摘要
A tandem duplication random loss (TDRL) operation duplicates a contiguous segment of genes, followed by the random loss of one copy of each of the duplicated genes. Although the importance of this operation is founded by several recent biological studies, it has been investigated only rarely from a theoretical point of view. Of particular interest are sorting TDRLs which are TDRLs that, when applied to a permutation representing a genome, reduce the distance towards another given permutation. The identification of sorting genome rearrangement operations in general is a key ingredient of many algorithms for reconstructing the evolutionary history of a set of species. In this paper we present methods to compute all sorting TDRLs for two given gene orders. In addition, a closed formula for the number of sorting TDRLs is derived and further properties of sorting TDRLs are investigated. It is also shown that the theoretical findings are useful for identifying unique sorting TDRL scenarios for mitochondrial gene orders.
原文 | 英語 |
---|---|
頁(從 - 到) | 32-48 |
頁數 | 17 |
期刊 | Journal of Discrete Algorithms |
卷 | 9 |
發行號 | 1 |
DOIs | |
出版狀態 | 已發佈 - 2011 3月 |
對外發佈 | 是 |
ASJC Scopus subject areas
- 理論電腦科學
- 離散數學和組合
- 計算機理論與數學