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Algorithmic Problems Related to Sequences and Phylogenetic Trees

This article explores algorithmic problems related to sequences and phylogenetic trees, including substructure comparison problems, non-overlapping local alignment, transformation-based distances, and phylogenetic trees. It discusses the computational aspects of these problems and various algorithmic approaches for solving them. The article also provides an overview of common jargon used in computational molecular biology.

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Algorithmic Problems Related to Sequences and Phylogenetic Trees

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  1. Algorithmic Problems Related to Sequences and Phylogenetic Trees Bhaskar DasGupta Department of Computer Science University of Illinois at Chicago Chicago, IL 60607-7053 Email: dasgupta@cs.uic.edu

  2. Outline Introduction Substructure Comparison Problems Sequences Nonoverlapping local alignment Proteins Transformation Based Distances Phylogenetic Trees Why compare? A few distances Genomes Syntenic Distance Conclusions

  3. Computational Molecular Biology A Computer Scientist’s Participation • Get to know the computational problems • Talk to biologists • State the computational problems as precisely as possible • Investigate computational aspects of the problems • exact solutions • difficult/easy ? • time/space efficient solutions ? • approximate solutions (if exact solution is hard or not time/space efficient) • guaranteed quality of approximation ? (tradeoff with space/time?) • deterministic vs. randomized algorithms • implementation aspects • programming cleverness to reduce space/time • algorithmic engineering techniques to reduce space/time • interaction with the biologists • are the solutions biologically meaningful ?

  4. Few Computer Science Jargons When we say What we really mean Maximization/minimization problem Problem in which we maximize/minimize some objective function Problem is NP-complete/hard Exact solution for large size problem will most likely require too much time Polynomial-time solution Solvable in reasonable time in a reasonably fast computer Approximation algorithm An approximate solution computed in reasonable time with approximation ratio r with an objective function value of a (for maximization/minimization) least (at most r) of the optimum

  5. Substructure Similarity (or, equivalently, Dissimilarity) a b’ b c’ c a’ a matches to a’ with similarity 10 b matches to b’ with similarity 15 c matches to c’ with similarity 11 total similarity 36 Goal: match disjoint substructures to maximize total similarity

  6. Few Complications • Many short vs. fewer long substructures • Measure of similarity between substructures • Examples: • rmsd (root-mean-square distance) between 3D substructures • edit distance between subsequences • syntenic distance between multi-chromosome genomes

  7. Sequences Non-overlapping local alignment total similarity 10+15=25

  8. The problem Input: pairs of fragments, one from each sequence (or, equivalently a set of rectangles). the weight of each pair (rectangle) is their similarity measure Output: a set of pairs (rectangles) such that • no two rectangles overlap on the x-axis (i.e., matched fragments of the first sequence are disjoint) • no two rectangles overlap on the y-axis (i.e., matched fragments of the 2nd sequence are disjoint) • total similarity of selected fragment pairs is maximized

  9. Further assumption We can preprocess input data (rectangles or fragment pairs) to ensure that • for any two rectangles, the projection of one on the y-axis does not enclose that of another not allowed in the input data • for any two rectangles, the projection of one on the x-axis does not enclose that of another

  10. A G An illustration Input: 15 2 G C 1 C 10 T G A A C A C C An optimal solution of total similarity 25

  11. Previous results (n = number of rectangles (fragment pairs)) Bafna, Narayanan and Ravi (WADS’95) • NP-complete • O(n2) time approximation algorithm with approximation ratio 3.25 • converts to a problem of finding maximum-weight independent set in a 5-clawfree graph • gives approximation algorithm for (d+1)-clawfree graphs with approximation ratio of • Halldórsson (SODA’95) • approximation algorithm with approximation ratio of about 2.5 when all weights are one • again uses clawfree graphs • Berman (SWAT’00) • O(n4) time algorithm with approximation ratio of about 2.5 • via clawfree graphs again

