Abstract
Microorganisms constantly transition between environments with dramatically different external osmolarities. However, theories of microbial osmoresponse integrating physical constraints and biological regulations are lacking. Here, we propose such a theory, utilizing the separation of timescales for passive responses and active regulations. We demonstrate that regulations of osmolyte production and cell wall synthesis allow cells to adapt to a broad range of external osmolarity with a threshold value above which cells cannot grow, ubiquitous across bacteria and yeast. Intriguingly, the theory predicts a dramatic speedup of cell growth after an abrupt decrease in external osmolarity due to cell-wall synthesis regulation. Our theory rationalizes the unusually fast growth observed in fission yeast after an oscillatory osmotic perturbation, and the predicted growth rate peaks match quantitatively with experimental measurements. Our study reveals the physical basis of osmoresponse, yielding far-reaching implications for microbial physiology.
Introduction
Microbes constantly transition between environments with dramatically different osmolarities, a hallmark of microbial life [1–4]. One of the most essential features of walled microbial cells is the turgor pressure — the elastic stress stretching the cell wall due to osmotic imbalance. Upon a hypoosmotic shock (i.e., a sudden decrease of the external osmolarity), the turgor pressure increases immediately due to the sudden water influx. To relax the turgor pressure, the cell up-regulates the cell-wall synthesis rate, adds more materials to the peptidoglycan network, and eventually adapts to the lower external osmolarity [5]. Upon a hyperosmotic shock (i.e., a sudden increase of the external osmolarity), the cell volume of a microbial cell shrinks within milliseconds due to water efflux, leading to a decreased turgor pressure [6, 7]. To increase the internal osmotic pressure, microorganisms increase their intracellular solute pool by amassing osmolyte molecules (i.e., osmoregulation), e.g., through de novo synthesis [8]. The cell volume then restores progressively over time, and eventually, the cell adapts to the higher osmolarity. Intracellular crowding may act as a cell volume sensor to trigger osmoregulation [9–11]. Meanwhile, intracellular crowding due to volume reduction inevitably affects the cellular physiology globally, e.g., slowing down protein diffusion [12–18] and reducing the elongation speed of translating ribosomes [19, 20]. Despite extensive knowledge regarding the molecular details of osmotic response pathways [4], how intracellular crowding interferes with gene expression regulation and affects osmotic adaption remains an open question.
Interestingly, many features of microbial osmoresponses appear general across different organisms, suggesting a universal underlying mechanism. For example, it is widely observed that microbial cells can adapt to a broad range of external osmolarity, with the external osmotic pressure varying over an order of magnitude [19, 21–23]. Furthermore, the growth rate in the steady state decreases as the external osmolarity increases and a complete arrest of cell growth occurs above a critical osmolarity [19, 22–26]. Moreover, upon an osmotic shock, the growth rate usually does not approach the new steady-state value monotonically, e.g., an overshoot of growth rate often occurs upon a hypoosmotic shock [23], and a damped oscillation of growth rate can happen after a hyperosmotic shock [22]. In recent experiments of Schizosaccharomyces pombe [27], an oscillatory osmotic shock was applied to cells during which cell volume growth was dramatically slowed down while biomass was still actively produced. Surprisingly, a supergrowth phase happened after removing the oscillatory osmotic shock, during which cells grew much faster than the steady state before the shocks.
In this work, we unify all these phenomena by a theory capturing the essential elements of osmoresponses: physical constraints (e.g., the crowding effects and osmotic imbalance) and biological regulation, including osmoregulation (i.e., regulation of the osmolyte-producing protein) and cell-wall synthesis regulation. We apply nonequilibrium thermodynamics to model water flux across the cell membrane due to osmotic imbalance [7, 28]. We also introduce a coarse-grained model of proteome fraction, including the ribosomal proteins and osmolyte-producing protein [29]. Upon a hyperosmotic shock, cell volume reduction due to water efflux increases the protein density, inducing the up-regulation of osmolyte-producing protein but slowing down the translation speed due to crowding. Upon a hypoosmotic shock, the dramatic water influx stretches the cell wall, and the increased turgor pressure induces cell-wall synthesis [5, 30, 31].
