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  • Predictability and Preparedness in Influenza Control

    <table border="0" cellpadding="0" cellspacing="0" width="100%"><tbody><tr><td align="left">Science 21 April 2006:
    Vol. 312. no. 5772, pp. 392 - 394
    DOI: 10.1126/science.1122665
    </td> <td align="right"> Prev | Table of Contents | Next
    </td> </tr> </tbody></table> Perspective

    <!-- BEGIN: legacy HTML content --> <!--RESUMEHIGHLIGHT--> Predictability and Preparedness in Influenza Control

    <nobr>Derek J. Smith</nobr> The threat of pandemic human influenza looms as we survey the<sup> </sup>ongoing avian influenza pandemic and wonder if and when it will<sup> </sup>jump species. What are the risks and how can we plan? The nub<sup> </sup>of the problem lies in the inherent variability of the virus,<sup> </sup>which makes prediction difficult. However, it is not impossible;<sup> </sup>mathematical models can help determine and quantify critical<sup> </sup>parameters and thresholds in the relationships of those parameters,<sup> </sup>even if the relationships are nonlinear and obscure to simple<sup> </sup>reasoning. Mathematical models can derive estimates for the<sup> </sup>levels of drug stockpiles needed to buy time, how and when to<sup> </sup>modify vaccines, whom to target with vaccines and drugs, and<sup> </sup>when to enforce quarantine measures. Regardless, the models<sup> </sup>used for pandemic planning must be tested, and for this we must<sup> </sup>continue to gather data, not just for exceptional scenarios<sup> </sup>but also for seasonal influenza.<sup> </sup>
    Department of Zoology, University of Cambridge, Downing Street, Cambridge, CB2 3EJ, UK and National Influenza Center and Department of Virology, Erasmus Medical Center, Doctor Molewaterplein 50, 3015GE Rotterdam, Netherlands.
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    E-mail: dsmith@zoo.cam.ac.uk<script type="text/javascript"><!-- var u = "dsmith", d = "zoo.cam.ac.uk"; document.getElementById("em0").innerHTML = '<a href="mailto:' + u + '@' + d + '">' + u + '@' + d + '<\/a>'//--></script>
    Few would be surprised if there were an influenza H5 (bird flu)<sup> </sup>pandemic in humans. The source and basic mechanisms of the threat<sup> </sup>are clear, yet there is much we cannot predict: how severe such<sup> </sup>a pandemic would be, how fast it would spread, where it would<sup> </sup>start, whether it would become resistant to existing drugs,<sup> </sup>what strain to use in a vaccine, or whether a vaccine would<sup> </sup>be available in time to protect a large proportion of the population.<sup> </sup>Most important, we do not know how close the virus is to sustained<sup> </sup>human-to-human transmission, and thus to initiating a pandemic.<sup> </sup>
    How can there be this much uncertainty when many of the best<sup> </sup>virologists, molecular biologists, epidemiologists, and public<sup> </sup>health scientists work or have worked on the influenza virus,<sup> </sup>when so much is already known, and when the global surveillance<sup> </sup>system is better than the system for any other pathogen? The<sup> </sup>answer lies in the inherent variability of influenza viruses,<sup> </sup>in their seemingly endless capacity to continue to change, and,<sup> </sup>in the case of type A viruses, in their rich and diverse ecology<sup> </sup>in many species and their ability to cross species barriers<sup> </sup>and adapt to new hosts (1, 2).<sup> </sup>
    An influenza H5 virus capable of causing a pandemic in humans<sup> </sup>is likely to differ from the avian H5 viruses that have caused<sup> </sup>a pandemic in birds and have occasionally caused highly pathogenic<sup> </sup>infections in humans. A human-adapted H5 virus, by definition,<sup> </sup>should be able to transmit effectively among humans; it might<sup> </sup>have antigenic differences compared with avian strains and would<sup> </sup>possibly be less pathogenic in humans. Adaptation to the human<sup> </sup>host may occur as a result of either mutation or a combination<sup> </sup>of mutation and reassortment with an existing human virus. A<sup> </sup>key event would probably be a change in the binding specificity<sup> </sup>of the virus from a receptor in the lower respiratory tract<sup> </sup>to one in the upper respiratory tract. This may result in a<sup> </sup>decrease in at least the initial pathogenicity, as the infection<sup> </sup>would be more likely to start with a tracheal bronchitis rather<sup> </sup>than pneumonia (3, 4). In addition, if human adaptation resulted<sup> </sup>from reassortment with a human virus, pathogenicity factors<sup> </sup>on gene segments not in the resulting reassortment would be<sup> </sup>lost, and there may be a degree of prior immunity in the population<sup> </sup>to the human virus?derived gene segments, both further<sup> </sup>reducing pathogenicity in humans.<sup> </sup>
    The large possible range for pathogenicity is also evident in<sup> </sup>the differences in mortality during the three influenza pandemics<sup> </sup>of the past century: The 1918 pandemic killed an estimated 40<sup> </sup>to 50 million people, the 1957 pandemic killed an estimated<sup> </sup>2 million people, and the 1968 pandemic an killed an estimated<sup> </sup>1 million people.<sup> </sup>
    Despite these uncertainties, national and international public<sup> </sup>health bodies have to prepare for a potential influenza pandemic.<sup> </sup>Mathematical and computational methods can provide valuable<sup> </sup>quantitative information for influenza preparedness in the face<sup> </sup>of uncertainty. Here, I discuss how such methods are being used<sup> </sup>to improve preparedness.<sup> </sup>

