 ························································11

1.4.1 化公共邻接距离的基因组片段填充问题的 定义修正 ·····12

1.4.2 SF-MNCA 问题特殊实例的多项式时间精确算法 ················12

1.4.3 双面 SF-MNCA 问题的 1.5-近似算法······························13

1.4.4 单面 SF-MNCA 问题的 1.25-近似算法 ····························13

1.4.5 基于加权双向 overlap 图的可传递约减算法······················13

1.5 本书的组织结构 ························································14

第 2 章 基因组片段填充问题介绍········································17

2.1 计算基因组学相关概念·············································17

2.2 邻接、断点 ·······························································18

2.3 SF-MNCA 问题 ·························································22

2.4 封闭符号“#”··························································23

2.5 SF-MNCA 问题中的几个特性 ···································24

2.6 断点的分类 ·······························································28

2.7 k-Type-1 类型串、k-Type-2 类型串、插入串·············29

VII

第 3 章 特殊情况下的多项式时间精确算法 ·························33

3.1 引言 ··········································································33

3.2 算法的前提 ·······························································33

3.3 算法的实现 ·······························································39

3.4 算法可行解的性 ················································43

3.5 算法的时间复杂度分析·············································45

第 4 章 双面 SF-MNCA 问题的 1.5-近似算法介绍 ··············47

4.1 引言 ··········································································47

4.2 公共邻接数的一个上界·············································48

4.3 双面填充算法 ···························································61

4.4 算法的时间复杂度分析·············································65

第 5 章 单面 SF-MNCA 问题的 1.25-近似算法介绍 ············67

5.1 引言 ··········································································67

5.2 问题描述 ···································································69

5.3 插入 Type-1 串 ··························································69

5.3.1 插入 1-Type-1 串······················································69

5.3.2 插入 2-Type-1 串······················································70

5.3.3 插入 3-Type-1 串······················································72

5.3.4 插入剩余缺失基因 ···················································73

5.3.5 完整算法描述 ·························································75

5.4 近似算法分析 ···························································77

5.4.1 改进的近似下界 ······················································77

5.4.2 近似性能比分析 ······················································79

第 6 章 序列拼接的信息约减问题········································89

6.1 引言 ··········································································89

6.2 相关知识简介 ···························································90

6.2.1 碱基 ····································································90

VIII

6.2.2 加权双向 overlap 图 ··················································91

6.3 可传递约减算法 ························································93

6.3.1 可传递约减原理及正确性证明 ·····································93

6.3.2 可传递约减在加权双向 overlap 图中的实现······················94

6.3.3 可传递约减算法的设计与实现 ·····································95

6.4 实验及结果分析 ························································97

结束语 ··················································································101

参考文献 ··············································································105