2.1 The March 2020 Imperial College report

On 16 March 2020, the Imperial College COVID-19 Response Team made public a report that provided forecasts of the impact of alternative nonpharmaceutical interventions (NPIs) intended to cope with the COVID-19 pandemic in high-income countries, with focus on Great Britain and the USA (Ferguson et al., Reference Ferguson, Laydon, Nedjati-Gilani, Imai and Ainslie2020). The forecasts were made using a modified version of a simulation model previously developed to support pandemic influenza planning. The Response Team distinguished two broad policy alternatives, mitigation and suppression, which they described as follows (p. 1):

Drawing implications from their forecasts, they recommended suppression as the preferred policy option. Media coverage indicated that the report immediately affected policy formation in the UK and the USA, influencing both nations to shift sharply from mitigation strategies to suppression.Footnote ¹

Should this policy change have occurred? I would confidently say yes if there were reason to think that the Imperial College report provides a credible integrated assessment of the impacts of alternative policies. Unfortunately, the report explicitly did not make an integrated assessment. Moreover, there is reason to question the credibility of the forecasts that it did offer.

Integrated benefit–cost analysis of COVID-19 policy would consider the full impacts on society of alternative policy options. The Imperial College report did not do this. Comparing mitigation and suppression, the Response Team wrote (p. 2):

Considering impacts on the healthcare system is obviously important. Nevertheless, it is difficult to understand how the Response Team could justify drawing policy conclusions based only on consideration of the healthcare system.

From the beginning of the pandemic onward, the public has sought to learn the broad impacts of policy on social welfare, which requires joint consideration of healthcare, the economy, education, and other matters. While some have believed that suppression is the best policy from all perspectives, others have argued the contrary. In the USA, potential tension between health and economic objectives quickly become front page news. As early as March 24, a headline in the New York Times wasFootnote ² “Trump Considers Reopening Economy, Over Health Experts’ Objections.” As I write this in the summer, criteria for school re-opening in the fall have become controversial.

Why did not the Imperial College Response Team perform an integrated assessment of the broad impacts of COVID-19 policy? The basic answer is that epidemiological modeling has, since its inception a century ago, mainly been performed by quantitative researchers with backgrounds in medicine and public health. Researchers with these backgrounds have found it natural to focus on health concerns, viewing other aspects of social welfare as matters that may be important but are beyond their purview.

Thus, the Response Team mentioned in passing that (p. 2): “Suppression… carries with it enormous social and economic costs which may themselves have significant impact on health and well-being in the short and longer-term.” Yet they made no attempt to quantify social and economic costs. They effectively ignored them when reaching their policy conclusion.

Indeed, the epidemiological model used by the Response Team did not consider how a pandemic may generate behavioral responses within the population. The Response Team acknowledged verbally that behavioral response may be an important determinant of outcomes, stating (p. 1):

This statement acknowledged that the dynamics of epidemics depend on the decisions that individuals make to protect themselves from infection or ignore the danger. Nevertheless, the Response Team did not model behavioral responses. Instead, they invoked assumptions about the fractions of households who would comply with alternative policies, without justifying the assumptions.

I should note that modeling and analysis of behavioral responses to epidemics has been a central concern of a separate literature on economic epidemiology, whose contributors are primarily health economists rather than researchers with backgrounds in medicine and public health. See Philipson (Reference Philipson, Culyer and Newhouse2000).

2.2 Integrated epidemiological and macroeconomic modeling

Following the onset of the pandemic, macroeconomists have sought to expand the scope of optimal policy analysis by joining epidemiological models with models of macroeconomic dynamics and by specifying welfare functions that consider both public health and economic outcomes. See, for example, Acemoglu et al. (Reference Acemoglu, Chernozhukov, Werning and Whinston2020), Eichenbaum et al. (Reference Eichenbaum, Rebelo and Trabandt2020), and Thunström et al. (Reference Thunström, Newbold, Finnoff, Ashworth and Shogren2020). Research of this type is potentially welcome, but there is little basis to assess the realism of the models that have been developed.

