Cooperative binding
Molecular binding is an interaction between molecules that results in a stable physical association between those molecules. Cooperative binding occurs in binding systems that are constituted by more than one type (species) of molecule (say molecules A and B) and in which one of the partners is not mono-valent; i.e., it binds more than one molecule of the other molecular species. For example, one molecule of type A can bind 6 molecules of type B (in such cases, B is usually referred to as the "ligand"). Binding in this type of system can be considered "cooperative" if the binding of B to one site on A is affected by the binding of B to other site(s) on A. In other words, the binding of B molecules to the different sites on A do not constitute mutually independent events. This can be due, for instance, to an affinity for the ligand that depends on the amount of ligand bound. Cooperativity can be positive or negative. Cooperative binding is observed in many biopolymers, including proteins and nucleic acids. Cooperative binding has been shown to be the mechanism underlying a large range of biochemical and physiological processes.
History and mathematical formalisms
Christian Bohr and the concept of cooperative binding
In 1904, Christian Bohr studied hemoglobin binding to oxygen under different conditions.[1][2] When plotting hemoglobin saturation with oxygen as a function of the partial pressure of oxygen, he obtained a sigmoidal (or "S-shaped") curve, see Figure 1. This indicates that the more oxygen is bound to hemoglobin, the easier it is for more oxygen to bind - until all binding sites are saturated. In addition, Bohr noticed that increasing CO2 pressure shifted this curve to the right - i.e. higher concentrations of CO2 make it more difficult for hemoglobin to bind oxygen.[2] This latter phenomenon, together with the observation that hemoglobin's affinity for oxygen increases with increasing pH, is known as the Bohr effect.
A receptor molecule is said to exhibit cooperative binding if its binding to ligand scales non-linearly with ligand concentration. Cooperativity can be positive (if binding of a ligand molecule increases the receptor's apparent affinity, and hence increases the chance of another ligand molecule binding) or negative (if binding of a ligand molecule decreases affinity and hence makes binding of other ligand molecules less likely). Figure 1 is a chart of the "fractional occupancy" of a receptor with a given ligand, which is defined as the quantity of ligand-bound binding sites divided by the total quantity of ligand binding sites:
If , then the protein is completely unbound, and if , it is completely saturated. If the plot of at equilibrium as a function of ligand concentration is sigmoidal in shape, as observed by Bohr for hemoglobin, this indicates positive cooperativity. If it is not, no statement can be made about cooperativity from looking at this plot alone.
The concept of cooperative binding only applies to molecules or complexes with more than one ligand binding sites. If several ligand binding sites exist, but ligand binding to any one site does not affect the others, the receptor is said to be non-cooperative. Cooperativity can be homotropic, if a ligand influences the binding of ligands of the same kind, or heterotropic, if it influences binding of other kinds of ligands. In the case of hemoglobin, Bohr observed homotropic positive cooperativity (binding of oxygen facilitates binding of more oxygen) and heterotropic negative cooperativity (binding of CO2 reduces hemoglobin's facility to bind oxygen.)
Throughout the 20th century, various frameworks have been developed to describe the binding of a ligand to a protein with more than one binding site and the cooperative effects observed in this context (reviewed by Wyman, J. and Gill, 1990[3]).
The Hill equation
The first description of cooperative binding to a multi-site protein was developed by A.V. Hill.[4] Drawing on observations of oxygen binding to hemoglobin and the idea that cooperativity arose from the aggregation of hemoglobin molecules, each one binding one oxygen molecule, Hill suggested a phenomenological equation that has since been named after him:
where is the "Hill coefficient", denotes ligand concentration, denotes an apparent association constant (used in the original form of the equation), is an apparent dissociation constant (equivalent to an ) and a microscopic dissociation constant (used in modern forms of the equation). If , the system exhibits negative cooperativity, whereas cooperativity is positive if . The total number of ligand binding sites is an upper bound for . The Hill equation can be linearized as:
The "Hill plot" is obtained by plotting versus . In the case of the Hill equation, it is a line with slope and intercept (see Figure 2). This means that cooperativity is assumed to be fixed, i.e. it does not change with saturation. It also means that binding sites always exhibit the same affinity, and cooperativity does not arise from an affinity increasing with ligand concentration.
