Transformation between active and dormant states

Although Buerger et al. [36] argued that dormant microbial cells could reactivate stochastically and might be independent of environmental cues, environmental factors such as substrate availability are often thought to control the transformation between active and dormant states [5]. Most models (see Appendix S1) distinguish the active biomass pool from the dormant pool and define them as two state variables (B_a and B_d) (Fig. 1). Only active microbes (B_a) can uptake substrate and produce new cells. The connection between the active and dormant states is a reversible process including two directional sub-processes, i.e., dormancy (from active to dormant) and reactivation (or resuscitation, from dormant to active). Losses from active biomass include growth respiration and maintenance (maintenance respiration, mortality, enzyme synthesis, etc.) [23]. Dormant microbes still require energy for maintenance and survival although at a lower metabolic rate [5].

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Figure 1. Active and dormant microbial biomass pools in microbial physiology models (modified from Fig. 2 in Lennon & Jones, 2011).

https://doi.org/10.1371/journal.pone.0089252.g001

The net transformation rate () from active to dormant state is the difference between the flux from active to dormant (B_a→d) and the flux from dormant to active state (B_d→a), i.e., . The models of Hunt [37] (Equation S1-1 in Appendix S1) and Gignoux et al. [38] (Equation S1-2 in Appendix S1) directly formulate the net flux () without explicit components for B_a→d and B_d→a. The direction of the net flux depends on the maintenance requirement relative to the substrate availability. If the available substrate is less than the maintenance requirement, there is a positive net flux from active to dormant pool, and vice versa. In addition, Hunt [37] assumed a ‘buffer zone’ for the change of states: when the maintenance requirement surpasses the substrate supply but the deficit is within a small fraction (1% d⁻¹) of B_a, there is no flux between the two states.

Some models define rates for both dormancy and reactivation. In the model of Ayati [39] (Equation S1-3 in Appendix S1), the dormant rate (γ_a→d) increases with declining substrate concentration, and the reactivation (γ_d→a) only occurs when substrate concentration is higher than the half-saturation constant (K_s). Konopka [32] modified the potential rates for dormancy and reactivation by the relative growth rate (μ/μ_max, ratio of true specific growth rate to maximum specific growth rate), i.e, the two rates are multiplied by (1-μ/μ_max) and μ/μ_max, respectively (Equation S1-4 in Appendix S1). Similarly, Jones & Lennon [40] postulated two complementary rates (1-R and R) for dormancy and resuscitation (Equation S1-5 in Appendix S1).

Two other models also explicitly formulate the two conversion rates between states but do so using concepts of probability. Bär et al. [41] used two complementary factors (1-J and J) to represent the probability for the transition between active and dormant state in addition to an identical potential rate constant for the two processes (Equation S1-6 in Appendix S1). The conceptual model of Locey [42] applies a deterministic dormant rate and a stochastic resuscitation rate (Equation S1-7 in Appendix S1). The potential resuscitation rate is modified by (1-p), where p is the probability that a disturbance in the active pool will result in the immigration of one individual from the metacommunity. The probability (J) in Bär et al. [41] is explicitly calculated from the environmental cues (e.g., soil moisture), while the cause of the probability (p) in Locey [42] is not elucidated.

Switch function model

In addition to the dormancy and reactivation processes, a key concept in the model developed by Stolpovsky et al. [4] is ‘switch function’ (Equation S1-8 in Appendix S1). The switch function (θ) determines the fraction of active cells taking up dissolved organic carbon (DOC). This function refers to the growth fraction in active biomass (B_a) that consumes substrate and thus is not the same as the active fraction (r) in total biomass (B). Furthermore, the dormancy and reactivation fluxes are set to be proportional to (1-θ) and θ, respectively. θ is formulated by the Fermi-Dirac statistics [4]. Another feature of this model is the consideration of ‘depth’ of dormancy in reactivation, where the reactivation rate is negatively dependent on the duration of dormancy. The switch function model includes at least 15 model parameters and it is difficult to compute the Gibbs energy change of the oxidation of DOC [4].