    The Dynamics of Spread and Effect of Interventions
    Because of the delay before a pandemic vaccine will be available,<sup> </sup>the immediate defenses against pandemic influenza are the neuraminidase-inhibitor<sup> </sup>antiviral drugs, oseltamivir and zanamivir. The World Health<sup> </sup>Organization (WHO) has a stockpile of oseltamivir to use in<sup> </sup>early cases of human-to-human transmissions of a potential pandemic<sup> </sup>virus to attempt to slow the outbreak and create more time for<sup> </sup>vaccine production and other preparations. However, the unknowns<sup> </sup>regarding a potential pandemic virus, including how quickly<sup> </sup>the virus spreads, the efficacy of the drugs, and the rate of<sup> </sup>acquisition of drug resistance by the virus, make it difficult<sup> </sup>to predict how useful a drug stockpiling strategy would be.<sup> </sup>
    A better use of resources may be to pursue alternative routes<sup> </sup>to vaccine development, vaccine stockpiling, or prepandemic<sup> </sup>vaccination. Here, mathematical models can be valuable to help<sup> </sup>decide strategy, particularly for quantifying the variability<sup> </sup>of possible outcomes for a range of estimates of critical parameters,<sup> </sup>such as the transmission rate of the virus. Detailed epidemiological<sup> </sup>models have recently been developed to make quantitative predictions<sup> </sup>of the spread of an unchecked outbreak (Fig. 1), and how effective<sup> </sup>an antiviral stockpile could be in slowing or stopping an outbreak<sup> </sup>before it causes a pandemic (5, 6). Taking Thailand as the scenario,<sup> </sup>the models show what it would take to stop an outbreak in terms<sup> </sup>of speed and accuracy of detection, speed of delivery, delivery<sup> </sup>strategy (contact-based or geographic-based), and the total<sup> </sup>quantity of drugs required. Thus, if the delivery of antivirals<sup> </sup>is rapid enough, and the transmission rate of the virus is approximately<sup> </sup>the same as that observed for previous pandemic viruses, then<sup> </sup>it should be possible to stop a single outbreak with a realistically<sup> </sup>sized stockpile of antiviral drugs. The models also predict<sup> </sup>that for effective control, antiviral prophylaxis would have<sup> </sup>to be started within about 3 weeks of the first human-to-human<sup> </sup>transmissions and within 2 days of the onset of a new case after<sup> </sup>an outbreak is underway; in practice, this would be extremely<sup> </sup>difficult to achieve in rural Southeast Asia. These examples<sup> </sup>show how models can reveal weaknesses, inform plans for training,<sup> </sup>indicate ways of deploying an antiviral stockpile, and estimate<sup> </sup>its necessary size (7). However, it is important to recognize<sup> </sup>that even if drug intervention were successful, it may only<sup> </sup>temporarily stall a potential pandemic (8).<sup> </sup>
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    <center><table cellpadding="0" cellspacing="0" width="95%"><tbody><tr bgcolor="#e1e1e1"><td><table cellpadding="2" cellspacing="2"> <tbody><tr bgcolor="#e1e1e1"><td align="center" bgcolor="#ffffff" valign="top"> </td><td align="left" valign="top"> Fig. 1. Expected pattern of spread of an uncontrolled influenza epidemic in Thailand. Time sequence (in days) of an epidemic, showing spread in a single simulation of an epidemic parameterized such that, on average, in a fully susceptible population, each person infects 1.5 others (i.e., R<sub>0</sub> = 1.5). Red indicates presence of infected individuals, green the density of people who have recovered from infection or died. [Reprinted from (5).] <nobr>[View Larger Version of this Image (28K GIF file)]</nobr> </td></tr></tbody></table> </td></tr></tbody></table></center>
    <sup> </sup> The Thailand scenario was also used to predict the effect of<sup> </sup>control measures such as quarantine, restriction of movement,<sup> </sup>the closing of schools and workplaces, vaccination, and their<sup> </sup>effects on slowing an outbreak. Likewise, such models can be<sup> </sup>adjusted for geographic, demographic, and movement patterns<sup> </sup>in other countries, and be used to update national pandemic<sup> </sup>preparedness plans before and even during the course of a pandemic.<sup> </sup>