The Adair equation
G.S. Adair found that the Hill plot for hemoglobin was not a straight line, and hypothesized that binding affinity was not a fixed term, but dependent on ligand saturation.[5] Having demonstrated that hemoglobin contained four hemes (and therefore binding sites for oxygen), he worked from the assumption that fully saturated hemoglobin is formed in stages, with intermediate forms with one, two, or three bound oxygen molecules. The formation of each intermediate stage from unbound hemoglobin can be described using an apparent macroscopic association constant . The resulting fractional occupancy can be expressed as:
Or, for any protein with n ligand binding sites:
where n denotes the number of binding sites and each is a combined association constant, describing the binding of i ligand molecules. By combining the Adair treatment with the Hill plot, one arrives at the modern experimental definition of cooperativity (Hill, 1985, Abeliovich, 2005). The resultant Hill coefficient, or more correctly the slope of the Hill plot as calculated from the Adair Equation, can be shown to be the ratio between the variance of the binding number to the ratio of the binding number in an equivalent system of non-interacting binding sites.[6] Thus, the Hill coefficient defines cooperativity as a statistical dependence of one binding site on the state of other site(s).
The Klotz equation
Working on calcium binding proteins, Irving Klotz deconvoluted Adair's association constants by considering stepwise formation of the intermediate stages, and tried to express the cooperative binding in terms of elementary processes governed by mass action law.[7][8] In his framework, is the association constant governing binding of the first ligand molecule, the association constant governing binding of the second ligand molecule (once the first is already bound) etc. For , this gives:
It is worth noting that the constants , and so forth do not relate to individual binding sites. They describe how many binding sites are occupied, rather than which ones. This form has the advantage that cooperativity is easily recognised when considering the association constants. If all ligand binding sites are identical with a microscopic association constant , one would expect (that is ) in the absence of cooperativity. We have positive cooperativity if lies above these expected values for .
The Klotz equation (which is sometimes also called the Adair-Klotz equation) is still often used in the experimental literature to describe measurements of ligand binding in terms of sequential apparent binding constants.[7]
Pauling equation
By the middle of the 20th century, there was an increased interest in models that would not only describe binding curves phenomenologically, but offer an underlying biochemical mechanism. Linus Pauling reinterpreted the equation provided by Adair, assuming that his constants were the combination of the binding constant for the ligand ( in the equation below) and energy coming from the interaction between subunits of the cooperative protein ( below).[9] Pauling actually derived several equations, depending on the degree of interaction between subunits. Based on wrong assumptions about the localization of hemes, he opted for the wrong one to describe oxygen binding by hemoglobin, assuming the subunit were arranged in a square. The equation below provides the equation for a tetrahedral structure, which would be more accurate in the case of hemoglobin:
The KNF model
Based on results showing that the structure of cooperative proteins changed upon binding to their ligand, Daniel Koshland and colleagues[10] refined the biochemical explanation of the mechanism described by Pauling.[9] The Koshland-Némethy-Filmer (KNF) model assumes that each subunit can exist in one of two conformations: active or inactive. Ligand binding to one subunit would induce an immediate conformational change of that subunit from the inactive to the active conformation, a mechanism described as "induced fit".[11] Cooperativity, according to the KNF model, would arise from interactions between the subunits, the strength of which varies depending on the relative conformations of the subunits involved. For a tetrahedric structure (they also considered linear and square structures), they proposed the following formula:
Where is the constant of association for X, is the ratio of B and A states in the absence of ligand ("transition"), and are the relative stabilities of pairs of neighbouring subunits relative to a pair where both subunits are in the A state (Note that the KNF paper actually presents , the number of occupied sites, which is here 4 times ).
The MWC model
The Monod-Wyman-Changeux (MWC) model for concerted allosteric transitions[12] went a step further by exploring cooperativity based on thermodynamics and three-dimensional conformations. It was originally formulated for oligomeric proteins with symmetrically arranged, identical subunits, each of which has one ligand binding site. According to this framework, two (or more) interconvertible conformational states of an allosteric protein coexist in a thermal equilibrium. The states - often termed tense (T) and relaxed (R) - differ in affinity for the ligand molecule. The ratio between the two states is regulated by the binding of ligand molecules that stabilizes the higher-affinity state. Importantly, all subunits of a molecule change states at the same time, a phenomenon known as "concerted transition". The MWC model is illustrated in Figure 3.