The switch function (θ) sets it apart from the conventional Michaelis-Menten (M-M) or Monod kinetics because of its new perspective of thermodynamics. According to the M-M kinetics [43], the substrate saturation level represents the fraction of enzyme-substrate complex (ES) in active enzyme (E₀), where the substrate saturation level is formulated by S/(K_s + S) with S and K_s being the substrate concentration and the half-saturation constant [43]. When the M-M kinetics is applied to describe microbial uptake of substrate, the substrate (or combined with TEA) saturation level (i.e., μ(S, TEA) in Equation S1-8a of Appendix S1) is a measure of the actively growing fraction in the active microbial community. The switch function is also determined by the saturation levels of substrate and terminal electron acceptor (TEA), i.e., μ(S, TEA) (Equation S1-8e in Appendix S1). Mathematically the inclusion of both the switch function (θ) and the M-M kinetics (i.e., μ(S, TEA)) might result in double counting of the impact of substrate and TEA. We would recommend using the switch function (θ) to modify the microbial uptake rate if the Gibbs energy change of the oxidation of substrate (ΔG) is tractable and the thermodynamic threshold (G₀) and the steepness of the step function (st) are identifiable.

Physiological state index models

As an alternative to models with two microbial biomass pools (i.e., active and dormant), a further state variable indicating the dormant or active fraction in total biomass has been proposed. Wirtz [44] developed a simple index (r_d = 0.5–1.0) representing the dormant microbial biomass as a fraction of the steady-state total biomass (B_stat) under the condition of B_d << B_a. In case of a net loss of total biomass (dB/dt<0), the dormant biomass B_d = B_stat· r_d; otherwise (dB/dt>0), B_d = B_stat·(1−r_d). This model has a sudden change of dormant biomass at the transition point (i.e., dB/dt = 0) since r_d>0.5.

Different from the dormant index of Wirtz [44], the concept of an active index (i.e., index of physiological state) of soil microbial community has been employed in soil carbon and nutrient cycling models [33], [34]. The index of physiological state (r), referring to the activity state, is often defined as the ratio of metabolically active microbial biomass to the total soil microbial biomass [22], [33], [34].

In the Synthetic Chemostat Model (SCM), the rate of change of the state variable r is described as follows [33], [45]: (1)with (2)where r = B_a/B, representing the fraction (hereinafter referred to as ‘active fraction’) of active biomass in total biomass; μ is the specific growth rate of total biomass; denotes the saturation level of substrate (S); the simple power (n = 1) has been widely used [35] and, in this case (n = 1), K_r is called the half-saturation constant.

Blagodatsky & Richter [34] used the expression in their model development. This expression was not derived in the original definition of the specific growth rate (see Equation 3) by Panikov [45] and because its validity cannot be inferred, the concepts will not be addressed here.

According to Panikov's derivation [45], the specific growth rate (μ) follows the general definition [46], [47]:(3)

Based on Equations 1 and 3, we can derive (see Equation S2-1 in Appendix S2):(4)(5)

We find that the model described by Equation 1 is not applicable under low substrate availability, as described below. Generally, the rates of change in biomass pools (B, B_a, and B_d) can be expressed as(6)(7)(8)where denotes the net dormancy flux; g^±(S, B_a) is a function that represents the difference between the substrate uptake and the maintenance requirements of B_a, i.e., the net growth of B_a; and f⁺(S, B_a) is a function denoting the maintenance and survival energy costs of B_d. The superscript ‘±’ in g^± indicates the function value of g could be positive at high S or non-positive when the substrate uptake cannot satisfy the maintenance requirements of B_a at low S. The superscript ‘+’ in f⁺ implies f≥0. Note that the function f⁺(S, B_a) is not necessarily dependent on S [4].

From Equations 4, 6 and 7, we can obtain(9)

The two terms in the right side of Equation 9 may be regarded as the conversion of B_a to B_d (i.e., B_a→d) and the transformation of B_d to B_a (i.e., B_d→a), respectively. At high S resulting in g≥0, Equation 9 may be one of the possible expressions for B_a→d and B_d→a. However, at low S leading to g<0 and B_a→d<0, i.e., no active cells become dormant under insufficient substrate, which is inconsistent with the strategy of dormancy for microorganisms when faced with unfavorable environmental conditions [5].

Based on the above analysis, we conclude that the physiological state index model (Equation 1) needs to be improved. In other words, the empirical assumption that the steady state active fraction (r^ss) approaches the substrate saturation level () may not be necessary because this assumption could lead to impractical flux (Equation 9) between dormant and active states under low substrate availability.

A Synthetic Microbial Physiology Model

Based on the aforementioned review and analysis, we have developed a synthetic microbial physiology model component relating to substrate availability. As indicated by Fig. 1, the growth and maintenance functions of active microbes (B_a) are characterized by the maximum specific growth rate (μ_G) and maintenance rate (m_R); whereas the dormant microbes (B_d) cost energy to maintain their basic cellular functions at a much lower specific maintenance rate (denoted by β·m_R, where β<1) [48].

