Levinthal's paradox

Levinthal's paradox is a thought experiment, also constituting a self-reference in the theory of protein folding. In 1969, Cyrus Levinthal noted that, because of the very large number of degrees of freedom in an unfolded polypeptide chain, the molecule has an astronomical number of possible conformations. An estimate of 3300 or 10143 was made in one of his papers.[1] (Often incorrectly cited as a 1968 paper.[2]) For example, a polypeptide of 100 residues will have 99 peptide bonds, and therefore 198 different phi and psi bond angles. If each of these bond angles can be in one of three stable conformations, the protein may misfold into a maximum of 3198 different conformations (including any possible folding redundancy). Therefore if a protein were to attain its correctly folded configuration by sequentially sampling all the possible conformations, it would require a time longer than the age of the universe to arrive at its correct native conformation. This is true even if conformations are sampled at rapid (nanosecond or picosecond) rates. The "paradox" is that most small proteins fold spontaneously on a millisecond or even microsecond time scale. This paradox is central to computational approaches to protein structure prediction.[3]

Levinthal himself was aware that proteins fold spontaneously and on short timescales. He suggested that the paradox can be resolved if "protein folding is sped up and guided by the rapid formation of local interactions which then determine the further folding of the peptide; this suggests local amino acid sequences which form stable interactions and serve as nucleation points in the folding process."[4] Indeed, the protein folding intermediates and the partially folded transition states were experimentally detected, which explains the fast protein folding. This is also described as protein folding directed within funnel-like energy landscapes[5][6][7] Some computational approaches to protein structure prediction have sought to identify and simulate the mechanism of protein folding.[8]

Levinthal also suggested that the native structure might have a higher energy, if the lowest energy was not kinetically accessible. An analogy is a rock tumbling down a hillside that lodges in a gully rather than reaching the base.[9]

Suggested explanations

See also

References

  1. Levinthal, Cyrus (1969). "How to Fold Graciously". Mossbauer Spectroscopy in Biological Systems: Proceedings of a meeting held at Allerton House, Monticello, Illinois: 22–24. Archived from the original on 2010-10-07.
  2. Levinthal, Cyrus (1968). "Are there pathways for protein folding?". Journal de Chimie Physique et de Physico-Chimie Biologique 65: 44–45. Archived from the original on 2009-09-02.
  3. Zwanzig R, Szabo A, Bagchi B (1992-01-01). "Levinthal's paradox". Proc Natl Acad Sci USA 89 (1): 20–22. doi:10.1073/pnas.89.1.20. PMC 48166. PMID 1729690.
  4. Rooman, Marianne Rooman; Yves Dehouck; Jean Marc Kwasigroch; Christophe Biot; Dimitri Gilis (2002). "What is paradoxical about Levinthal Paradox?". Journal of Biomolecular Structure and Dynamics 20 (3): 327–329. doi:10.1080/07391102.2002.10506850. PMID 12437370.
  5. Dill K & H.S. Chan (1997). "From Levinthal to pathways to funnels". Nat. Struct. Biol. 4 (1): 10–19. doi:10.1038/nsb0197-10. PMID 8989315.
  6. Durup, Jean (1998). "On "Levinthal paradox" and the theory of protein folding". Journal of Molecular Structure 424 (1–2): 157–169. doi:10.1016/S0166-1280(97)00238-8.
  7. s˘Ali, Andrej; Shakhnovich, Eugene; Karplus, Martin (1994). "How does a protein fold?". Nature 369 (6477): 248–251. doi:10.1038/369248a0. PMID 7710478.
  8. Karplus, Martin (1997). "The Levinthal paradox: yesterday and today". Folding and Design 2 (4): S69–S75. doi:10.1016/S1359-0278(97)00067-9. PMID 9269572.
  9. Hunter, Philip (2006). "Into the fold". EMBO Rep. 7 (3): 249–252. doi:10.1038/sj.embor.7400655. PMC 1456894. PMID 16607393.
  10. Berezovsky, Igor N.; Trifonov, Edward N. (2002). "Loop fold structure of proteins: Resolution of Levinthal's paradox". Journal of Biomolecular Structure & Dynamics 20 (1): 5–6. doi:10.1080/07391102.2002.10506817. ISSN 0739-1102.

External links