3.1 Optimal control

It is possible to estimate T_min by calculating its value in the linearized SEIR model, applicable when the fraction of non-susceptibles is relatively small. When e(t), i(t), r(t), 1 − s(t) ≪ 1, the dynamics of Eqs (1)–(4) are effectively driven by a 2-dimensional system: (5) (6) where a ≡ α/γ, R₀(t) ≡ β(t)/γ, and Ψ(t)^⊤ = [e(t), i(t)].

The first step in calculating T_min is to construct eigen-solutions of Eqs (5) and (6) in the form (7) where ν(T) is the largest such eigenvalue; the superscript p denotes the corresponding principal eigenvector. Ignoring the subdominant eigenvalues assumes that after a sufficiently large number of iterations of periodic closure, the dynamics is well aligned with the principle solution no matter what the initial conditions. Unless stated otherwise, simulations are started in this state so that initial-condition effects are minimized. The second step is to calculate the integrated incidence, r(2T) from the solution of Eq (7), by integrating i(t) over a full cycle (8) where [Ψ^p(t)]₂ denotes the infectious-component of Ψ^p(t). The third step is to calculate the final outbreak size from r(2T). To this end, it is important to realize that as long as ν(T) < 1, the outbreak will decrease geometrically after successive closure cycles, and therefore r_f(T) = r(2T) + ν(T)r(2T) + ν(T)² r(2T) + …, or (9)

Finally, we can find the local minimum of r_f(T) when ν(T) < 1 by solving (10)

This algorithm gives a single fixed-point equation that determines T_min.

Since our analysis is based on a piecewise 2-dimensional linear system, it is possible to give every quantity in the previous paragraph an exact expression [22] in terms of epidemiological and social parameters. See S1 Appendix for full derivation and exact expressions for Eqs (7)–(10). Following our procedure gives the prediction curves shown in Fig 2(a). The solid red line indicates the solution to Eq (10), and agrees well with simulation-determined minima of r_f(T) over a range of R₀ given initial fractions of infectious 10⁻⁶ (circles), 10⁻⁴ (squares), and 10⁻² (diamonds). The simulation-determined minima are computed from r_f(T) curves like Fig 1(b). It is important to note that our optimal-control theory assumes the validity of the linearized SEIR model, applicable when the total outbreak size, r_{f ≪ 1}. In general, the total outbreak size will increase with the initial fraction of infectious and R₀, and hence, the larger both are, the more simulations will disagree with theory. For example, this explains the better agreement for initial fractions of infectious 10⁻⁶, as compared to 10⁻² in Fig 2(b).

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Fig 2. Optimal periodic closure.

(a) Period versus R₀ = β₀/γ. The solid-red and dashed lines are theoretical predictions (exact and approximate, respectively), and the points are simulation-determined minima for initial fractions infectious: 10⁻⁶ (circles), 10⁻⁴ (squares), and 10⁻² (diamonds). The blue and dotted curves are predictions for the threshold closure period (exact and approximate, respectively). Other model parameters are: γ⁻¹ = 10 ⋅ days and α⁻¹ = 8.33 ⋅ days. (b) A refocused version of (a) for smaller values of R₀. (c) Period versus a = α/γ. The color scheme and parameters are identical to (a), except β⁻¹ = 5.55 ⋅ days.

https://doi.org/10.1371/journal.pone.0244706.g002

On the other hand, the solid blue line in Fig 2(a) indicates the threshold closure period, satisfying (11)

The closure period T_thresh results in the largest eigenvalue of Eqs (5) and (6) equalling unity such that the principal component of exposed and infectious fractions is unchanged after a full closure cycle. If T < T_thresh, ν(T) > 1 and a large outbreak occurs, even with closure, as infection grows over a full cycle for any small non-zero Ψ(0). Given this property, T_thresh gives a lower bound for the optimal period, T_min > T_thresh. Note: the red curve is always above the blue curve in Fig 2(a).

Before analyzing Eqs (5)–(10) further, we point out two basic dependencies in the (normalized) optimal period T_min ⋅ γ. The first is intuitive: as the reproductive number R₀ increases, so does T_min ⋅ γ. Hence, the faster a disease spreads the longer a population’s closure-cycle must be in order to contain it. The second is more interesting. Notice in Fig 2(c) that T_min ⋅ γ → ∞ as a → 0, and T_min ⋅ γ → 0 as a → ∞. Therefore, recalling a = α/γ, if a disease has a long incubation period, then the optimal closure cycle is similarly long. On the other hand, if a disease has a short incubation period, then the optimal closure cycle is short. In order for periodic closure to be a practical strategy, with a finite T_min, our results indicate that , roughly speaking, or that the recovery and incubation periods should be on the same time scale– a condition that generally applies to acute infections [19].