General assumptions

First we define the substrate saturation level () as(10)

where the parameter K_s is the half saturation constant for substrate uptake as indicated by the M-M kinetics [43].

Based on the above review of existing dormancy models, the following assumptions are accepted in our new model: (1) the dormancy rate is proportional to the active biomass and the reactivation rate is proportional to the dormant biomass, i.e., and ; (2) under very high substrate concentration (S>>K_s), →1, B_a→d→0 and B_d→a≥0; (3) under very low substrate (S<<K_s), →0, B_a→d≥0 and B_d→a→0; (4) based on the assumptions (1–3), we derive that and ; (5) further we assume that the maximum specific maintenance rate for active microbes (m_R with units of h⁻¹) controls both transformation processes since the maintenance energy cost is the key factor regulating the dormancy strategy [5], [37], [38]. As a result we postulate that(11a)(11b)

Steady state analysis

Assuming the input (I_s) is time-invariant, we can obtain the steady state solution to the above new MEND model (see Equations S2-3(a–e) in Appendix S2). Fig. 2 shows the steady state active fraction (r^ss) and substrate saturation level () as a function of the two physiological indices, i.e., α (0–0.5) and β (0–1). Both r^ss and positively depend on α and β and r^ss≥ for any combinations of α and β. If we consider two extreme values of β→0 or β→1, the r^ss and (see Equations S2-4 and S2-5 in Appendix S2) can be simplified to

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Figure 2. Steady state active fraction (r^ss) and substrate saturation level () as a function of α and β; α  =  m_R/(μ_G+m_R), μ_G and m_R (h⁻¹) are maximum specific growth rate and specific maintenance rate for active microbial biomass, respectivly; β denotes the ratio of dormant specific maintenance rate to m_R.

https://doi.org/10.1371/journal.pone.0089252.g002

(13a)(13b)

Equation 13 and Fig. 2 indicate that: (1) the steady state active fraction (r^ss) is equal to and they are identical to α = m_R/(μ_G+m_R) only under the condition of β→0; (2) the upper bound of r^ss is approximately 0.8 at α→0.5 and β→1; and (3) with α≤0.5, the maximum r^ss is ca. 0.5 if the magnitude of β is around 0.001–0.01 [6]. This threshold value (0.5) of r^ss is a reasonable estimate that can explain how the measured active fraction of microbes in undisturbed soils is usually considerably less than the total biomass [5], [21], [22].

Model simplification under sufficient substrate condition

As mentioned in the Introduction, SIR or SIGR method can distinguish active from dormant composition and the data from these experiments have been widely used to estimate the active microbial biomass and the maximum specific growth rate [13], [14]. The simplification of the microbial model under excess substrate has also been employed to estimate maximum specific growth rate (μ_G), active microbial biomass (B_a), and/or total microbial biomass (B) using the SIR or SIGR data [1], [13], [35]. Here we show the simplification of our model (Equation 12) for conditions appropriate to SIGR or SIR experiments, e.g., the short-term period of exponentially-increasing respiration of active biomass following substrate addition. We will test our reduced and full model with the SIGR data of Colores et al. [13] in the next section.

Under sufficient substrate (i.e., S>>K_s in Equation 10 thus →1), Equations 12(a–e) can be simplified and integrated for initial conditions, i.e., S = S₀, B = B₀ and r = r₀ at t = 0 (see Equations S2-6 and S2-7 in Appendix S2):(14a)(14b)(14c)

The CO₂ production rate, v(t), during the exponential growth stage is derived as an explicit function of t (see Equation S2-7d in Appendix S2): (14d)

The respiration rate, v(t), is associated with two exponential items, i.e., and . Considering an extreme case that m_R<<μ_G (i.e., →0), Equations 14(b–d) can be further simplified to Equations S2-8(b–d) (see Appendix S2). Equations S2-8b and S2-8c (denoting B(t) and r(t), respectively) are similar to Equations 11 and 10 in Panikov & Sizova [35], respectively. However, Equation S2-8d (for v(t)) is different from Equation 13 of Panikov & Sizova [35], where a constant ‘A’ was added to the exponential. Equation S2-8d is identical to Equation 7 derived for SIGR experiments in Colores et al. [13].