A serious problem in both epidemiological and macroeconomic modeling is the dearth of evidence available to inform model specification and estimation. Studies of infectious disease and macroeconomic dynamics are largely unable to perform the randomized trials that have been considered the so-called “gold standard” for medical research. Modeling necessarily relies on observational data, which can be difficult to interpret even when they are accurate. Moreover, existing data on the COVID-19 pandemic are notoriously inaccurate. Lacking much evidence, epidemiologists and macroeconomists have developed models that may be mathematically sophisticated but that have little grounding.

These modeling efforts may perhaps be useful if interpreted cautiously as computational experiments studying policy making in hypothetical worlds. However, their relevance to the real world is unclear. Models differ considerably in the assumptions they maintain and in the way they use limited available data to estimate parameters. Researchers provide little information that would enable one to assess model realism. They do little to quantify uncertainty in the predictions they offer. Thus, incredible certitude has been prevalent in both epidemiological and economic modeling of the pandemic.

I see an urgent need for epidemiologists and economists to join forces to develop credible integrated assessment models of epidemics. Even with the best intentions, this will take considerable time. There is some reason to hope that epidemiologists and macroeconomists may be able to communicate with one another because they share a common language for mathematical modeling of dynamic processes, used to formalize SIR models and DSGE models respectively. However, each group has in the past exhibited considerable insularity, which may impede collaboration. Moreover, neither discipline has shown much willingness to face up to uncertainty when developing and applying models.

Looking ahead towards credible integrated assessment of COVID-19 policy and public health policy more generally, I see lessons to be learned from research on climate policy. Climate research was at first a subject for study by earth scientists, who seek to forecast the impact of emissions on the atmosphere and oceans. Having backgrounds in the physical sciences, these researchers find it natural to focus on the physics of climate change rather than behavioral responses and social impacts. Over the past 30 years, the study of climate policy has broadened with the development of integrated assessment models, with major contributions by economists (Nordhaus, Reference Nordhaus, P. and Jorgenson2013).

As a result, we now have a reasonably sophisticated perspective on how our physical planet and our social systems interact with one another. This progress has so far been more qualitative than quantitative. Existing integrated assessment models make quantitative forecasts, but the credibility of climate models is still limited (Pindyck, Reference Pindyck2017). Climate researchers and covid researchers alike should work to improve the credibility of their modeling.

3.1 Bounding the COVID-19 infection rate

Manski and Molinari (Reference Manski and Molinari2020) address the serious problem that accurate characterization of the time path of the coronavirus pandemic has been hampered by missing data. Confirmed cases have been measured by rates of positive findings among persons who have been tested for infection. Infection data are missing for persons who have not been tested.

The persons who have been tested differ considerably from those who have not been tested. Criteria used to determine eligibility for testing have typically required demonstration of symptoms associated with presence of infection or close contact with infected persons. This gives considerable reason to believe that some fraction of untested persons is an asymptomatic or presymptomatic carrier of the COVID-19 disease. Hence, the actual cumulative rate of infection has been higher than the reported rate.

A second problem of data quality is that measurement of confirmed cases is imperfect because the prevalent nasal swab tests for infection are not fully accurate. There is basis to think that accuracy of nasal swab tests is highly asymmetric, with few false positive results but many false negative ones. Given this asymmetry, the actual rate of infection has again been higher than the reported rate.

Combining the problems of missing data and imperfect test accuracy yields the conclusion that reported cumulative rates of infections are lower than actual rates. Reported rates of infection have been used as the denominator for computation of rates of severe disease conditional on infection, measured by rates of hospitalization and death. Presuming that the numerators in rates of severe illness conditional on infection have been measured accurately, reported rates of severe illness conditional on infection are higher than actual rates.

Researchers have put forward point estimates for infection rates and rates of severe illness derived in various ways. The estimates differ in the assumptions used. The assumptions vary and so do the findings. No assumption or estimate has been thought sufficiently credible as to achieve consensus.

