Lower bounding edit distances between permutations
نویسنده
چکیده
A number of fields, including the study of genome rearrangements and the design of interconnection networks, deal with the connected problems of sorting permutations in as few moves as possible, using a given set of allowed operations, or computing the number of moves the sorting process requires, often referred to as the distance of the permutation. These operations often act on just one or two segments of the permutation, e.g., by reversing one segment or exchanging two segments. The cycle graph of the permutation to sort is a fundamental tool in the theory of genome rearrangements and has proved useful in settling the complexity of many variants of the above problems. In this paper, we present an algebraic reinterpretation of the cycle graph of a permutation π as an even permutation π and show how to reformulate our sorting problems in terms of particular factorizations of the latter permutation. Using our framework, we recover known results in a simple and unified way and obtain a new lower bound on the prefix transposition distance (where a prefix transposition displaces the initial segment of a permutation), which is shown to outperform previous results. Moreover, we use our approach to improve the best known lower bound on the prefix transposition diameter from 2n/3 to 3n/4 and investigate a few relations between some statistics on π and π.
منابع مشابه
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The rank aggregation problem consists in finding a consensus ranking on a set of alternatives, based on the preferences of individual voters. The alternatives are expressed by permutations, whose pairwise distance can be measured in many ways. In this work we study a collection of distances, including the Kendall tau, Spearman footrule, Minkowski, Cayley, Hamming, Ulam, and related edit distanc...
متن کامل[hal-00826968, v1] Lower bounding edit distances between permutations
A number of fields, including the study of genome rearrangements and the design of interconnection networks, deal with the connected problems of sorting permutations in “as few moves as possible”, using a given set of allowed operations, or computing the number of moves the sorting process requires, often referred to as the distance of the permutation. These operations often act on just one or ...
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There exists a bijection between one stack sortable permutations –permutations which avoid the pattern 231– and planar trees. We define an edit distance between permutations which is coherent with the standard edit distance between trees. This one-to-one correspondence yields a polynomial algorithm for the subpermutation problem for (231) avoiding permutations. Moreover, we obtain the generatin...
متن کاملEdit distance between unlabeled ordered trees
There exists a bijection between one stack sortable permutations –permutations which avoid the pattern 231– and planar trees. We define an edit distance between permutations which is coherent with the standard edit distance between trees. This one-to-one correspondence yields a polynomial algorithm for the subpermutation problem for (231) avoiding permutations. Moreover, we obtain the generatin...
متن کاملcc sd - 0 00 05 56 9 , v er si on 1 - 2 7 Ju n 20 05 Edit distance between unlabeled ordered trees
There exists a bijection between one stack sortable permutations –permutations which avoid the pattern 231– and planar trees. We define an edit distance between permutations which is coherent with the standard edit distance between trees. This one-to-one correspondence yields a polynomial algorithm for the subpermutation problem for (231) avoiding permutations. Moreover, we obtain the generatin...
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ورودعنوان ژورنال:
- SIAM J. Discrete Math.
دوره 27 شماره
صفحات -
تاریخ انتشار 2013