Another observation from our approach that we can make is that periodic closure is not an effective strategy for arbitrarily large R₀, as one might expect. One way to see this from the analysis is to notice that the optimal period diverges for the linear system at some , as T_thresh → T_min → ∞ (at fixed a). This transition can be seen in Fig 2(a), as the blue and red curves collide. Above the transition , no periodic closure can keep a disease from growing over a cycle. In this sense gives an upper bound on contact rates between individuals that can be suppressed by periodic-closure as a control strategy. We note that an optimal T_min still exists even when our linear approximation no longer applies, e.g., (in the sense that r(t → ∞) is minimized by some T_min), but the benefit of control becomes smaller and smaller as R₀ is increased, and the optimal period becomes increasingly dependent on initial conditions. In such cases, one must resort to numerical simulations of the full non-linear system, Eqs (1)–(4).

A sharper analytical understanding can be found by making the additional approximation that Ψ(t) ∼ exp[λ₁₁ γt]v₁₁, for t < T and β(t) = β₀, where (12)

Eq (12) is the largest eigenvalue of M(t<T) with eigenvector v₁₁. Hence, we ignore the time-decaying part, Ψ(t)_dec ∼ exp[−(a + 1 + λ₁₁)γt]v₁₂, of a general solution where v₁₂ is the other eigenvector of M(t<T). Our assumption becomes increasingly accurate with increasing T, and Eqs (7)–(11) simplify significantly: (13) (14) where (15) and is a constant that depends on β₀, α, γ and initial conditions, but is independent of T. Substituting Eqs (13)–(15) into Eqs (10) and (11) gives a single fixed-point equation for the approximate T_min and T_thresh each, which can be easily solved. See S1 Appendix for further details. Examples of the approximate solutions are plotted with dotted and dashed lines in Fig 2, and are almost indistinguishable from the complete linear-theory predictions shown with solid lines.

Using the simplified expressions, we can now show several interesting features of periodic closure. First, since Eqs (13) and (14) are exact for large T, we can determine as a function of a. As T → ∞, Eq (13) has two scaling limits depending on whether a ≥ 1 or a < 1. In the former, the second term on the RHS of Eq (13) becomes negligible. As T → ∞ the solution of ν = 1 is λ₁₁ → 1. Solving for R₀ in λ₁₁ = 1 gives . Similarly when a < 1, as T → ∞ the solution of ν = 1 is λ₁₁ → a. Putting the two cases together, gives , and the phase-diagram for optimal-periodic closure: (16)

Eq (16) is plotted in Fig 3. In region I, the optimal period is predicted to be finite, in which case small outbreaks can be contained by optimal closure. In region II, such outbreaks can not be contained. The blue squares plot numerically-determined thresholds for the piecewise linear system Eqs (5)–(7) in the long closure-time limit. We compute each point by: picking a fixed value of a (starting with R₀ = 2), solving for T_thresh according to Eqs (5)–(7) and (11), and then repeatedly incrementing R₀ in small steps of 0.001 and solving for T_thresh(R₀; a) until it is a large number, i.e., T_thresh(R₀, a) · = 500. Note that as long as the system Eqs (1)–(4) is below threshold, we can always start with initial fractions of infectious and exposed that are small enough for the linear system to apply.

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Fig 3. The largest reproductive number R₀ for which periodic closure can keep an SEIR-model disease under threshold.

The two regimes are a = α/γ ≥ 1 (solid line) and a < 1 (dashed line). Blue squares represent the numerically-determined threshold for the piecewise linear system Eqs (5)–(7) in the long closure-time limit. In region I, outbreaks are contained by optimal closure. In region II, they are not.

https://doi.org/10.1371/journal.pone.0244706.g003

There are several important cases to notice in Fig 3. The first is that has a peak when a = 1 (α = γ). The implication is that periodic closure has the largest range of effectiveness, as measured by the ability to keep infection from growing over any closure-cycle, for diseases with equal exposure and recovery times. In this symmetric case, periodic closure can prevent large outbreaks as long as R₀ < 4 (compare this to the usual epidemic threshold without closure, R₀ = 1). On the other hand, when there is a time-scale separation between incubation and recovery, a → ∞ or a → 0, the phase-diagram nicely reproduces the intuitive, time-averaged effective epidemic threshold 〈R₀(t)〉_t = 1, or .

