An Optimization Approach to Protein Structure Prediction
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Transcript of An Optimization Approach to Protein Structure Prediction
An Optimization Approach to Protein Structure Prediction
Richard ByrdBetty Eskow
Robert SchnabelBrett Bader
Lianjun JiangUniversity of Colorado
Teresa Head-GordonUniv. of California, Berkeley
Silvia CrivelliLawrence Berkeley Laboratory
Problem DefinitionPredict the 3-dimensional shape, or
native state, of a protein given itssequence of constituent amino acids.
Assuming the native state of a protein corresponds to its minimum free energy state, use a global
optimization method to find the minimum energy configuration of the target protein.
Approach
Importance of Protein Folding• 3-Dimensional structure useful in
molecular drug design.
• Laboratory experiments are expensive:– X-ray crystallography– NMR
• Genome projects are providing sequences for many proteins whose structure will need to be determined.
Protein Structures
ProGly Leu Ser
Proteins consist of a long chain ofamino acids called the primary structure.
The constituent amino acids may encourage hydrogen bonding and form regular structures, called secondary structures.
The secondary structures fold together to form a compact 3-dimensional or tertiary structure.
-helix -sheet
Chemistry of Proteins
N
O H
RH
N
O H
R H
N
O H
RH
N
O H
R H
N
OH
R H
N
OH
R H
N
OH
R H
N
OH
R H
Side chain
H-bond
Backbone
Amino acid
Hydrogen bonds strongly influence a protein’s shape. They largely occur in secondary structures and help hold the protein together.
Computational Approaches to Protein Structure Prediction
• Comparative Modeling– Compares and aligns to a known protein sequence of
amino acids• Fold Recognition
– Searches for the best fitting fold template from a library of known protein folds
• New Fold Methods– Not based on knowledge of complete protein
sequences or folds– e.g. energy minimization
Global Optimization ProblemThe 3-dimensional structure of the protein found in nature is
believed to minimize potential energy:
Min V(x)where x = atom coordinates
Challenges:• O(en2) local minima• Very large parameter space
e.g., modestly sized protein• 100-300 amino acids• ~ 1,600 atoms• ~ 4,800 variables
• Model of the energy surface may not match nature
Amber Energy FunctionV(x) =
bondscl(b b0)2 (b = bond length)
+
bond anglesca( 0)2 ( = bond angle)
+
dihedral anglescd[1 + cos(n +)] ( = dihedral angle)
+
charged pairs (rij = distance)
+ nonbonded pairs
cwrij) ( = Lennard-Jones potential)
ij
ji
DrQQ
Internal coordinates are determined using bonds, bond angles and dihedral angles
Internal coordinates are determined using bonds, bond anglesand dihedral angles.
Additional energy terms to model protein behavior in an aqueous environment
• Formulated from simulations of pairs of hydrophobic molecules in water
• ESOLVATION =
• Advantages of this model:– Provides stabilizing force for forming hydrophobic
cores.– Well defined model of the hydrophobic effect of small
hydrophobic groups in water.– Computationally tractable and differentiable
w
crk
kijhcNji Mk
k
)(2
,
exp
i,j are aliphatic carbons, M Gaussians with position(ck ), depth(hk) and width(wk) describe 2 minima: (1) molecules in contact and (2)mol-ecules separated by a distance of 1 water molecule.
Global Optimization Approaches
• Deterministic methods– Branch and bound, interval methods– Very reliable, deterministic guarantees– Too expensive for more than 20-50 variables
• Stochastic methods– Random steps or sampling – Probabilistic guarantees– Practical for < 300 variables
• Heuristic search– e.g. Simulated annealing, Tabu search, Genetic algorithms– Effective on some very large problems– No practical guarantees
A Stochastic-Perturbation Global Optimization Approach
• Generate and maintain a pool of candidates (configurations), as in genetic algorithms.
• Solve the full-dimensional problem as a series of small-dimensional ones.
• Use protein database information to bias toward likely substructures.
Algorithm Phases
Simplify problem by utilizing domain-specific knowledge
Given the amino acid sequence of aprotein, find the 3-dimensional
structure likely to be found in nature.
GenerateInitial
Population
GlobalOptimization
Phase 1 Phase 2
Phase 1: Create Initial Population
• Submit amino acid sequence to server:• EFIAIYDYKAETEEDLTIKKGEKLEIIEKEGDWWKAKAIGSGEIGY• IPANYIAAAE
• Use server predictions to determine the location of α-helices, β-strands, and coils :
• CCCCHHHHHHEEEEEEEEEEEECCEEEEEEEEEEEHHHHHHHHCCC– HHHHHHCCCC
• Use ProteinShop visualization tool to form configurations with secondary structure:
• Assign ideal values to the dihedral angles in the sequence according to the predictions. Manipulate β-strands to form β-sheets.