Panikov & Sizova [35] used their Equation 13 to fit respiration rates during the exponentially-increasing (i.e., no substrate limitation) phase (see Fig. 2 in Panikov & Sizova [35] for data and curve fittings). However, these data are based on glucose-induced respiration that includes both basal respiration of native SOC and respiration due to the addition of glucose [13]. The basal respiration rate may be regarded as a constant in certain cases (see Colores et al. [13] and data in Fig. 1 of Blagodatsky et al. [50]). The constant ‘A’ representing the basal respiration rate was included in Equation 13 of Panikov & Sizova [35] in order to fit the combined respiration from the addition of glucose and basal respiration. However, this constant ‘A’ cannot be derived from such governing equations as Equations S2-6(a–c) (see Appendix S2) that assume respiration is the sole result of substrate addition. In other words, the equations do not include basal respiration. Certainly, our predicted respiration could include basal respiration as long as (i) a basal respiration rate is added to Eq. 14d ad hoc or (ii) Equations S2-6(a–c), or more commonly Equations 12(a–e), are linked to a soil organic matter (SOM) decomposition model, which can produce decomposed native soil C in addition to the respiration of substrate addition. Because Equation 13 of Panikov & Sizova [35] is not linked to a native C decomposition model, fitting the model to combined native C and substrate respiration data is not appropriate.

Model test I: substrate-induced respiration

In this section, we used the respiration data from ¹⁴C-labeled glucose SIGR experiments by Colores et al. [13] to calibrate our MEND model. The respiration data only represented the CO₂ production from the added substrate and did not include basal respiration from the native C.

First we employed Equation 14d to fit the respiration rates during the exponentially-increasing stage and the result is shown in Fig. 3a (see original data in Fig. 3 of Colores et al. [13]). The true growth yield (Y_G) was set to 0.5 according to Colores et al. [13]. There are four undetermined parameters (B₀, r₀, μ_G, α) in Equation 14d (with m_R  =  μ_G ·α/(1−α)). We found that only the maximum specific growth rate (μ_G) could be determined with high confidence (coefficient of variation (CV) = 5%) from the exponentially-increasing respiration rates. The CVs of the other three optimized parameters (B₀, r₀, α) were as high as 55–77% (Table 1). However, the initial active microbial biomass (B_a0  =  B₀×r₀) had a lower uncertainty (CV = 20%) compared to B₀ and r₀. The above results indicate that the exponentially-increasing respiration rates can only be used to obtain μ_G and B_a0.

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Figure 3. MEND model simulations against the respiration rates due to added ¹⁴C-labeled glucose in Colores et al. [13].

(a) Fitting of the respiration rates in the exponentially-increasing phase using Equation 14, ‘Obs’ and ‘Sim’ denote observed and simulated data, respectively. (b) Fitting of the respiration rates in both exponentially-increasing and non-exponentially-increasing phases using Equation 12. (c) Simulated substrate (S), total live microbial biomass (B), active fraction (r) and substrate saturation level () based on Equation 12.

https://doi.org/10.1371/journal.pone.0089252.g003

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Table 1. MEND model parameters values used for simulation of respiration rates due to added ¹⁴C-labeled glucose in Colores et al. [13].

https://doi.org/10.1371/journal.pone.0089252.t001

We then conducted numerical simulations in terms of all data including both exponentially-increasing and non-exponentially-increasing respiration rates (Fig. 3b). The non-exponentially-increasing respiration rates include the lag period before the exponentially-increasing phase and the respiration at longer times after the rates cease to increase exponentially [13]. The latter phase is likely because of the substrate saturation levels () become limiting to respiration. We used Equations 12a, 12b, 12e and the corresponding expression for CO₂ flux rate, to allow the substrate saturation level () to change with time. Additionally, we used the ranges of μ_G determined above. We used the SCEUA (Shuffled Complex Evolution at University of Arizona) algorithm [51], [52] to determine model parameters. The SCEUA is a widely used stochastic optimization algorithm for calibrating hydrological and environmental models [51].

