practical multiple sequence algorithms sushmita roy bmi/cs 576 sushmita roy sroy@biostat.wisc.edu...
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Practical multiple sequence algorithms
Sushmita RoyBMI/CS 576
www.biostat.wisc.edu/bmi576/Sushmita Roy
sroy@biostat.wisc.eduSep 23rd, 2014
RECAP
• Scores for multiple sequence alignment– Sum of pairs– Minimum entropy based
• Heuristic algorithms for performing multiple sequence alignment– Progressive
• Star alignment• Guide tree-based
– ClustalW
– Iterative• MUSCLE
Goals for today
• General description of iterative algorithms• A practical implementation
– MUSCLE
Iterative algorithms for multiple sequence alignment
• Key idea: revisit the alignments• Algorithms vary depending upon how exactly the
alignments are changing between iterations
Simple iterative algorithm (Also called the Barton-Sternberg alignment algorithm)
1. Align two sequences with highest alignment score using standard dynamic programming techniques for pairwise alignment
2. Repeat until all sequences are in the alignment– Find the sequence most similar to current alignment– Add to alignment.
3. For all sequences xi,– Remove xi from alignment, re-align to the partial alignment of {x1...xn}\
xi.
• Repeat 3 until the score does not improve OR we have executed a fixed number of steps
MUSCLE: Multiple Sequence Comparison by log-expectation
• Progressive + iterative• Has three main stages• Stage1: Draft Progressive• Stage 2: Improved Progressive• Stage 3: Refinement:
– Select pairs of subtrees and re-align the alignment for the subtrees.
– Keep if it improves alignment
• Each stage returns an alignment– Could be terminated anywhere
Steps in MUSCLE
Stage 1: Draft progressive
Stage 2: Improved progressive
Stage 3: Refinement
MUSCLE Stage 1
1.1 Compute k-mer distance matrix
1.2 Use UPGMA to make tree (TREE1) (We will see this in a bit)
1.3. Use guide tree to make first MSA
K-mer distance D
• K-mer distance is defined from common fractional k-mer count (F)
• For two sequences x and y
• D=1-F
K-mer distance example
Sequence k=2-mers
AKFLA AK,KF, FL,LA
LKFLFL LK, KF, FL,LF,FL
K-mer (τ) nx(τ) ny(τ) min(nx(τ), ny(τ))
AK 1 0 0
KF 1 1 1
FL 1 2 1
LA 1 0 0
LK 0 1 0
LF 0 2 0
x
y
Stage 2: Improved progressive
2.1 Recompute similarity of sequences of pairs using mutual alignment in MSA
2.2 Construct a phylogenetic tree (TREE2) using an alignment-based distance
2.3 Build a new progressive alignment only for subtrees where branching order has changed between TREE1 and TREE2
2.4 Repeat 2.3 until number of “reordered nodes” does not decrease.
Stage 2.1. Recomputing pairwise sequence similarity from a multiple alignment
-TGTTAAC-TGT-AAC-TGT--ACATGT---CATGT-GGC
An MSATGTTAACTGT-AAC
TGTTAACTGT--AC
-TGTTAACATGT---C
-TGTTAACATGT-GGC
…
Derived pairwise alignment Fraction identity
6/7
5/7
4/8
4/8
…
Exclude gaps in both sequences
Stage 2.2: Phylogenetic tree creation
Construct a phylogenetic tree using a Kimura distance
D: fractional identity of sequences
Stage 2.3 Re-align only when branching order is changed
Branching order same
Branching order different:x branches before v
Recompute alignment for these nodes
Stage 3: Iterative Refinement
3.1 Delete an edge3.2 Extract profiles from subtrees3.3 Re-align profiles3.4 Update MSA if its score is better than current MSA
3.1 Selecting a branch
• Select a branch in order of decreasing distance from the root
MQTIFLH-IW
LQSW
MQTIF
LHIW
LSF
LQSWL-SW
1
2
3
4
5
6
Branch selection order: 1,2,3,4,5,6
MQTIFLH-IWLQS-WL-S-W
3.2 Extracting a profile
MQTIFLH-IW
LQSW
LHIWMQTIFLH-IWLQS-WL-S-W
LSF
LQSWL-SW
2
3
4
5
6
Delete branch 2
Re-align profiles for subtrees
MQTIFLQS-WL-S-W
Is score better?
yes
Keep new alignment
Discard
MQTIF LHIW
LHI-WMQTIFLQS-WL-S-W
1
Summary of MUSCLE
• Three stage algorithm• Stage 1: Draft progressive
– k-mer distance– UPGMA tree (TREE1)– Guide tree based alignment (MSA1)
• Stage 2: Improved progressive– Distance derived from MSA1 – UPGMA tree (TREE2)– Redo alignment for nodes with changed orderings– Repeat until number of re-ordered nodes does not change
• Stage 3: Iterative refinement– Generate subtree profiles– Realign profiles– Keep realignment if of higher score– Repeat until no more improvement or fixed number of steps.
• MUSCLE-fast: Stage 1• MUSCLE-p: Stage1 and 2
Note different convergence criteria in Stages 2 and 3
Accuracy scores of different MSA algorithms on benchmark datasets
Edgar, 2004, BMC Bioinformatics
Accuracy measures the fraction of residues correctly aligned with the reference alignment
Run time of different MSA algorithm
Summary of algorithms
• ClustalW– Lots of heuristics for gaps– One guide tree and then alignment– Weights sequences– Dynamically selects scoring matrix depending upon sequence identity
• MUSCLE– Three-stage algorithm: Draft, Improved, Iterative refinement– Two guide trees– Uses k-mer distance for first tree– Selectively re-aligns using second tree– Refines iteratively by working on subtree-associated alignments– Fast and has as good or better quality alignments
How do MUSCLE and CLUSTALW work in practice
• Consider coding sequences of 15 yeast species• Consider promoter sequences of 15 yeast species• Align with MUSCLE and CLUSTALW
Protein sequence alignment
MUSCLE
CLUSTALW
Promoter sequence alignment
MUSCLE
CLUSTALW
Comparing alignment of promoters to shuffled sequences in CLUSTALW
Original sequences
Shuffled sequences
Comparing alignment of promoters to shuffled sequences in MUSCLE
Original sequences
Shuffled sequences
Conclusion
• Algorithms seemed similar for protein/coding sequences
• Algorithms gave different alignments for DNA sequence– Possibly DNA sequence is harder to align– DNA sequence in non-coding regions are even harder to
align
Summary of sequence alignment
• Pairwise alignment– Algorithms
• Global: (Needleman-Wunsch) • Local: (Smith-Waterman)• Heuristic search to align large number of sequences
– BLAST
• Multiple sequence alignment– Star alignment– Progressive alignment with guide tree: CLUSTALW– Progressive + Iterative alignment with guide tree: MUSCLE
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