  12. Our recent results (Berman, DasGupta and Muthukrishnan, SODA’02) • O(n log n) time approximation algorithm with approximation ratio 3 • very simple to implement • uses a 2-phase approach (or, equivalently, the local-ratio technique) Extensions to d dimensions (d > 2) • Inputs are similarity measures of d fragments, one from each of given d sequences • Motivation: multiple sequence comparison problems • Generalization of our above approach: • O(n d log n) time approximation algorithm with approximation ratio of 2d-1 • current best (Bar-Yehuda, Halldórsson, Naor, Shachnai and Shapira, SODA’02): • polynomial time algorithm with approximation ratio 2d • uses repeated linear programming and continuous version of local-ratio techniques

  13. Common substructure between protein structures (work in progress.......with Jie Liang and Andrew Binkowski) • Comparison of 2 4-helix bundles that differ by topological rearrangement, ROP and cytochrome b56 • Topological cartoons of 1ROP and 256B. Helices are drawn as cylinders and loops as lines. Residue numbers of structurally equivalent segments are indicated on the cylinders. • The alignment is non-sequential.

  14. Motivation: discovering similar substructures from different proteins is essential for recognizing remote evolutionary relationship at the level of protein fragments Few interesting points: • it is not easy to characterize topological structures such as void, pocket, or tunnel where ligand and other molecules bind. • Current computational tools do not perform very well on discovering similar substructures. For example: (a) protein structures are typically represented by distance matrices or contact maps, which record pairwise inter-distances between selected atoms (typically Cα atoms) on the primary sequences (b) finding common substructures becomes matching submatrices of the two contact maps (c) Heuristic algorithms have been developed and have proven to be useful. But, they are time consuming (typically O(n6)), and cannot be used for more demanding tasks such as identifying spatial functional motifs

  15. Our approach in work in progress • reduce the problem to various constrained rectangle-packing problems • use combinatorial methods (such as the local-ratio technique) to design approximation algorithms for these problems Our final goal • identification of the most discriminating geometric and chemical features and their combinations for various proteins • development of a robust method to compute the similarity/dissimilarity of two shape distributions of these features

  16. Transformation rules (with costs) Transformation based distances Objects 15 12 9 10 Goal: find distance between two specified objects 15 9 10 cost = 10+15+9 = 34 12 10 cost = 10+12 = 22 is 22 and distance between

  17. Distances between Phylogenetic trees Objects: Evolutionary trees (phylogenies) on n nodes • Transformation Rules: • How to modify trees locally consistent with biological applications?

  18. parsimony method Why compute distances between phylogenies ? First motivation compare them for similarity and discrepancy compatibility method input data maximum-likelihood method distance matrix method different methods for inferring phylogenies

  19. Why compute distances between phylogenies ? Second motivation To find out information about rare genetic events such as recombination or gene conversion recombination gene conversion

  20. Few distances that we have looked at...... • Nearest neighbor interchange (nni) distance • Linear cost subtree transfer distances Synopsis of our works on these distances • proving that exact solution is NP-hard • providing fast approximate solutions • investigating fixed-parameter tractability • some implementation works .....

  21. Genomic Distance Syntenic distance between multi-chromosome genomes (Ferretti, Nadeau and Sankoff, 1996) • treats genomes at a higher level of abstraction gene chromosome 4 9 10 8 6 3 5 7 1 2 • order of genes in any chromosome is unknown or ignored • intra-chromosomal events (e.g., reversal, transposition) do not affect chromosomal assignment • inter-chromosomal events are important

  22. 2 Inter-chromosomal events Fission Fusion 5 2 1 3 5 1 3 4 4 5 4 3 2 1 5 4 3 2 1 (Reciprocal) translocation 5 6 7 3 4 2 1

  23. Syntenic distance between two genomes minimum number of fission, fusion and translocations necessary to transform one genome to another Other related problems finding the median of 3 genomes for the syntenic distance metric (useful for phylogentic tree inference problem from synteny data) Synopsis of our work on these problems • showing NP-hardness of exact computation • giving efficient approximation algorithms • exhibiting fixed-parameter tractability

  24. Other problems...... • Genome partitioning with applications to DNA microarray chip design • Consensus sequence reconstruction problems

  25. THE END

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