I think it more informative to determine the range of infection rates and rates of severe illness implied by a credible spectrum of assumptions. Manski and Molinari (Reference Manski and Molinari2020) combine available data with credible assumptions to bound the cumulative infection rate at specific locations and dates. Knowledge of this statistic is essential to forecast the level of herd immunity that a population has achieved by a certain date. It is also necessary to calculate probabilities of severe illness conditional on infection, including risks of hospitalization and death. Knowledge of these probabilities is vital to inform both personal risk assessment and public health policy.

We explain the logic of the identification problem and we determine the identifying power of some credible assumptions. In particular, we assume that the infection rate among untested persons is lower than the rate among tested persons. We assume a bound on the accuracy of nasal swab tests. Using these and other assumptions, we derive a bound on the population infection rate.

To illustrate, we analyze data from Illinois, New York, and Italy in March and April 2020. We obtain bounds that are wide but yield some information. For example, we find that the cumulative infection rates on April 24 are in the intervals [0.004, 0.525], [0.017, 0.618], and [0.006, 0.471] respectively. The cumulative infection-fatality rates are in the intervals [0, 0.033], [0.001, 0.049], and [0.001, 0.077].

3.2 Bounding the accuracy of diagnostic tests, with application to COVID-19 antibody tests

I mentioned above that swab tests for COVID-19 have imperfect accuracy. A false positive occurs when a result indicates illness, but the person has not been ill. A false negative occurs when a result indicates no illness, but the person has been ill. In general, a medical diagnostic test may be informative about current or past illness. COVID-19 swab tests do the former and antibody tests do the latter. I write “has been ill” to encompass both types of test.

For personal risk assessment, clinical decision making, and measurement of population infection rates, one would like to know the positive and negative predictive values of a test. Positive predictive value (PPV) is the chance that a member of a population who tests positive has been ill. Negative predictive value (NPV) is the chance that someone who tests negative has not been ill. Accurate measurement of PPV and NPV is often difficult. Manski (Reference Manski2020c) explains why and shows how to derive credible bounds.

Studies of test accuracy regularly report statistics other than PPV and NPV, sensitivity and specificity. Sensitivity is the chance that an ill person receives a positive test result. Specificity is the chance that a non-ill person receives a negative result. Knowing sensitivity and specificity permits prediction of a test result given true illness status. These predictions are not directly relevant to risk assessment, clinical decisions, or measurement of infection rates. For these purposes, one knows a test result and wants to predict whether a person has been ill. One does not know whether a person has been ill and want to predict a result.

Given that PPV–NPV are socially relevant concepts while sensitivity and specificity are not, it is natural to ask why measurement of test accuracy often focuses on the latter quantities rather than the former. Part of the answer appears to be that researchers find it easier to measure sensitivity and specificity. Estimation of PPV–NPV requires observation of test results and true illness status for a representative sample of the relevant population, say through random sampling. It may be easy to observe test results but not true illness status. If it were easy to observe true illness status, tests would serve no practical purpose.

Whereas observation of true illness status may be difficult in general, researchers sometimes do so for special groups of persons. This enables estimation of sensitivity and specificity for these groups. The practice has been to estimate in this manner and assume that the findings obtained for the special groups hold in the relevant population.

Suppose that sensitivity and specificity have been estimated in some groups and that one finds it credible to extrapolate to the relevant population. Then PPV–NPV can be derived via Bayes Theorem if one knows the prevalence of the disease; that is, the rate of illness in the population. Unfortunately, it is often difficult to measure prevalence.

COVID-19 presents a case of concern. There are now two main classes of tests for COVID-19. Swab tests detect the presence of live virus, signaling an active infection. Serological tests detect the presence of antibodies that the immune system develops after onset of infection. The presence of antibodies signals that a person was infected in the past. Prevalence is the current population infection rate when testing for active infection and is the cumulative infection rate when testing to detect antibodies.

