In this paper we consider several variants of the problem of sorting integer permutations with a minimum number of moves, a task with many potential applications ranging from computational biology to logistics. Each problem is formulated as a heuristic search problem, where different variants induce different sets of allowed moves within the search tree. Due to the intrinsic nature of this category of problems, which in many cases present a very large branching factor, classic unidirectional heuristic search algorithms such as A∗ and IDA∗ quickly become inefficient or even infeasible as the problem dimension grows. Therefore, more sophisticated algorithms are needed. To this aim, we propose to combine two recent paradigms which have been employed in difficult heuristic search problems showing good performance: enhanced partial expansion (EPE) and efficient single-frontier bidirectional search (eSBS). We propose a new class of algorithms combining the benefits of EPE and eSBS, named efficient Single-frontier Bidirectional Search with Enhanced Partial Expansion (eSBS-EPE). We then present an experimental evaluation that shows that eSBS-EPE is a very effective approach for this family of problems, often outperforming previous methods on large-size instances. With the new eSBS-EPE class of methods we were able to push the limit and solve the largest size instances of some of the problem domains (the pancake and the burnt pancake puzzles). This novel search paradigm hence provides a very promising framework also for other domains.
V.Bafna and P.A.Pevzner, Genome rearrangements and sorting by reversals, SIAM J. Comput.25(2) (1996), 272–289.
2.
V.Bafna and P.A.Pevzner, Sorting by transpositions, SIAM J. Discrete Math.11(2) (1998), 224–240.
3.
J.K.Barker and R.E.Korf, Limitations of front-to-end bidirectional heuristic search, in: Twenty-Ninth AAAI Conference on Artificial Intelligence, 2015.
4.
A.Bergeron, J.Mixtacki and J.Stoye, On sorting by translocations, in: Research in Computational Molecular Biology, Lecture Notes in Computer Science, Vol. 3500, Springer, Berlin, Heidelberg, 2005, pp. 615–629.
5.
L.Bulteau, G.Fertin and I.Rusu, Pancake flipping is hard, in: Mathematical Foundations of Computer Science (MFCS) 2012, Lecture Notes in Computer Science, Vol. 7464, Springer, 2012, pp. 247–258.
6.
L.Bulteau, G.Fertin and I.Rusu, Sorting by transpositions is difficult, SIAM J. Discrete Math.26(3) (2012), 1148–1180.
7.
A.Caprara, Sorting by reversals is difficult, in: First Annual International Conference on Computational Molecular Biology (RECOMB), ACM, 1997, pp. 75–83.
8.
D.A.Christie, Sorting permutations by block-interchanges, Information Processing Letters60(4) (1996), 165–169.
9.
J.Cibulka, On average and highest number of flips in pancake sorting, Theoretical Computer Science412(8–10) (2011), 822–834.
10.
Á.T.A.de Reyna and C.Linares López, Size-independent additive pattern databases for the pancake problem, in: Fourth Annual Symposium on Combinatorial Search, SoCS 2011, AAAI Press, 2011.
11.
I.Elias and T.Hartman, A 1.375-approximation algorithm for sorting by transpositions, IEEE/ACM Transactions on Computational Biology and Bioinformatics3(4) (2006), 369–379.
12.
A.Felner, M.Goldenberg, G.Sharon, R.Stern, T.Beja, N.R.Sturtevant, J.Schaeffer and R.Holte, Partial-expansion A∗ with selective node generation, in: Proceedings of the Twenty-Sixth AAAI Conference on Artificial Intelligence, AAAI Press, 2012.
13.
A.Felner, C.Moldenhauer, N.R.Sturtevant and J.Schaeffer, Single-frontier bidirectional search, in: Proceedings of the Twenty-Fourth AAAI Conference on Artificial Intelligence, AAAI 2010, Atlanta, Georgia, USA, 11–15 July 2010, AAAI Press, 2010.
14.
A.Felner, U.Zahavi, R.Holte, J.Schaeffer, N.R.Sturtevant and Z.Zhang, Inconsistent heuristics in theory and practice, Artificial Intelligence175(9,10) (2011), 1570–1603.
15.
J.Feng and D.Zhu, Faster algorithms for sorting by transpositions and sorting by block interchanges, ACM Trans. Algorithms3(3) (2007), Article No. 25.
16.
W.H.Gates and C.H.Papadimitriou, Bounds for sorting by prefix reversal, Discrete Mathematics27(1) (1979), 47–57.
17.