We apply our theories to quantitatively fit the data of steady-state growth rate vs. internal osmotic pressure, from which we extract the sensitivities of the translation speed and regulation of osmolyte-producing protein to the intracellular density. We further demonstrate that osmoregulation and cell-wall synthesis regulation allow cells to adapt to a broad range of external osmolarity and avoid plasmolysis. Further, our model predicts non-monotonic time dependence of growth rate and protein density towards the steady-state values after a constant osmotic shock, in concert with experimental observations [22, 23]. Moreover, we show that a supergrowth phase can occur after the external osmolarity decreases abruptly due to cell-wall synthesis regulation. Remarkably, the predicted amplitudes of supergrowth (i.e., growth rate peaks) quantitatively match several independent experimental measurements.
Results
Cell growth
In the limit of an extreme hyperosmotic shock, the remaining cytoplasmic volume is comparable to the volume of expelled water [14, 21, 32]. Thus, the total cytoplasmic volume must be divided into a free volume and a bound volume [28, 33–36],
The free volume comes from the free water that is osmotically active, and the bound volume includes the bound water Vbw (i.e., water of macromolecular hydration) and the volume of dry mass Vbd (Figure 1A). Because the fraction of protein mass in the total dry mass is typically constant and the volume of bound water is proportional to the dry mass [21], the bound volume is proportional to the total protein mass mp through Vb = αmp. Here, α is a constant, and its values for some model organisms are included in Table 1, and its detailed calculations from experimental data are in Section B of Supplementary Material.
The free volume changes due to osmotic imbalance, and the growth rate of the free volume follows
where Πin, Πout are the internal (i.e., cytoplasmic) and external osmotic pressures, respectively [7]. Πin is proportional to the concentration of osmolyte molecules in the free volume: Πin = kBTNa/Vf where Na is the number of osmolyte molecules, kB is the Boltzmann constant, and T is the temperature. For simplicity, we assume that the production speed of osmolyte molecules is proportional to the mass of osmolyte-producing protein (Methods). Here, we have replaced the difference of the hydrostatic pressures across the cell membrane with the turgor pressure σ, assuming that mechanical equilibrium is always satisfied. kw is the filtration coefficient quantifying the water permeability of the cell membrane [37].
The species of osmolytes involved in osmoregulation are diverse across different microorganisms and conditions; nevertheless, they are primarily small organic molecules [8, 38]. In this work, we simplify the problem by considering a single species of osmolyte that dominates the internal osmotic pressure, e.g., glycerol in Saccharomyces cerevisiae [39–41] and glycine betaine in Escherichia coli [3], with the production speed proportional to the mass of the osmolyte-producing protein (Figure 1A and Methods).
To model gene expression regulation, we introduce χa and χr as the fractions of ribosomes translating the osmolyte-producing protein and ribosomal proteins (Figure 1B and Methods). In steady states, χa and χr are equal to the mass fractions of osmolyte-producing protein and ribosomal proteins in the total proteome, ϕa = mp,a/mp and ϕr = mp,r/mp, respectively [29, 42]. In this work, we assume that the dry-mass growth rate is proportional to the fraction of ribosomal proteins in the proteome for simplicity, µr = krϕr where kr is a constant proportional to the elongation speed of ribosome. The growth rate of the cytoplasmic volume, , is a weighted average of the free-volume growth rate µf and the dry-mass growth rate µr:
Here, f is the free volume fraction in the total cytoplasmic volume: f = Vf /V. In this work, we refer to the growth rate as the growth rate of cytoplasmic volume µ unless otherwise mentioned.
Osmoregulation
Experiments found that the reduction of growth rate as the external osmolarity increases is dominated by the reduction of the translation speed kr instead of the ribosomal fraction ϕr [19]. Therefore, we assume that the fraction of ribosomes translating themselves χr is constant for simplicity. To model osmoregulation, we introduce a coupling between the fraction of ribosomes translating the osmolyte-producing protein χa and the degree of intracellular crowding. We quantify the crowding effects by the protein density, defined as ρp = mp/Vf, which serves as a good proxy for the dry-mass density measured in the experiments [43, 44] (see Table 1 and the detailed discussion on the relations between the two densities in Section A of Supplementary Material) and propose the following relation:
Here, the parameter Ha quantifies the sensitivity of osmoregulation to intracellular crowding. represents the largest possible ϕa since all intracellular dynamics is frozen when ρp > ρc.
