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Protein Planes. Bob Fraser CSCBC 2007. Overview. Motivation Points to examine Results Further work. C α trace problem. Given: only approximate positions of the C α atoms of a protein Aim: Construct the entire backbone of the protein This is an open problem!. C α trace problem.
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Protein Planes Bob Fraser CSCBC 2007
Overview • Motivation • Points to examine • Results • Further work
Cα trace problem • Given: only approximate positions of the Cα atoms of a protein • Aim: Construct the entire backbone of the protein • This is an open problem!
Cα trace problem • Why do it? • Some PDB files contain only Cαatoms. • Refinement of X-ray or NMR skeletons. • More importantly, many predictive approaches are incremental, and begin by producing the Cα trace.
Cα trace problem • Possible solutions: • De novo, CHARMM fields (Correa 90) • Fragment matching (Levitt 92) • Maximize hydrogen bonding (Scheraga et al. 93) • Idealized covalent geometry • Used by Engh & Huber (91) for X-ray crystallography refinement • Supplemented by including additional information (Payne 93, Blundell 03) • All methods achieve <1Å rmsd, ~0.5Å rmsd is good. • Perhaps including more information about the plane could further improve results.
The task • Survey the structures in the PDB, and determine how close the known structures adhere to these values. • Next look at the relationship between the planes and secondary structures • Is this information useful? • If so, could it be used in refinement?
Length of plane (Cα – Cα distance) • The so-called bond distance when given a Cα trace. • If all bond angles and lengths are fixed, this distance should also be constant. • Let’s check this distance in the PDB, and determine the average, standard deviation, maximum and minimum values found.
Angle between helix axis and plane • It is assumed that the planar regions for amino acids in a helix are parallel to the axis of the helix. • Let’s put this to the test! • How do we measure the axis of helix? • It is a subjective measure • We’ll use the method of Walther et al. (96), it provides a local helix axis
Plane-axis angle • Now we have a peptide plane and the helix axis, so we can find the angle between them easily. • This same method could be applied to beta strands and 3-10 helices. • We should expect that some pattern should arise since beta strands are have regular patterns, particularly when in beta sheets.
Data Analysis • Use the entire PDB database as a source • Compare the results obtained to the expected values for the plane lengths and alpha helices • Determine whether a preferential orientation exists for beta strands and 3-10 helices
Plane length • trans and cis cases need to be distinguished because they are different inherently • Plane length is composed of 5 elements of idealized covalent geometry
Future Work • Develop algorithm for using secondary structure to solve trace problem. • Test it on proteins with perfect Cα traces to verify the accuracy of reconstruction. • Test on randomized Cα traces. • Integrate this information with refinement
Thanks! Selected References • M.A. DePristo, P.I.W. de Bakker, R.P. Shetty, and T.L. Blundell. Discrete restraint-based protein modeling and the C -trace problem. Protein Science, 12:2032-2046, 2003. • A. Liwo, M.R. Pincus, R.J. Wawak, S. Rackovsky, and H.A. Scheraga. Calculation of protein backbone geometry from alpha-carbon coordinates based on peptide-group dipole alignment. Protein Sci., 2(10):1697-1714, 1993. • G.A. Petsko and D. Ringe. Protein Structure and Function. New Science Press Ltd, London, 2004. • D. Walther, F. Eisenhaber, and P. Argos. Principles of helix-helix packing in proteins: the helical lattice superimposition model. J.Mol.Biol., 255: 536-553, 1996.