M.Goldenberg, A.Felner, R.Stern, G.Sharon, N.R.Sturtevant, R.C.Holte and J.Schaeffer, Enhanced partial expansion A∗, J. Artif. Intell. Res. (JAIR)50 (2014), 141–187.
18.
Q.-P.Gu, S.Peng and H.Sudborough, A 2-approximation algorithm for genome rearrangements by reversals and transpositions, Theoretical Computer Science210(2) (1999), 327–339.
19.
S.Hannenhalli, Polynomial-time algorithm for computing translocation distance between genomes, Discrete Applied Mathematics71(1–3) (1996), 137–151.
20.
S.Hannenhalli and P.A.Pevzner, Transforming cabbage into turnip: Polynomial algorithm for sorting signed permutations by reversals, J. ACM46(1) (1999), 1–27.
21.
P.Hart, N.Nilsson and B.Raphael, A formal basis for the heuristic determination of minimum cost paths, IEEE Transactions on Systems Science and Cybernetics4(2) (1968), 100–107.
22.
L.S.Heath and J.P.C.Vergara, Sorting by bounded block-moves, Discrete Applied Mathematics88(13) (1998), 181–206, Computational Molecular Biology DAM – CMB Series.
23.
M.Helmert, Landmark heuristics for the pancake problem, in: SoCS 2010, AAAI Press, 2010.
24.
R.C.Holte, A.Felner, G.Sharon and N.R.Sturtevant, Bidirectional search that is guaranteed to meet in the middle, in: Thirtieth AAAI Conference on Artificial Intelligence, 2016.
25.
R.C.Holte and I.T.Hernádvölgyi, A space-time tradeoff for memory-based heuristics, in: Sixteenth National Conference on Artificial Intelligence and Eleventh Conference on Innovative Applications of Artificial Intelligence, AAAI Press/The MIT Press, 1999, pp. 704–709.
26.
H.Kaindl and G.Kainz, Bidirectional heuristic search reconsidered, Journal of Artificial Intelligence Research7 (1997), 283–317.
27.
J.Kececioglu and D.Sankoff, Exact and approximation algorithms for sorting by reversals, with application to genome rearrangement, Algorithmica13(1,2) (1995), 180–210.
28.
M.Keshtkaran, R.Taghizadeh and K.Ziarati, A novel technique for compressing pattern databases in the pancake sorting problems, in: SOCS, AAAI Press, 2011.
29.
R.E.Korf, Iterative-deepening-A∗: An optimal admissible tree search, in: 9th International Joint Conference on Artificial Intelligence, Morgan Kaufmann, 1985, pp. 1034–1036.
30.
A.Labarre and J.Cibulka, Polynomial-time sortable stacks of burnt pancakes, Theoretical Computer Science412(80) (2011), 695–702.
31.
Z.Li, L.Wang and K.Zhang, Algorithmic approaches for genome rearrangement: A review, IEEE Transactions on Systems, Man, and Cybernetics, Part C: Applications and Reviews36(5) (2006), 636–648.
32.
M.Lippi, M.Ernandes and A.Felner, Efficient single frontier bidirectional search, in: Fifth Annual Symposium on Combinatorial Search (SoCS) 2012, AAAI Press, 2012.
33.
K.Qiu, H.Meijer and S.Akl, Parallel routing and sorting on the pancake network, in: Advances in Computing and Information ICCI’91, Lecture Notes in Computer Science, Vol. 497, Springer, Berlin, Heidelberg, 1991, pp. 360–371.
34.
G.Sharon, R.Stern, A.Felner and N.R.Sturtevant, Conflict-based search for optimal multi-agent pathfinding, Artificial Intelligence219 (2015), 40–66.
35.
A.Solomon, P.Sutcliffe and R.Lister, Sorting circular permutations by reversal, WADS2003 (2003), 319–328.
36.
G.Tesler, Grimm: Genome rearrangements web server, Bioinformatics18(3) (2002), 492–493.
S.Yancopoulos, O.Attie and R.Friedberg, Efficient sorting of genomic permutations by translocation, inversion and block interchange, Bioinformatics21(16) (2005), 3340–3346.
39.
T.Yoshizumi, T.Miura and T.Ishida, A∗ with partial expansion for large branching factor problems, in: Proceedings of the Seventeenth National Conference on Artificial Intelligence and Twelfth Conference on Innovative Applications of Artificial Intelligence, AAAI Press, 2000, pp. 923–929.
40.
D.Zhu and L.Wang, On the complexity of unsigned translocation distance, Theoretical Computer Science352(13) (2006), 322–328.