3.2 COVID-19 model

Now we turn our attention to more complete models that derive from the basic SEIR-model assumptions, but have more disease classes and free parameters which are necessary for accurate predictions. In particular, epidemiological predictions for COVID-19 seem to require an asymptomatic disease state, i.e., a group of people capable of spreading the disease without documented symptoms. Such asymptomatic transmission is thought to be a significant driver for the worldwide distribution of the disease [23, 24], since symptomatic individuals can be easily identified for quarantining while asymptomatics cannot (without widespread testing). Many models have been proposed to incorporate the broad spectrum of COVID-19 symptoms, as well as control strategies such as testing-plus-quarantining [11, 20]. A common feature of such models is the assumption that exposed individuals enter into one of several possible infectious states according to a prescribed probability distribution (e.g., asymptomatic, mild, severe, tested-and-infectious, etc.) with their own characteristic infection rates and recovery times. Following this general prescription, we define M infectious classes, i_m, where m ∈ {1, 2, …M}, each with its own infectious contact rate β_m(t) and recovery γ_m rate, and which appear from the exposed state with probabilities p_m. The relevant heterogeneous SEIR-model equations become (17) (18)

Taking a common closure cycle for all individuals in the population, β_m(t) = β_0,m ⋅ mod(floor{[t + T]/T}, 2) [21], we would like to test our method for predicting T_min in the more general model Eqs (17) and (18), and demonstrate robustness to heterogeneity. In terms of an algorithm, we could simply repeat our approach for the effective 1 + M dimensional linear system; though, we loose analytical tractability. On the other hand, because T_min is well captured by a linear theory, which depends only on R₀, a, and γ, we might guess that quantitative accuracy can be maintained for higher dimensional models such as Eqs (17) and (18) by swapping in suitable values for these parameters in our SEIR-model formulas above. This is analogous to the epidemic-threshold condition (R₀ = 1) being maintained in such models, as long as the correct value of R₀ is assumed.

The R₀ for Eqs (17) and (18) is easy to derive using standard methods [17, 18], (19)

Note: the updated R₀ is simply an average over the reproductive numbers for each infectious class. Using this averaging pattern as a starting point, our approach is to substitute the average values of α/γ_m and γ_m, (20) (21) into Eqs (7)–(10), or Eqs (13)–(15) for approximate solutions. Namely, for the SEIR model we have an equation 0 = F(R₀, a, γ, T_min), where F is a function that is determined from Eq (10). Our averaging approximation entails solving the same Eq (10) for T_min, but with parameters given by Eqs (19)–(21).

We point out that this approximation is not arbitrary since in the limit of heterogeneous infectivity only, γ_m = γ∀m, one solution of Eqs (17) and (18) is i_m(t) = p_m i(t), where i(t) is the total fraction of the population infectious. In this case, the linearized system is still effectively 2-dimensional with parameters γ, α/γ, and R₀, where R₀ is given by Eq (19). For this reason we expect our averaging approximation to be exact in the limit of heterogeneous infectivity only, and a good approximation when the variation in recovery rates is not too large.

Examples are shown in Fig 4, where each panel shows results for an M = 2 model in which asymptomatics are significantly more (a) and less (b) infectious than symptomatics [11]. Symptomatic infectives are denoted with the subscript 1 and asymptomatics with the subscript 2. The optimal closure period is plotted versus the fraction of asymptomatics, p₂. Within each panel the different colors correspond to no variation in recovery rates (red), moderate variation (blue), and large variation (green). Simulation determined T_min are shown with points and predictions from the averaging theory shown with solid lines. The initial conditions for simulations follow the SEIR model convention– parallel to the principal solution of Eq (7), Ψ^p(0)—except that the fraction in each infectious class is i_m(0) = p_m[Ψ^p]₂. The model parameters were chosen to match similar models [11, 20], which were fit to multiple COVID-19 data sources. As expected, the agreement between theory and simulations ranges from excellent to fair depending on the heterogeneity in recovery rates.

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Fig 4. Optimal closure period for a heterogeneous SEIR model with symptomatic and asymptomatic infection as a function of the fraction of asymptomatics.

(a) Increased infectivity for asymptomatics, β₁ = 2.1 ⋅ γ₁ and β₂ = 2.6 ⋅ γ₂. The solid lines are theoretical predictions and the points are simulation-determined minima for initial fractions of non-susceptibles 10⁻⁵. Each series has different recovery times: red (, ), blue (, ), and green (, ). The incubation period is α⁻¹ = 7 ⋅ days. (b) Decreased infectivity for asymptomatics. Model parameters are identical to (a) except β₂ = 1.5 ⋅ γ₂.

https://doi.org/10.1371/journal.pone.0244706.g004