    Antigenic Evolution and Vaccine Strain Selection
    The mainstay of seasonal influenza control is vaccination. The<sup> </sup>primary target for the human immune response is the viral hemagglutinin<sup> </sup>protein. Consequently, the hemagglutinin of the strain of influenza<sup> </sup>virus used to produce the vaccine needs to be a good antigenic<sup> </sup>match to that of the wild-type strains. The hemagglutinin of<sup> </sup>human influenza viruses evolves sufficiently rapidly that an<sup> </sup>extensive global surveillance network is necessary to track<sup> </sup>the evolution of the virus, and the strains used in the seasonal<sup> </sup>influenza virus vaccine have to be updated, often annually,<sup> </sup>to maintain antigenic similarity between wild-type and vaccine<sup> </sup>strains (9).<sup> </sup>
    Antigenic differences among viral isolates are measured by the<sup> </sup>hemagglutination inhibition assay, but these data are sometimes<sup> </sup>difficult to interpret. Antigenic cartography resolves many<sup> </sup>of these difficulties, increases the resolution at which antigenic<sup> </sup>data can be interpreted, makes the interpretation more quantitative,<sup> </sup>and provides a visualization of antigenic differences among<sup> </sup>strains (10) (Fig. 2). These methods are now integrated into<sup> </sup>the biannual WHO seasonal vaccine strain-selection process.<sup> </sup>They are also being used to map the antigenic evolution of H5<sup> </sup>viruses and will be used to evaluate the breadth of immunity<sup> </sup>offered by pandemic vaccines.<sup> </sup>
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    <center><table cellpadding="0" cellspacing="0" width="95%"><tbody><tr bgcolor="#e1e1e1"><td><table cellpadding="2" cellspacing="2"> <tbody><tr bgcolor="#e1e1e1"><td align="center" bgcolor="#ffffff" valign="top"> </td><td align="left" valign="top"> Fig. 2. Antigenic evolution of human influenza A (H3N2) virus from 1968 to 2003. The relative positions of strains (colored shapes) and antisera (open shapes) were adjusted such that the distances between strains and antisera in the map represent the corresponding hemagglutination inhibition (HI) measurements with the least error. The periphery of each shape denotes a 0.5 unit increase in the total error and is a measure of confidence in the placement of the strain or antiserum. Strain color represents the antigenic cluster to which the strain belongs; antisera are not colored. Clusters were identified by a k-means clustering algorithm and named after the first vaccine strain in the cluster. Two letters refer to the location of isolation: HK, Hong Kong, China; VI, Victoria, Australia; TX, Texas, United States; BK, Bangkok, Thailand; SI, Sichuan, China; BE, Beijing, China; WU, Wuhan, China; SY, Sydney, Australia; and FU, Fujian, China) and the two digits refer to year of isolation. The grid represents one unit of antigenic distance (i.e., a two-fold dilution in HI titer). [Reprinted from (10).] <nobr>[View Larger Version of this Image (36K GIF file)]</nobr> </td></tr></tbody></table> </td></tr></tbody></table></center>
    <sup> </sup> Although the hemagglutinin of avian influenza viruses is usually<sup> </sup>antigenically stable compared with that of human influenza viruses,<sup> </sup>the antigenic properties of the hemagglutinin of avian H5 viruses<sup> </sup>have changed substantially since 1997; the magnitude of the<sup> </sup>change is similar to that seen in human H3 over the same period.<sup> </sup>Thus, as with seasonal vaccine strain selection, the choice<sup> </sup>of strains for a pandemic vaccine will be critical.<sup> </sup>
    The somewhat regular patterns seen in the human H3 antigenic<sup> </sup>map (Fig. 2) suggest that some aspects of its antigenic evolution<sup> </sup>are predictable. Less is known about the predictability of the<sup> </sup>antigenic evolution of avian H5 viruses. It is not clear whether<sup> </sup>the mutations in the hemagglutinin that have caused the antigenic<sup> </sup>changes in avian H5 since 1997 are directly selected for escape<sup> </sup>from prior immunity (i.e., allowing re-infection) or if the<sup> </sup>mutations accompany other changes in the virus and are selectively<sup> </sup>neutral for the hemagglutinin; if the latter, they would be<sup> </sup>difficult to predict.<sup> </sup>