Cell-wall synthesis regulation
The turgor pressure is proportional to the elastic strain of the cell wall by an elastic modulus G such that
Here, Vcw is the relaxed cell-wall volume (Figure 1C). When plasmolysis happens, the cell membrane detaches from the cell wall (V < Vcw), and the turgor pressure is zero. We introduce the growth rate of the relaxed cell-wall volume as . Given that in the steady states of cell growth, µr = µcw, we write µcw in the following form without loosing generality,
Here, ηcw is a coarse-grained parameter modeling the active regulation of cell-wall synthesis, which we refer to as the cell-wall synthesis efficiency in the following.
Experiments suggested that the turgor pressure induce cell-wall synthesis, e.g., through mechanosensors on cell membrane [45, 46], by increasing the pore size of the peptidoglycan network [5], and by accelerating the moving velocity of the cell-wall synthesis machinery [31]. Guided by these ideas, we model cell-wall synthesis regulation through positive feedback from turgor pressure to the cell-wall synthesis efficiency:
Here, σc is a characteristic scale of turgor pressure depending on species. is the relaxation timescale when the current ηcw is below (above) its target value . The former (latter) happens immediately after the cell is subject to a hypoosmotic (hyperosmotic) shock. In the extreme case of plasmolysis, the insertion of newly synthesized cell wall materials is interrupted immediately due to the separation of the cell membrane and cell wall. Meanwhile, the up-regulation of cell-wall synthesis rate presumably takes a longer time. For example, in fungi, where polarized growth is generally adopted, the up-regulation of the cell-wall synthesis rate involves reorienting the polarisome complex to the growing tip, directing actin polarization, and delivering cell-wall synthesis machinery [47, 48]. Therefore, we set in this work (see details of parameter values in Table 1).
Intracellular crowding
Multiple experiments suggested the existence of a glass transition in the cytoplasm of bacteria and yeast, above which the cytoplasm freezes and the mobility of biomolecules virtually stalls [14, 15, 49]. Intracellular crowding affects biochemical processes globally, e.g., slowing down translation and intracellular signaling by suppressing protein diffusion [14, 15, 18, 19, 49]. Therefore, the speed of osmolyte production, translational elongation, and cell-wall synthesis are all slowed down by the same crowding factor:
Here, ρc is the critical protein density, and Hr is a parameter to quantify the sensitivity of biochemical reactions to the intracellular density. For example, the translational elongation speed is suppressed by intracellular crowding through. Therefore, the dry-mass growth rate becomes , where we introduce .
The details of our model are summarized in Methods, with five independent variables: the protein density ρp, the mass fraction of osmolyte-producing protein ϕa, the internal osmotic pressure Πin, the cell-wall strain ϵ and the cell-wall synthesis efficiency ηcw.
Steady states in constant environments
All growth rates in steady states of cell growth are the same: µf = µr = µcw. The consequence of cell-wall synthesis regulation can be seen directly from µcw = µr: the turgor pressure at steady states is constant, σ = σc. Experimentally, the cell-wall strain was measured by applying an acute hyperosmotic shock to induce plasmolysis, and it is approximately constant as the external osmolarity increases [22, 50], suggesting a constant turgor pressure independent of external osmolarity, in concert with our model assumptions. The internal osmotic pressure at steady states is related to the external osmotic pressure through Eq. (2),
Here, we have neglected the term µf /kw. Experimentally, an abrupt water flux occurs within hundreds of milliseconds after an osmotic shock [51], from which we can estimate the water permeability as kw ∼ 100 min−1atm−1 considering an osmotic shock with an amplitude ΔΠout = 1 atm. Because the typical doubling times of microorganisms are around hours, we can estimate µf /kw ∼ 10 Pa [51, 52], negligible compared with the typical cytoplasmic osmotic pressures, which can be several atmospheric pressures.