The allosteric isomerisation constant L describes the equilibrium between both states when no ligand molecule is bound: . If L is very large, most of the protein exists in the T state in the absence of ligand. If L is small (close to one), the R state is nearly as populated as the T state. The ratio of dissociation constants for the ligand from the T and R states is described by the constant c: . If , both R and T states have the same affinity for the ligand and the ligand does not affect isomerisation. The value of c also indicates how much the equilibrium between T and R states changes upon ligand binding: the smaller c, the more the equilibrium shifts towards the R state after one binding. With , fractional occupancy is described as:
The sigmoid Hill plot of allosteric proteins (shown in Figure 5) can then be analysed as a progressive transition from the T state (low affinity) to the R state (high affinity) as the saturation increases (see Figure 4). The slope of the Hill plot also depends on saturation, with a maximum value at the inflexion point. The intercepts between the two asymptotes and the y-axis allow to determine the affinities of both states for the ligand.
In proteins, conformational change is often associated with activity, or activity towards specific targets. Such activity is often what is physiologically relevant or what is experimentally measured. The degree of conformational change is described by the state function , which denotes the fraction of protein present in the state. As the energy diagram illustrates, increases as more ligand molecules bind. The expression for is:
A crucial aspect of the MWC model is that the curves for and do not coincide,[13] i.e. fractional saturation is not a direct indicator of conformational state (and hence, of activity). Moreoever, the extents of the cooperativity of binding and the cooperativity of activation can be very different: an extreme case is provide by the bacteria flagella motor with a Hill coefficient of 1.7 for the binding and 10.3 for the activation.[14][15] The supra-linearity of the response is sometimes called ultrasensitivity.
If an allosteric protein binds to a target that also has a higher affinity for the R state, then target binding further stabilizes the R state, hence increasing ligand affinity. If, on the other hand, a target preferentially binds to the T state, then target binding will have a negative effect on ligand affinity. Such targets are called allosteric modulators.
Since its inception, the MWC framework has been extended and generalized. Variations have been proposed, for example to cater for proteins with more than two states,[16] proteins that bind to several types of ligands [17][18] or several types of allosteric modulators [18] and proteins with non-identical subunits or ligand-binding sites.[19]
Examples of cooperative binding
The list of molecular assemblies that exhibit cooperative binding of ligands is very large, but some examples are particularly notable for their historical interest, their unusual properties, or their physiological importance.
As described in the historical section, the most famous example of cooperative binding is hemoglobin. Its quaternary structure, solved by Max Perutz using X-ray diffraction,[20] exhibits a pseudo-symmetrical tetrahedron carrying four binding sites (hemes) for oxygen (see Figure 6). Many other molecular assemblies exhibiting cooperative binding have been studied in great detail.
Multimeric enzymes
The activity of many enzymes is regulated by allosteric effectors. Some of these enzymes are multimeric and carry several binding sites for the regulators.
Threonine deaminase was one of the first enzymes suggested to behave like hemoglobin[21] and shown to bind ligands cooperatively.[22] It was later shown to be a tetrameric protein.[23]
Another enzyme that has been suggested early to bind ligands cooperatively is aspartate trans-carbamylase.[24] Although initial models were consistent with four binding sites,[25] its structure was later shown to be hexameric by William Lipscomb and colleagues.[26]
Ion Channels
Most ion channels are formed of several identical or pseudo-identical monomers or domains, arranged symmetrically in biological membranes. Several classes of such channels whose opening is regulated by ligands exhibit cooperative binding of these ligands.
It was suggested as early as 1967[27] (when the exact nature of those channels was still unknown) that the nicotinic acetylcholine receptors bound acetylcholine in a cooperative manner due to the existence of several binding sites. The purification of the receptor[28] and its characterization demonstrated a pentameric structure with binding sites located at the interfaces between subunits, confirmed by the structure of the receptor binding domain.[29]
Inositol triphosphate (IP3) receptors form another class of ligand-gated ion channels exhibiting cooperative binding.[30] The structure of those receptors shows four IP3 binding sites symmetrically arranged.[31]
Multi-site molecules
Although most proteins showing cooperative binding are multimeric complexes of homologous subunits, some proteins carry several binding sites for the same ligand on the same polypeptide. One such example is calmodulin. One molecule of calmodulin binds four calcium ions cooperatively.[32] Its structure presents four EF-hand domains,[33] each one binding one calcium ion. Interestingly, the molecule does not display a square or tetrahedron structure, but is formed of two lobes, each carrying two EF-hand domains.
