TY - GEN
T1 - Longest Common Subsequence on Weighted Sequences.
AU - Kipouridis, Evangelos
AU - Tsichlas, K.
N1 - Received the Alberto Apostolico Best Paper Award.
PY - 2020/6
Y1 - 2020/6
N2 - We consider the general problem of the Longest Common Subsequence (LCS) on weighted sequences. Weighted sequences are an extension of classical strings, where in each position every letter of the alphabet may occur with some probability. Previous results presented a PTAS and noticed that no FPTAS is possible unless P=NP. In this paper we essentially close the gap between upper and lower bounds by improving both. First of all, we provide an EPTAS for bounded alphabets (which is the most natural case), and prove that there does not exist any EPTAS for unbounded alphabets unless FPT=W[1]. Furthermore, under the Exponential Time Hypothesis, we provide a lower bound which shows that no significantly better PTAS can exist for unbounded alphabets. As a side note, we prove that it is sufficient to work with only one threshold in the general variant of the problem.
AB - We consider the general problem of the Longest Common Subsequence (LCS) on weighted sequences. Weighted sequences are an extension of classical strings, where in each position every letter of the alphabet may occur with some probability. Previous results presented a PTAS and noticed that no FPTAS is possible unless P=NP. In this paper we essentially close the gap between upper and lower bounds by improving both. First of all, we provide an EPTAS for bounded alphabets (which is the most natural case), and prove that there does not exist any EPTAS for unbounded alphabets unless FPT=W[1]. Furthermore, under the Exponential Time Hypothesis, we provide a lower bound which shows that no significantly better PTAS can exist for unbounded alphabets. As a side note, we prove that it is sufficient to work with only one threshold in the general variant of the problem.
UR - https://cpm2020.compute.dtu.dk/CPM_best_paper_award.pdf
UR - https://www.youtube.com/watch?v=Skrci0vF7ds
UR - http://2020.highlightsofalgorithms.org/shorttalks
UR - http://pages.cs.aueb.gr/othersites/ACAC20/index.php
UR - https://youtu.be/iFapquV7TYU?t=8126
U2 - 10.4230/LIPIcs.CPM.2020.19
DO - 10.4230/LIPIcs.CPM.2020.19
M3 - Article in proceedings
SN - 978-3-95977-149-8
T3 - Leibniz International Proceedings in Informatics, LIPIcs
BT - Longest Common Subsequence on Weighted Sequences.
PB - Schloss Dagstuhl - Leibniz-Zentrum für Informatik
ER -