Perform Energy Minimizations
Phase 2:Improve Local MinimaSelect a protein and a subset ofdihedral angles
Small-scale globaloptimization
Full-dimensionallocal optimization
itera
te
• Uses a combination of breadth-first and depth-first searches from initial pool
• Dihedral angles act as “internal coordinates” and reduce the number of variables, speeding an optimization run
Cluster minima and test stopping criteria
Small Scale Global Optimization in Phase 2
• Minimize energy over 5-20 torsion angles’• Use a stochastic global optimization
algorithm base on sampling, sample pruning and local minimization (Rinooy-Kan et al).
• From best start points, do local minimizations using quasi-Newton
Full-scale local minimizations
• Using best points from small-scale global, do local minimizations.
• Because of problem size we use limited-memory quasi-Newton.
• Best local minimizers are added to pool.
Biasing functions
• Used to form secondary structure during in first phase and sometimes infull-dimensional local minimizations.
• Dihedral angle biasing:E= dihedrals k [1 – cos( - 0)] + k[1 – cos( - 0)] • Hydrogen Bond biasing
– For -helices:EHB= wiwi+4 / Dri,i+4 (w’s are weights from the server for
residues i and i+4 in the helix)– To form -sheets from -strands:EHB= wiwj / Dri,j
Neural Network PredictionsSKIGIDGFGRIGRLVLRAALSCGAQ
SKIGIDGFGRIGRLVLRAALSCGAQ BBBB B AAAAAAA BBBBB 13552 6789992 56673
Sequence:Type:
Weight:
Sequence:
Neural nets trained on a large database of proteins can predict secondary structure likely to be in a target protein.
Forming β-sheets from the predicted -strands is a combinatorial problem.
Which strands are paired?
Which orientation?
? ??
parallel anti-parallel
Which residues are paired?
odd even
Distribution of Beta Sheets in Proteins with Applications to Structure Prediction
Ruckzinski, Kooperberg, Bonneau, and Baker Proteins 48, 2002
Parallel Organization• Select k subsets of dihedral angles
• Maintain a queue of (configuration,subspace) for k optimization crews to work on
• Each optimization crew performs a small-scale global optimization of its assigned configuration and subspace.
• Gather intermediate results and re-insert them into the work queue. Idle optimization crews do full-dimensional local minimizations or additional small-scale global optimization.
Massively parallel exploration of optimization space Automatic load balancing
2UTG_A: 7.5Å R.M.S.D. from Crystal
1POU: 6.3Å R.M.S.D. from NMR structure
Community-wide experiment on the Critical Assessment of Techniques for Protein Structure Prediction
Protein crystallographers and NMR spectroscopists provide structures prior to their publication for blind prediction by participants.
Biannual competition open to all computational methods – including servers.
Difficulty of targets assessed by which type of methods work to predict the structure – CM, FR, NF.
We participated in CASP4 (Dec. 2000) and CASP5 (Dec. 2002).
CASP competition
Our submitted CASP4 models ranked by target difficulty and relative accuracy
Results on Phospholipase C beta C-terminus, turkey (containing 242 amino acids). Ribbon structure comparison between experiment (center), submitted M1 prediction (right), our lowest energy submission, had an RMSD with experiment of 8.46Å, and next generation run of the global optimization algorithm (left). This new run lowered the energy of our previous best minimizer, resulting in a new structure with an RMSD of 7.7Å.
CASP4 Results Summary Best structure predicted on one of the hardest
targets Our method is more effective than some
knowledge-based methods on targets for which less information from known proteins is available.
Global optimization algorithm is very effective at improving structures from a small initial population.
Our submitted CASP5 models ranked by target difficulty and relative accuracy
Our submitted CASP5 models of targets (domains) that were assessed in the CASP5 NEW FOLD category.
Our submissions for CASP5 Target 162
CASP5 Results Summary• Ranked ~15/165 groups in assessments
of New Fold (and NF/FR) Results.• Our method uses less knowledge from
known protein structures than most other (New Fold) methods participating in CASP5
• More diverse starting populations (especially for -sheet proteins) using the visualization tool led to better performance in some cases.
Future Research Directions
• Simpler energy models for early stages of the algorithm, and alternative models of solvation.
• New techniques for choosing -strand pairings.
• Improve our techniques for maintaining existing secondary structure in our models.