In steady states, the internal osmotic pressure is independent of time. Combining Eq. (4) and the dynamics of the internal osmotic pressure, Eq. (18c), we find the relationships between the protein density, the internal osmotic pressure, and the growth rate in the steady states:
The right-hand side of Eq. (10a) is a constant independent of external osmolarity (see its detailed expression in Section C of Supplementary Material). In deriving Eq. (10b), we have replaced ρp by Πin in Eq. (8) using Eq. (10a) with the critical internal osmotic pressure Πin,c proportional to ρc. Intriguingly, the universal relationship between the normalized growth rate and the normalized Πin, which we refer to as the growth curve in the following, has only one degree of freedom Hr/(Ha + 1). Eq. (10b) predicts a critical external osmolarity Πout,c = Πin,c − σc, beyond which cell growth is completely inhibited.
We test the validity of Eq. (10b) by fitting it to the experimental growth curves (Figure 2A). To do this, we calculate the internal osmotic pressure using Eq. (9) given the values of the external osmotic pressure and the turgor pressure (Table 1). Intriguingly, the growth curves of multiple species can be well fitted by Eq. (10b), from which we infer the parameters Hr/(Ha + 1) and Πin,c (Table 1). We find that budding yeast cells exhibit a notable resilience to high external osmolarities: their Πin,c value is higher than those of Gram-positive bacteria, B. subtilis, and Gram-negative bacteria, E. coli. Further, budding yeast cells demonstrate a higher value of Hr/(Ha + 1), indicating a reduced susceptibility to growth rate reduction when exposed to mild increases in the external osmolarity. Meanwhile, the osmoadaptation capability of E. coli depends on the growth media, presumably arising from variations in metabolic fluxes and gene expressions [19, 21, 22].
To further reveal the biological functions of biological regulations, we study the steady-state properties of mutant cells in which either osmoregulation or cell-wall synthesis regulation is depleted. For mutant cells without osmoregulation, Ha = 0 in Eq. (4). In this case, the fraction of osmolyte-producing protein is constant with time, i.e.,. Comparing the dynamics of osmolyte and total protein mass, and, one finds that the ratio of the number of osmolyte molecule and the total protein mass remains constant over time, irrespective of variations in external osmolarity (see the detailed derivation in Section C of Supplementary Material). As the external osmolarity increases, the protein density of mutant cells quickly reaches the critical value ρc according to Eq. (10a) with Ha = 0. Therefore, the steady-state growth curve of the mutant cells terminates at an external osmolarity much smaller than wild-type (WT) cells (Figure 2B), in agreement with previous experiments [53].
For mutant cells without the cell-wall synthesis regulation, Hcw = 0; therefore, the cell-wall synthesis efficiency ηcw equals 1 independent of time. Thus, the growth rate of the relaxed cell-wall volume is always equal to the growth rate of total protein mass [Eqs. (6, 7)]. Interestingly, in this case, the turgor pressure at steady states decreases with the increase of external osmolarity (Figure 2C and see the detailed proof in Section C of Supplementary Material). The decreased turgor pressure lowers the internal osmotic pressure given the same Πout according to Eq. (9), leading to a lower protein density of mutant cells than WT cells according to Eq. (10a). Therefore, mutant cells grow faster than WT cells under the same external osmolarity (Figure 2B). Nevertheless, the mutant cells are prone to plasmolysis at a threshold external osmolarity where the WT cells can maintain constant turgor pressure (see the vertical line in Figure 2C around 2 M extra external osmolarity). Reduced turgor pressure is detrimental to multiple biological processes, e.g., cytokinesis in fission yeast requires the participation of turgor pressure [54].
To summarize, osmoregulation allows cells to grow in a wide range of external osmolarity conditions with a mild change in protein density. The cell-wall synthesis regulation allows cells to maintain a stable turgor pressure and avoid plasmolysis. Both regulatory mechanisms expand the range of external osmolarities that cells can adapt to.