    Improving Predictions
    Models are approximations of the systems they represent; by<sup> </sup>necessity, they are built with incomplete knowledge and need<sup> </sup>to be tested against either experimental or observational data.<sup> </sup>Thus, it is important to be aware of potential inaccuracies<sup> </sup>and parameter sensitivities when interpreting their results<sup> </sup>and to assess the accuracy of the models. Hence, to test the<sup> </sup>robustness of antigenic cartography (11), the human H3 antigenic<sup> </sup>map was repeatedly constructed from a random subset of the data<sup> </sup>and the constructs used to predict the omitted data. Predicted<sup> </sup>measurements for specific antigen-antiserum combinations not<sup> </sup>present in the original data were also checked by subsequent<sup> </sup>laboratory measurements. Testing models by prediction has not<sup> </sup>yet become standard practice in epidemiological modeling.<sup> </sup>
    The pandemic influenza models discussed here are tours de force<sup> </sup>of painstaking gathering and synthesis of relevant details,<sup> </sup>but their predictions have not yet been tested by comparison<sup> </sup>with real outbreak data. This does not mean that the models<sup> </sup>are not useful in their current form; similar models were instrumental<sup> </sup>in shaping successful control policies during the Foot and Mouth<sup> </sup>Disease virus outbreak in the United Kingdom in 2001 (12, 13)<sup> </sup>and were valuable in supplying rapid estimates of key epidemiological<sup> </sup>parameters including the mortality rate and transmissibility<sup> </sup>during the severe acute respiratory syndrome outbreak in 2003<sup> </sup>(14, 15). Nevertheless, we need data sets, such as those of<sup> </sup>seasonal influenza in regions with good surveillance data, that<sup> </sup>can be used to test the model predictions.<sup> </sup>
    Experimental epidemiological studies, such as the vaccination<sup> </sup>of school children (16), or those that follow family units (17),<sup> </sup>provide core information for model design and parameterization,<sup> </sup>and (especially if there are multiple independent studies) for<sup> </sup>model testing. The large-scale study proposed to test the herd<sup> </sup>immunity effect of vaccinating school children against influenza<sup> </sup>(18) would be extremely valuable in this context. Not only would<sup> </sup>the study test an important prediction for seasonal influenza,<sup> </sup>but it would also provide information about whom to prioritize<sup> </sup>for vaccination when vaccine is scarce, as it could be during<sup> </sup>a pandemic, and it also could provide repeated data sets for<sup> </sup>model testing.<sup> </sup>