Transcription factors
Cooperative binding of proteins onto nucleic acids has also been shown. A classical example is the binding of the lambda phage repressor to its operators, which occurs cooperatively.[34][35] Other examples of transcription factors exhibit positive cooperativity when binding their target, such as the repressor of the TtgABC pumps[36] (n=1.6).
Conversely, examples of negative cooperativity for the binding of transcription factors were also documented, as for the homodimeric repressor of the Pseudomonas putida cytochrome P450cam hydroxylase operon[37] (n=0.56).
Conformational spread and binding cooperativity
Early on, it has been argued that some proteins, especially those consisting of many subunits, could be regulated by a generalized MWC mechanism, in which the transition between R and T state is not necessarily synchronized across the entire protein.[38] In 1969, Wyman [39] proposed such a model with "mixed conformations" (i.e. some protomers in the R state, some in the T state) for respiratory proteins in invertebrates.
Following a similar idea, the conformational spread model by Duke and colleagues[40] subsumes both the KNF and the MWC model as special cases. In this model, a subunit does not automatically change conformation upon ligand binding (as in the KNF model), nor do all subunits in a complex change conformations together (as in the MWC model). Conformational changes are stochastic with the likelihood of a subunit switching states depending on whether or not it is ligand bound and on the conformational state of neighbouring subunits. Thus, conformational states can "spread" around the entire complex.
References
- ↑ Bohr, C. (1904) Die Sauerstoffaufnahme des genuinen Blutfarbstoffes und des aus dem Blute dargestellten Hämoglobins, Zentralblatt Physiol. 23, 688–690.
- ↑ 2.0 2.1 Bohr, C., Hasselbalch, K., and Krogh, A. (1904) Ueber einen in biologischer Beziehung wichtigen Einfluss, den die Kohlensäurespannung des Blutes auf dessen Sauerstoffbindung übt. Skandinavisches Archiv Für Physiologie, 16(2): 402-412. doi:10.1111/j.1748-1716.1904.tb01382.x.
- ↑ Wyman, J. and Gill, S. J. (1990) Binding and linkage. Functional chemistry of biological molecules. University Science Books, Mill Valley.
- ↑ Hill, A. V. (1910) 'The possible effects of the aggregation of the molecules of haemoglobin on its dissociation curves. J Physiol 40: iv-vii.
- ↑ Adair, G.S. (1925) The hemoglobin system. IV. The oxygen dissociation curve of hemoglobin. J Biol Chem 63:529-545
- ↑ Abeliovich, H (2005). "An empirical extremum principle for the hill coefficient in ligand-protein interactions showing negative cooperativity". Biophysical Journal 89 (1): 76–9. doi:10.1529/biophysj.105.060194. PMC 1366580. PMID 15834004.
- ↑ 7.0 7.1 Klotz, I. M. (1946). "The application of the law of mass action to binding by proteins; interactions with calcium". Archives of biochemistry 9: 109–117. PMID 21009581.
- ↑ Klotz, I. M. (2003). "Ligand-Receptor Complexes: Origin and Development of the Concept". Journal of Biological Chemistry 279 (1): 1–12. doi:10.1074/jbc.X300006200. PMID 14604979.
- ↑ 9.0 9.1 Pauling, L. (1935). "The Oxygen Equilibrium of Hemoglobin and Its Structural Interpretation". Proceedings of the National Academy of Sciences of the United States of America 21 (4): 186–191. doi:10.1073/pnas.21.4.186. PMC 1076562. PMID 16587956.
- ↑ Koshland Jr, D. E.; Némethy, G.; Filmer, D. (1966). "Comparison of experimental binding data and theoretical models in proteins containing subunits". Biochemistry 5 (1): 365–385. doi:10.1021/bi00865a047. PMID 5938952.