Transient dynamics after a constant osmotic shock
Next, we study the dynamical behaviors of cellular properties in response to a constant osmotic shock: the external osmolarity changes abruptly and keeps its value for an infinitely long time. Intriguingly, we find that the dynamics of osmoresponse can be split into shock and adaptation periods (see insets of Figure 3C, D). The immediate water flow due to osmotic imbalance occurs in the shock period, during which the mass and osmolyte productions are negligible. Therefore, the ratio of the internal osmotic pressure and the protein density is invariant right before and after a shock period: where the upper index i (f) means the state right before (after) the shock period. Given this condition, we introduce the normalized protein density as
where the normalization factor (see its detailed expression in Methods) so that changes continuously across the shock period. Interestingly, we find that osmoresponse are governed by a two-dimensional dynamical system composed of and (Methods):
Here, is the normalized critical protein density, and ηa denotes the efficiency of osmoregulation. From the above equations, it is clear that the timescale of osmoregulation is set by the doubling time: it takes about the doubling time for the protein density and the fraction of osmolyte-producing protein to adapt to the new steady-state values. For walled cells, and depend on the time since Πin = Πout + σ and the turgor pressure σ is time-dependent during osmoresponse processes (Figure 3A, B). For unwalled cells, such as mammalian cells and microbial cells with cell walls removed (i.e., protoplasts), is constant in a fixed environment (see detailed discussion on the transient dynamics of unwalled cells in Section D of Supplementary Material).
Upon a constant hyperosmotic shock, the immediate water efflux leads to an instantaneous drop in turgor pressure and a rise in protein density (Figure 3A). The internal state of the cell, evolves towards to the new equilibrium point,.One should note that the equilibrium point is time-dependent initially but eventually becomes fixed as the turgor pressure relaxes to the steady-state value (Figure 3C and Movie S1). Interestingly, the protein density increases initially and then decreases after the shock (Figure 3A). The decrease in protein density is because of the osmoregulation process, which is set by the doubling time [Eqs. (12a, 12b)]. Meanwhile, we find that the initial increase of protein density is because of the suppressed growth of the relaxed cell-wall volume due to the low turgor pressure. Indeed, for unwalled cells, the protein density ρp decreases immediately after the shock (Figure S2B). We note that the growth rate approaches the new steady-state value non-monotonically (Figure 3A) because of the spiral trajectory in the space of the internal state (Figure 3C), consistent with experimental observations [22].
The phenomena are essentially the opposite for a constant hypoosmotic shock (Figure 3B, D and Movie S2). However, we find an extremely fast cell growth after the hypoosmotic shock, with a growth rate peak occurring about 25 minutes after applying the shock, which we call the supergrowth phase [27]. One should note that 25 minutes is much shorter than the doubling time (about two hours) but comparable to the timescale of cell-wall synthesis regulation, which we set as in the simulations in Figure 3 (we will explain why we choose in the next section). Furthermore, applying a hypoosmotic shock to an unwalled cell does not induce a significant supergrowth phase compared with walled cells (Figure S2D).
We propose that supergrowth comes from the high turgor pressure caused by the hypoosmotic shock, which leads to a fast cell-wall synthesis according to Eq. (7). Rapid insertion of materials into the cell wall relaxes the turgor pressure and allows the cells to grow faster [Eqs. (2, 3)]. This idea is consistent with the observation that the growth rate and the growth rate of the relaxed cell-wall volume µcw reach their peaks simultaneously (Figure 3B). This observation also suggests that the timescale of supergrowth, i.e., the timing of growth rate peak, is set by the time scale of cell-wall synthesis regulation [ in Eq. (7)]. Notably, in the initial stage of the adaptation period, µcw approaches its target from below and reaches its target value at the growth rate peak (i.e.,) (the third panel of Figure 3B), after which µcw sticks to its target value and decreases accordingly because of the short relaxation time[Eq. (7)].
A detailed proof of the conditions for supergrowth, including the necessity of a cell wall and the regulation of cell-wall synthesis, is provided in Section E of the Supplementary Material.
Following the discussion above, we obtain an analytical expression of the growth rate peak after a hypoosmotic shock (see the detailed derivations in Section F of Supplementary Material)
Here, all the variables on the right side are at the growth rate peak. Because the timescale of the osmoresponse process, which is around hours (Figure 3B), is much longer than the timescale of the supergrowth phase, which is about 20 minutes, the turgor pressure at the growth rate peak can be well approximated by its immediate value after the shock. Therefore, the growth rate peak must increase as the amplitude of the hypoosmotic shock increases, which we confirm numerically (Figure 3E).
Comparison between theories and experiments
Next, we quantitatively compare our theoretical predictions regarding the supergrowth phase with experimental data. In Ref. [27], Knapp et al. applied an osmotic oscillation to fission yeast S. pombe during which the external osmolarity alternated between two values.