    A Final Caveat
    We do not know that a human-adapted H5 will have similar epidemiology<sup> </sup>to human H3. We do know that when in humans, avian H5 infections<sup> </sup>currently have a substantially different clinical picture than<sup> </sup>that of human-adapted H3 infections. Hence, even a perfect epidemiological<sup> </sup>model for human H3 might be a poor model for human H5. Nevertheless,<sup> </sup>a well-understood and accurate human H3 model would be extremely<sup> </sup>valuable in its own right and would be a good starting point<sup> </sup>for any reparameterization necessary for a human H5 epidemiological<sup> </sup>model once the characteristics of the virus are known.<sup> </sup>
    As we focus attention and funds on preparedness for a pandemic,<sup> </sup>we must not lose sight of the necessity for medium-term and<sup> </sup>longer term investments to expand basic understanding of influenza<sup> </sup>viruses at the molecular, immunological, evolutionary, epidemiological,<sup> </sup>and ecological levels. Such increases in our basic understanding,<sup> </sup>some already within reach, will increase our options both to<sup> </sup>control seasonal influenza and our ability to predict and thus<sup> </sup>increase preparedness for the next influenza pandemic?regardless<sup> </sup>of whether it is imminent or many years away.<sup> </sup>

    References and Notes

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    • 1. R. G. Webster, W. J. Bean, O. T. Gorman, T. M. Chambers, Y. Kawaoka, Microbiol. Rev. 56, 152 (1992).<!-- HIGHWIRE ID="312:5772:392:1" --><nobr>[Abstract/Free Full Text]</nobr><!-- /HIGHWIRE --><!-- null -->
    • 2. T. Kuiken et al., Science 312, 394 (2006).<!-- HIGHWIRE ID="312:5772:392:2" --><nobr>[Abstract/Free Full Text]</nobr><!-- /HIGHWIRE --><!-- null -->
    • 3. K. Shinya et al., Nature 440, 435 (2006).<!-- HIGHWIRE ID="312:5772:392:3" --> [CrossRef] [ISI] [Medline]<!-- /HIGHWIRE --><!-- null -->
    • 4. D. van Riel et al., Science 312, 399 (2006); published online 23 March 2006 (10.1126/science.1125548).<!-- HIGHWIRE ID="312:5772:392:4" --><nobr>[Abstract/Free Full Text]</nobr><!-- /HIGHWIRE --><!-- null -->
    • 5. N. M. Ferguson et al., Nature 437, 209 (2005).<!-- HIGHWIRE ID="312:5772:392:5" --> [CrossRef] [ISI] [Medline]<!-- /HIGHWIRE --><!-- null -->
    • 6. I. M. Longini Jr. et al., Science 309, 1083 (2005).<!-- HIGHWIRE ID="312:5772:392:6" --><nobr>[Abstract/Free Full Text]</nobr><!-- /HIGHWIRE --><!-- null -->
    • 7. World Health Organization, WHO Pandemic Influenza Draft Protocol for Rapid Response and Containment (www.who.int/csr/disease/avian_influenza/guidelines/pandemicfluprotocol_17.03a.pdf).<!-- HIGHWIRE ID="312:5772:392:7" --><!-- /HIGHWIRE --><!-- null -->
    • 8. C. E. Mills, J. M. Robins, C. T. Bergstrom, M. Lipsitch, PLoS Biol. 3, e135 (2006).<!-- HIGHWIRE ID="312:5772:392:8" --> [Medline]<!-- /HIGHWIRE --><!-- null -->
    • 9. A. W. Hampson, in Influenza, C. W. Potter, Ed. (Elsevier, London, 2002), pp. 49?85.<!-- HIGHWIRE ID="312:5772:392:9" --><!-- /HIGHWIRE --><!-- null -->
    • 10. D. J. Smith et al., Science 305, 371 (2004).<!-- HIGHWIRE ID="312:5772:392:10" --><nobr>[Abstract/Free Full Text]</nobr><!-- /HIGHWIRE --><!-- null -->
    • 11. B. Efron, R. J. Tibshirani, An Introduction to the Bootstrap (Chapman & Hall, London, 1993).<!-- HIGHWIRE ID="312:5772:392:11" --><!-- /HIGHWIRE --><!-- null -->
    • 12. N. M. Ferguson, C. A. Donnelly, R. M. Anderson, Science 292, 1155 (2001).<!-- HIGHWIRE ID="312:5772:392:12" --><nobr>[Abstract/Free Full Text]</nobr><!-- /HIGHWIRE --><!-- null -->
    • 13. M. J. Keeling et al., Science 294, 813 (2001).<!-- HIGHWIRE ID="312:5772:392:13" --><nobr>[Abstract/Free Full Text]</nobr><!-- /HIGHWIRE --><!-- null -->
    • 14. M. Lipsitch et al., Science 300, 1966 (2003).<!-- HIGHWIRE ID="312:5772:392:14" --><nobr>[Abstract/Free Full Text]</nobr><!-- /HIGHWIRE --><!-- null -->
    • 15. S. Riley et al., Science 300, 1961 (2003).<!-- HIGHWIRE ID="312:5772:392:15" --><nobr>[Abstract/Free Full Text]</nobr><!-- /HIGHWIRE --><!-- null -->
    • 16. A. S. Monto, F. M. Davenport, J. A. Napier, T. Francis Jr., Bull. World Health Org. 41, 537 (1969).<!-- HIGHWIRE ID="312:5772:392:16" --> [ISI] [Medline]<!-- /HIGHWIRE --><!-- null -->
    • 17. L. H. Taber, A. Paredes, W. P. Glezen, R. B. Couch, J. Hyg. London 86, 303 (1981).<!-- HIGHWIRE ID="312:5772:392:17" --> [Medline]<!-- /HIGHWIRE --><!-- null -->
    • 18. M. E. Halloran, I. M. Longini Jr., Science 311, 615 (2006).<!-- HIGHWIRE ID="312:5772:392:18" --><nobr>[Abstract/Free Full Text]</nobr><!-- /HIGHWIRE --><!-- null -->
    • 19. I thank S. Cornell, D. Farmer, R. Fouchier, C. Gilligan, B. Grenfell, T. Jones, A. Lapedes, B. Larder, A. Mosterin, N. Ferguson, P. Rohani, C. Russell, D. Smith, and C. Viboud for useful discussions. Funding was provided by the European Union grant EC 503350, and the NIH Director's Pioneer Award Program, part of the NIH Roadmap for Medical Research, through grant number DP1-OD000490-01.