- ↑ Koshland, D. E. (1958). "Application of a Theory of Enzyme Specificity to Protein Synthesis". Proceedings of the National Academy of Sciences of the United States of America 44 (2): 98–104. doi:10.1073/pnas.44.2.98. PMC 335371. PMID 16590179.
- ↑ Monod, J.; Wyman, J.; Changeux, J. P. (1965). "On the Nature of Allosteric Transitions: A Plausible Model". Journal of Molecular Biology 12: 88–118. doi:10.1016/S0022-2836(65)80285-6. PMID 14343300.
- ↑ Rubin, M. M.; Changeux, J. P. (1966). "On the nature of allosteric transitions: Implications of non-exclusive ligand binding". Journal of molecular biology 21 (2): 265–274. doi:10.1016/0022-2836(66)90097-0. PMID 5972463.
- ↑ Cluzel, P.; Surette, M.; Leibler, S. (2000). "An ultrasensitive bacterial motor revealed by monitoring signaling proteins in single cells". Science 287 (5458): 1652–1655. doi:10.1126/science.287.5458.1652. PMID 10698740.
- ↑ Sourjik, V.; Berg, H. C. (2002). "Binding of the Escherichia coli response regulator CheY to its target measured in vivo by fluorescence resonance energy transfer". Proceedings of the National Academy of Sciences 99 (20): 12669–12674. doi:10.1073/pnas.192463199. PMC 130518. PMID 12232047.
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- ↑ Mello, B. A.; Tu, Y. (2005). "An allosteric model for heterogeneous receptor complexes: Understanding bacterial chemotaxis responses to multiple stimuli". Proceedings of the National Academy of Sciences 102 (48): 17354–17359. doi:10.1073/pnas.0506961102. PMC 1297673. PMID 16293695.
- ↑ 18.0 18.1 Najdi, T. S.; Yang, C. R.; Shapiro, B. E.; Hatfield, G. W.; Mjolsness, E. D. (2006). "Application of a generalized MWC model for the mathematical simulation of metabolic pathways regulated by allosteric enzymes". Journal of bioinformatics and computational biology 4 (2): 335–355. doi:10.1142/S0219720006001862. PMID 16819787.
- ↑ Stefan, M. I.; Edelstein, S. J.; Le Novère, N. (2009). "Computing phenomenologic Adair-Klotz constants from microscopic MWC parameters". BMC Systems Biology 3: 68. doi:10.1186/1752-0509-3-68. PMC 2732593. PMID 19602261.
- ↑ Perutz, M. F.; Rossmann, M. G.; Cullis, A. F.; Muirhead, H.; Will, G.; North, A. C. (1960). "Structure of haemoglobin: A three-dimensional Fourier synthesis at 5.5-A. Resolution, obtained by X-ray analysis". Nature 185 (4711): 416–422. doi:10.1038/185416a0. PMID 18990801.
- ↑ Changeux, J. P. (1961). "The feedback control mechanisms of biosynthetic L-threonine deaminase by L-isoleucine". Cold Spring Harbor symposia on quantitative biology 26: 313–318. doi:10.1101/SQB.1961.026.01.037. PMID 13878122.
- ↑ Changeux, J.-P. (1963) Allosteric Interactions on Biosynthetic L-threonine Deaminase from E. coli K12. Cold Spring Harb Symp Quant Biol 28: 497-504
- ↑ Gallagher, D. T.; Gilliland, G. L.; Xiao, G.; Zondlo, J.; Fisher, K. E.; Chinchilla, D.; Eisenstein, E. (1998). "Structure and control of pyridoxal phosphate dependent allosteric threonine deaminase". Structure (London, England : 1993) 6 (4): 465–475. doi:10.1016/s0969-2126(98)00048-3. PMID 9562556.
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- ↑ Honzatko, R. B.; Crawford, J. L.; Monaco, H. L.; Ladner, J. E.; Ewards, B. F.; Evans, D. R.; Warren, S. G.; Wiley, D. C.; Ladner, R. C.; Lipscomb, W. N. (1982). "Crystal and molecular structures of native and CTP-liganded aspartate carbamoyltransferase from Escherichia coli". Journal of Molecular Biology 160 (2): 219–263. doi:10.1016/0022-2836(82)90175-9. PMID 6757446.