They found cell growth was almost inhibited during the perturbation, while the protein and dry-mass densities increased. Surprisingly, cells grew unusually fast after the osmotic oscillation was removed and reached their maximum growth rate about 20 minutes after the end of the osmotic oscillation. The maximum growth rate can be twice the growth rate in the reference growth medium, and the elevation in growth rate can persist for 2-3 cell cycles. These observations are very similar to our results for a constant hypoosmotic shock (Figure 3B).
To test if our osmoresponse model captures the supergrowth phase for a periodic perturbation, we simulate a wide-type S. pombe cells with the same protocols as the experiments (see details of simulations in Methods). Intriguingly, our model successfully recapitulates the supergrowth phase and the gradually increasing protein density and dry-mass density during the perturbation (Figure 4A). We confirm that the cell-wall synthesis regulation is crucial for the emergence of the supergrowth phase since unwalled cells do not exhibit supergrowth under the same conditions (Figure S3B). Interestingly, we find that an infinitely long periodic osmotic shock can be equivalently mapped to a constant osmotic shock (see the detailed discussions and proof in Section D of Supplementary Material), which means that they have the same time-averaged growth rate and protein density in the steady states (Figure S2F).
In Ref. [27], the authors measured the growth rate peaks vs. three different parameters of the osmotic oscillations: amplitude, period length, and number of periods. We first fit the growth rate peaks vs. the amplitudes (Figure 4D), from which we obtain Hcw = 1.7, the sensitivity of the cell-wall synthesis efficiency to turgor pressure [Eq. (7)], and, the timescale in the up-regulation of cell-wall synthesis efficiency (which is why we set in the previous section).
Other model parameters are inferred from independent steady-state measurements, and we set the timescale in the down-regulation of cell-wall synthesis efficiency as for simplicity (Table 1). We next fix the values of Hcw and and plot the predicted growth rate peaks vs. the period length (Figure 4B) and number of periods (Figure 4C). As a strong support of our model, our predictions quantitatively match the experimental data without any further fitting.
Two interesting features of the curve µsg v.s amplitude catch our attention: the non-monotonic behavior and the kink point at which the derivative is discontinuous (Figure 4D), which are conserved regardless of the number of periods (Figure S7). Therefore, we study the case of a single oscillation for simplicity, which is equivalent to a hyperosmotic shock of finite duration. For a mild hyperosmotic shock, during the period of hyperosmotic shock, the turgor pressure has almost recovered to the steady-state value σc (Figure 3A). Therefore, switching from a long hyperosmotic period to the reference growth medium is equivalent to a constant hypoosmotic shock, where we have shown that the growth rate peak increases with the amplitude (Figure 3E). However, the crowding effect becomes more pronounced as the amplitude increases. Beyond the critical amplitude at the kink point, the cytoplasm is completely jammed during the hyperosmotic shock such that the cell states are precisely the same before and after the hyperosmotic shock, which means no supergrowth phase beyond this critical amplitude. Therefore, the curve µsg vs. amplitude must be non-monotonic (Figure 4E). Notably, for a very large Hr, cells can feel the crowding effect only when the cytoplasm is close enough to the critical protein density, shown as the abrupt decline of µsg (Figure 4F).
Finally, we remark that the significance of supergrowth is intimately related to the amount of recovered turgor pressure during the hyperosmotic shock δσ. We prove that the overshoot of turgor pressure after the removal of hyperosmotic shock (σf − σc), which sets the growth rate peak, is mainly set by the recovered turgor pressure during the hyperosmotic shock (see the detailed discussions in Section G of Supplementary Material). Indeed, µsg, σf − σc, and δσ are highly correlated as we change the amplitude (Figure 4E).
Discussion
This study presents a theory of microbial osmoresponses based on a physical foundation and simplified biological regulation strategies. Regarding the steady-state properties, our theory successfully recapitulates the constant turgor pressure and the growth rate reduction as the external osmolarity increases. In particular, we predict a critical external osmolarity above which cell growth is completely inhibited and a universal relationship between the normalized growth rate and the normalized internal osmotic pressure, which nicely fits the data of bacteria and yeast. We also demonstrate the biological functions of osmoregulation and cell-wall synthesis regulation. Cells defective in osmoregulation cannot grow even if the external osmolarity is only mildly higher than the reference value. Cells defective in cell-wall synthesis regulation cannot maintain turgor pressure as the external osmolarity increases even though they grow faster than WT cells (Figure 2B), which will be a strong support of our theory if confirmed by experiments.