When exponentially-increasing and non-exponentially-increasing data are included together, the CVs of all parameters (B₀, r₀, μ_G, α, K_s, β) are within 25% except β with a high CV of 76% (Table 1). The optimized μ_G values (0.030±0.001 h⁻¹) are almost the same as obtained by Colores et al. [13]. Model estimates of α = 0.228±0.031 indicate that the maximum specific maintenance rate of active microbes (m_R) is about 30% of μ_G and thus cannot be ignored. The initial active biomass (B_a0) is 0.145±0.004 mg C g⁻¹ soil (Table 1), which is lower than the values (0.194±0.004 mg C g⁻¹ soil) using the SIGR method [13]. This is likely due to the inclusion of maintenance respiration (characterized by m_R, see Equation 14d) in our model even for the exponentially-increasing stage; thus a lower B_a0 could produce similar CO₂ flux to the case with higher B_a0 that does not include the contributions from maintenance respiration. Our results also show that the initial active fraction (r₀) is 28.5±6.4% and β is 0.025±0.019. The magnitude of β is comparable to the estimation by Anderson & Domsch [6], [7]. In addition, the half-saturation constant (K_s) was estimated as 0.275±0.038 mg C g⁻¹ soil, which is very close to the values derived from 16 soils by Van de Werf & Verstraete [21]. This K_s value indicates the substrate saturation level () is higher than 0.7 before the transition from exponentially-increasing to non-exponentially-increasing phase (Fig. 3c). The changes of substrate (S), total microbial biomass (B) and active fraction (r) with time are also shown in Fig. 3c. In conclusion, the five parameters (B₀, r₀, μ_G, α, K_s) can be effectively determined using both exponentially-increasing and non-exponentially-increasing respiration rates, whereas β may also be determined but with a relatively high uncertainty (CV = 76%) than the other parameters.

Through this experimental analysis, we identified the need for isotopic data to discriminate between basal and substrate-induced respiration. We also discovered that the exponentially-increasing period due to substrate addition can be used to identify only a select set of model parameters (i.e., μ_G and B_a0) as also demonstrated by the method of Colores et al. [13]. These parameters, however, can be further applied to longer-term respiration experiments to enable fitting to obtain the remainder of model parameters by using our MEND model. Thus, we have found a new and unique solution to identify different parameters as a function of time, and to effectively use isotopic labeling to yield a specific set of model parameters.

Model test II: intermittent substrate supply

In order to further validate this additional physiological component in the MEND model, we also tested it against a laboratory experimental dataset with intermittent substrate supply [4]. In addition to the substrate, another limiting factor (i.e., oxygen, O₂) was included in this study. For this reason, we also introduced one more parameter (K_o: half saturation constant for O₂) to represent the limitation of O₂ on the microbial processes sketched in Fig. 1. Similar to substrates, the saturation level of O₂ is computed as O₂/(O₂+K_o), where O₂ denotes the concentration of oxygen. The simulated oxygen concentrations by Stolpovsky et al. [4] were used as an input to our model. We used the SCEUA algorithm to determine the six model parameters in addition to the initial value for active fraction (r₀).

A summary of the seven parameters (one of them is r₀) and their fitted values is presented in Table 2. The initial active fraction (r₀) has a median of 0.925 with the 95% confidence interval (CI) of [0.628–1.000]. It means that a high r₀ is required for this experiment, but not necessary to be 1.0 set by Stolpovsky et al. [4]. The model and data are not sensitive to β since its 95% CI covers a wide range from 0.001 to 1. The reason is that the experiment only lasts for a very short time (33 h) so the influence of low metabolic rate at dormant state is insignificant.

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Table 2. MEND model parameter values used for simulation of the experiment described in Fig. 3 of Stolpovsky et al. (2011).

https://doi.org/10.1371/journal.pone.0089252.t002

Fig. 4 shows that the simulated total biomass (B) and substrate (S) concentrations agree very well with the observations (the coefficients of determination are 0.98 and 0.78 for biomass in Fig. 4a and substrate in Fig. 4b, respectively). Our simulation results indicate that, under limited O₂ between 12h and 24 h of the experiment, the active biomass decreases and the dormant biomass increases. As a result, the active fraction (r) declines from ca. 0.9 to 0.7 (Fig. 4a). For the same period Stolpovsky et al. [4] predicted a decrease of r from 1.0 to ca. 0, which means that all active biomass becomes dormant. Although there were not adequate measurements to confirm either prediction, our predicted changes in the active fraction (r) appear to be more reasonable during such a short experimental time period. This demonstration also shows that our model is capable of producing reasonable change in total, active, and dormant microbial biomass in response to substrate supply as well as an important forcing function (O₂).

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Figure 4. MEND model simulations against the experimental dataset used by Stolpovsky et al. (2011).

(a) total live biomass, active and dormant biomass, and active fraction; (b) observed and simulated substrate concentration and prescribed O₂ concentration. There are three manipulations on the substrate and oxygen: (1) at time 0, the substrate (3 mg/L) and O₂ (0.025 mM) are added to the system; (2) after 12 h, the same amount of substrate is injected; (3) at 24 h, additional O₂ (0.04 mM) is injected to the system. The observed concentrations of substrate and total biomass are hourly data interpolated from the original observations in Stolpovsky et al. (2011). We scaled the substrate concentrations (with units of mM in original data) to match the magnitude of biomass concentration in units of mg/L.

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