  • #2
    Re: Predictability and Preparedness in Influenza Control

    Fig. 1. Expected pattern of spread of an uncontrolled influenza epidemic in Thailand. Time sequence (in days) of an epidemic, showing spread in a single simulation of an epidemic parameterized such that, on average, in a fully susceptible population, each person infects 1.5 others (i.e., R<sub>0</sub> = 1.5). Red indicates presence of infected individuals, green the density of people who have recovered from infection or died. [Reprinted from (5).] <nobr>[View Larger Version of this Image (136K JPEG file)]</nobr>

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    • #3
      Re: Predictability and Preparedness in Influenza Control

      Figure 2



      Fig. 2. Antigenic evolution of human influenza A (H3N2) virus from 1968 to 2003. The relative positions of strains (colored shapes) and antisera (open shapes) were adjusted such that the distances between strains and antisera in the map represent the corresponding hemagglutination inhibition (HI) measurements with the least error. The periphery of each shape denotes a 0.5 unit increase in the total error and is a measure of confidence in the placement of the strain or antiserum. Strain color represents the antigenic cluster to which the strain belongs; antisera are not colored. Clusters were identified by a k-means clustering algorithm and named after the first vaccine strain in the cluster. Two letters refer to the location of isolation: HK, Hong Kong, China; VI, Victoria, Australia; TX, Texas, United States; BK, Bangkok, Thailand; SI, Sichuan, China; BE, Beijing, China; WU, Wuhan, China; SY, Sydney, Australia; and FU, Fujian, China) and the two digits refer to year of isolation. The grid represents one unit of antigenic distance (i.e., a two-fold dilution in HI titer). [Reprinted from (10).] <nobr>[View Larger Version of this Image (166K JPEG file)]</nobr>

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