Regarding dynamic behaviors, our model predicts a non-monotonic time dependence of protein density after a constant hyperosmotic shock. We also unveil the supergrowth phase after a hypoosmotic shock, initially discovered in fission yeast after an osmotic oscillation [27]. As a strong support of our theory, the predicted growth rate peaks quantitatively agree with the experimental data without additional fitting. We demonstrate the critical role of cell-wall synthesis regulation in the supergrowth phenomenon (Section E of Supplementary Material). In Ref. [27], the authors observed the rapid repolarization of the cell-wall glucan synthase Bgs4 to the cell tip following the removal of osmotic oscillations in fission yeast, in agreement with the dynamics of the cell-wall synthesis efficiency predicted from our model (compare Figure S11 in this work and Figure S4H in Ref. [27]). To test our theories, we propose applying a hyperosmotic shock with a finite duration and measuring the growth rate after removing the hyperosmotic shock. We predict that the growth rate peak during the supergrowth phase is a nonmonotonic function of the shock amplitude (Figure 4E). Ref. [22] showed that the expansion of E. coli cell wall is not directly regulated by turgor pressure, a scenario akin to Hcw = 0 in our model. According to our model, the supergrowth phase is absent if Hcw = 0 (Figure S8), consistent with the absence of a growth rate peak after a hypoosmotic shock in the experiments of E. coli [22]. Our predictions are also consistent with the growth rate peak after a hypoosmotic shock observed for B. subtilis [23]. Nevertheless, the growth inhibition before the peak, as observed in Ref. [23], which may be due to the high membrane tension that inhibits transmembrane flux of peptidoglycan precursors, is beyond our model.
In our current framework, the osmoregulation and cellwall synthesis regulation relies on the instantaneous cellular states: protein density and turgor pressure. However, microorganisms can exhibit memory effects to external stimuli by adapting to their temporal order of appearance [55]. Notably, in the osmoregulation of yeast, a short-term memory, facilitated by post-translational regulation of the trehalose metabolism pathway, and a longterm memory, orchestrated by transcription factors and mRNP granules, have been identified [56]. Besides, our model does not account for the role of osmolyte export in osmoregulation, which has been shown to help cells recover from a sudden drop in external osmolarity [57]. Exploring the interference between osmolyte export and the supergrowth phase will be interesting.
Acknowledgements
We thank Chunxiong Luo for helpful discussions related to this work. The research was funded by the National Key R&D Program of China (2021YFF1200500) and supported by Peking-Tsinghua Center for Life Sciences grants.
Methods
Details of the osmoresponse model
We define the fractions of osmolyte-producing protein and ribosomal proteins in the total proteome as ϕa = mp,a/mp and ϕr = mp,r/mp, respectively. To model gene expression regulation, we introduce χa and χr as the fractions of ribosomes translating the osmolyteproducing protein and ribosomal proteins such that
Here, kr equals the elongation speed of ribosomes on mRNAs divided by the protein mass of a single ribosome, which is affected by the global crowding effect as . Here, µr is the growth rate of total protein mass, which is also the growth rate of dry mass and bound volume in our model since they are all proportional.
The osmolyte molecules are produced by the osmolyteproducing protein, with the rate given by
where is the osmolyte production rate including the crowding factor and mp,a is the mass of osmolyte-producing protein. We summarize the dynamical equations involved in the osmoresponse model:
To describe the osmoregulation process using a twodimensional dynamical system, we introduce the normalized protein density as
Combining Eq. (11) and Eq. (18a), we obtain the dynamical equation for as
Using Eq. (15), we obtain the equation for as
where . The unique equilibrium point for the internal state is
Details of numerical simulations
We employ the LSODA algorithm with automatic stiffness detection and switching [59], implemented in SciPy [60], to solve Eq. (18). The parameters used for numerical simulations of walled cells are listed in Table 1.
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