- ↑ Karlin, A. (1967). "On the application of "a plausible model" of allosteric proteins to the receptor for acetylcholine". Journal of theoretical biology 16 (2): 306–320. PMID 6048545.
- ↑ Changeux, J.; Kasai, M.; Lee, C. (1970). "Use of a snake venom toxin to characterize the cholinergic receptor protein". Proceedings of the National Academy of Sciences of the United States of America 67 (3): 1241–1247. doi:10.1073/pnas.67.3.1241. PMC 283343. PMID 5274453.
- ↑ Brejc, K.; Van Dijk, W. J.; Klaassen, R. V.; Schuurmans, M.; Van Der Oost, J.; Smit, A. B.; Sixma, T. K. (2001). "Crystal structure of an ACh-binding protein reveals the ligand-binding domain of nicotinic receptors". Nature 411 (6835): 269–276. doi:10.1038/35077011. PMID 11357122.
- ↑ Meyer, T.; Holowka, D.; Stryer, L. (1988). "Highly cooperative opening of calcium channels by inositol 1,4,5-trisphosphate". Science 240 (4852): 653–656. doi:10.1126/science.2452482. PMID 2452482.
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- ↑ Babu, Y. S.; Sack, J. S.; Greenhough, T. J.; Bugg, C. E.; Means, A. R.; Cook, W. J. (1985). "Three-dimensional structure of calmodulin". Nature 315 (6014): 37–40. doi:10.1038/315037a0. PMID 3990807.
- ↑ Ptashne, M.; Jeffrey, A.; Johnson, A. D.; Maurer, R.; Meyer, B. J.; Pabo, C. O.; Roberts, T. M.; Sauer, R. T. (1980). "How the lambda repressor and cro work". Cell 19 (1): 1–11. doi:10.1016/0092-8674(80)90383-9. PMID 6444544.
- ↑ Ackers, G. K.; Johnson, A. D.; Shea, M. A. (1982). "Quantitative model for gene regulation by lambda phage repressor". Proceedings of the National Academy of Sciences of the United States of America 79 (4): 1129–1133. doi:10.1073/pnas.79.4.1129. PMC 345914. PMID 6461856.
- ↑ Krell, T.; Terán, W.; Mayorga, O. L. P.; Rivas, G. N.; Jiménez, M.; Daniels, C.; Molina-Henares, A. J. S.; Martínez-Bueno, M.; Gallegos, M. A. T.; Ramos, J. L. (2007). "Optimization of the Palindromic Order of the TtgR Operator Enhances Binding Cooperativity". Journal of Molecular Biology 369 (5): 1188–1199. doi:10.1016/j.jmb.2007.04.025. PMID 17498746.
- ↑ Aramaki, H.; Kabata, H.; Takeda, S.; Itou, H.; Nakayama, H.; Shimamoto, N. (2011). "Formation of repressor-inducer-operator ternary complex: Negative cooperativity of d-camphor binding to CamR". Genes to Cells 16 (12): 1200–1207. doi:10.1111/j.1365-2443.2011.01563.x. PMID 22093184.
- ↑ Changeux, J. P.; Thiéry, J.; Tung, Y.; Kittel, C. (1967). "On the cooperativity of biological membranes". Proceedings of the National Academy of Sciences of the United States of America 57 (2): 335–341. doi:10.1073/pnas.57.2.335. PMC 335510. PMID 16591474.
- ↑ Wyman, J. (1969). "Possible allosteric effects in extended biological systems". Journal of molecular biology 39 (3): 523–538. doi:10.1016/0022-2836(69)90142-9. PMID 5357210.
- ↑ Duke, T. A. J.; Le Novère, N.; Bray, D. (2001). "Conformational spread in a ring of proteins: A stochastic approach to allostery". Journal of Molecular Biology 308 (3): 541–553. doi:10.1006/jmbi.2001.4610. PMID 11327786.
- This article incorporates text from a scholarly publication published under a copyright license that allows anyone to reuse, revise, remix and redistribute the materials in any form for any purpose: Stefan, M. I.; Le Novère, N. (2013). Wodak, Shoshana, ed. "Cooperative Binding". PLoS Computational Biology 9 (6): e1003106. doi:10.1371/journal.pcbi.1003106. Please check the source for the exact licensing terms.