It is appreciated that these infection rates are highly uncertain, for the reasons discussed in Section 3.1. To derive estimates of PPV–NPV for antibody tests, the U.S. Food and Drug Administration (FDA) assumed that the cumulative infection rate is 0.05 (U.S. Food and Drug Administration, 2020). However, the FDA recognized that this assumption lacks foundation, stating: “We do not currently know the prevalence of severe acute respiratory syndrome coronavirus 2 (SARS-CoV-2) antibody positive individuals in the U.S. population, and prevalence may change based on the duration the virus is in the country and the effectiveness of mitigations.”

To cope with difficulty in measurement of prevalence, epidemiologists have developed methods that yield frequentist point estimates or Bayesian posterior distributions under alternative assumptions. However, the uncertainties in settings such as COVID-19 make it difficult to justify assumptions generating point estimates or posterior distributions. Rather than make such assumptions, Manski (Reference Manski2020c) studies partial identification of PPV–NPV given credible bounds on prevalence, such as those obtained in Manski and Molinari (Reference Manski and Molinari2020). Applying the methodology to COVID-19 antibody tests authorized by the FDA, I obtain narrow bounds for NPV and wide bounds for PPV with the current limited knowledge of prevalence.

4.1 Maximization of subjective expected welfare

What are specific reasonable ways to make an undominated choice? Most familiar to economists is placement of a subjective probability distribution on the state space and maximization of subjective expected welfare. These are often called Bayes decisions. This approach was taken by Nordhaus (Reference Nordhaus, P. and Jorgenson2013) and elsewhere in his integrated assessments of climate policy. It could similarly be used to perform integrated assessment of COVID-19 policy.

Bayesian decision making is compelling when one feels able to place a credible subjective distribution on the state space. However, a subjective distribution is a form of knowledge, and a decision maker may not feel able to assert one. Bayesians have long struggled to provide guidance and the matter continues to be controversial. The controversy suggests that inability to express a credible subjective distribution is common in actual decision settings.

When one finds it difficult to assert a credible subjective distribution, Bayesians may suggest use of some default distribution, called a “reference” or “conventional” or “objective” prior. However, there is no consensus on the prior that should play this role. The chosen prior affects decisions.

4.2 Criteria achieving uniformly satisfactory decisions

When one finds it difficult to assert a credible subjective distribution, a reasonable way to act is to use a decision criterion that achieves uniformly satisfactory results, whatever the true state of nature may be. There are two prominent ways to formalize the idea of uniformly satisfactory results, maximin and minimax-regret (MMR) decision making.

The maximin criterion chooses an action that maximizes the minimum welfare that might possibly occur. The minimax-regret criterion considers each state of nature and computes the loss in welfare that would occur if one were to choose a specified action rather than the one that is best in this state. This quantity, called regret, measures the nearness to optimality of the specified action in the state of nature. The decision maker must choose without knowing the true state. To achieve a uniformly satisfactory result, he computes the maximum regret of each action; that is, the maximum distance from optimality that the action would yield across all possible states of nature. The MMR criterion chooses an action that minimizes this maximum distance from optimality.

The maximin and MMR criteria are sometimes confused with one another, but they yield the same choice only in certain special cases. The former chooses an action that maximizes the minimum welfare that might possibly occur. The latter chooses an action that minimizes the maximum loss to welfare that can possibly result from not knowing the welfare function. Thus, whereas the maximin criterion considers only the worst outcome that an action may yield, MMR considers the worst outcome relative to what is achievable in a given state of nature.

I have applied the maximin and MMR criteria to study many problems of policy formation, emphasizing MMR. The contexts have included policing (Manski, Reference Manski2006; Manski & Nagin, Reference Manski and Nagin2017), bank regulation (Brock & Manski, Reference Brock and Manski2011), income taxation (Manski, Reference Manski2014), vaccination (Manski, Reference Manski2010; Reference Manski2017), and clinical treatment choice (Manski, Reference Manski2009; Reference Manski2013b; Reference Manski2018; Cassidy & Manski, Reference Cassidy and Manski2019; Manski & Tetenov, Reference Manski and Tetenov2020). These criteria should similarly be applicable to formation of COVID-19 policy.Footnote ³