Nutrient transport kinetics

Nutrient transport (e.g., of NO₃^-, NH₄⁺, PO₄^3-) typically occurs via secondary active porters that are either matched for a specific nutrient molecule type, or for similar types [12]; thus a transporter for NO₃^- will not transport NH₄⁺, while similar amino acids such as the cationic group arginine, lysine, histidine and ornithine may share the same transporter [13]. In addition, individual nutrient types may be taken up by several different transporter proteins [14–16], some of which may support biphasic kinetics [16–18]. Here, to simplify discussions, we will consider transport via a single (monophasic) transporter type.

While transporter proteins are not strictly enzymes (as they typically do not change the chemical form of their substrate), they express an affinity for the nutrients they transport; by analogy with the Michaelis-Menten half saturation value of enzymes, K_M, we term this substrate concentration K_T. The constant K_M is a function of the affinity of the enzyme for the substrate in classic Michaelis-Menten terminology and is determined assuming that all factors other than substrate availability are non-limiting. Determining K_T is more complex because transporter functionality depends on the integrity of the membrane in which the transporter proteins function, ionic gradients generated by primary active transporters required to support the operation of the typically secondary-active nutrient-transporters, as well as on the aforementioned absence or presence of short and longer term feedback processes modulating transport itself into the functional cell.

Another defining criterion for enzyme functionality is the maximum level of activity, k_cat, which is described in units of mole of substrate consumed (or product given) per mole of enzyme per unit of time (Table 1). The maximum rate of enzyme activity in a given sample of biological material, which is a product of k_cat and the concentration of enzyme protein, sets the value of the maximum process rate, V_max, in Michaelis-Menten kinetics. It is important to note that the amount of enzyme in an assay does not affect the value of K_M, while the value of V_max in the assay is linearly related to enzyme concentration. The value of V_max can thus be seen as being somewhat ambiguous, only being useful for a specific assay incubation. For considerations of whole-organism physiology, the value of k_cat needs to be placed in the context of the total demand for its activity, the size (mass) of the enzyme and thence for the total resource expenditure for that enzyme within a given cell (e.g., for such calculations applied to the enzyme fixing CO₂, RuBisCO [19]).

The maximum rate of activity in a given cellular system (T_max) is analogous to V_max in an enzyme assay. Accordingly, while the value of K_T is independent of the number of transporter proteins in the cell, the value of T_max is indeed dependent on that number. The extent to which T_max exceeds G_max, noting that transporter activity is modulated by post-transport physiology, helps to explain why K_G is lower than K_T, as illustrated in S1 Fig and the adjoining online text. In reality there are many hundreds if not thousands of transporter proteins in operation across the plasma-membrane of an individual cell. Theoretical estimates of relative nitrate and phosphate transporter density suggest that a specific transporter type will generally cover less than 0.1% of the cell surface under nutrient limited conditions [20]. The number of transporter proteins, and hence the maximum rate of nutrient transport (T_max), also varies greatly with the nutritional status of the cell and for different nutrients, with ammonium transport and assimilation being much faster than for nitrate [21]. An example of the differences between ammonium and nitrate transport potential, and concurrent needs of N assimilation at different levels of N-stress is given in S2 Fig.

The linkage between nutrient transport and assimilation, and ultimately growth, is modulated via the expression of transport capacity for specific nutrient types via end-product (de)repression signals. These events involve both short-term control, for example satiation feedback regulation upon the operation of existing transporter proteins, and longer-term control via synthesis and removal of transporter proteins. This feedback occurs more quickly following ammonium and than nitrate transport because of the rapidity of both ammonium transport and of its assimilation [6,22]. Nitrate may also be accumulated in larger cells further decoupling processes of N-assimilation from transport. Thus, depending on the organism size and nutrient status, the nutrient being tested, experiment sampling, and subsequent data processing methodology, the values of both G_max and K_G may differ significantly from T_max and K_T [6]. Experiments using a given species and nutrient, for example varying the period of N-limitation, may likely give useful information on trends. However, interpretations of inter-species and inter-nutrient differences in U_max and K_U, especially when derived by different researchers, carry a high degree of uncertainty.

Relating transport kinetics to growth kinetics

Estimates of K_T for nutrient transport are very rare, and values for phytoplankton nutrient transporters are rarer still [23], but a value in the range of 0.5–2 μM has been reported [15]. In the following we will assume K_T = 1μM. For comparison, the K_M for enzymes processing biochemical transformations are typically in the mM range [24]. Just as the importance of the numeric value of V_max needs to be placed in the context of the enzyme sample in which it has been measured, so the value of T_max needs to be placed in the context of the cell in which it is located. The value of T_max may be expressed per cell, as a specific transport rate either following N-source uptake using ¹⁵N, or as a C-specific rate (this is shown in S2 Fig).

Nutrient availability for the cell does not just reflect the bulk water nutrient concentration (S_∞), which is readily measured, but it reflects the interactions between processes adding and removing nutrient molecules around the individual cell which affects the substrate concentration (S₀) at the transporter protein. Thus S₀ is also affected by turbulence, cell size and the cell’s motion [25–27]; collectively these determine the formation of a boundary layer around the cell and thence affect diffusion to the sites of transport. Cell size is a critical determinant in transport kinetics, as it affects the boundary layer thickness and hence the relationship between S₀ and S_∞. It is thus constructive to express T_max in the context of the surface area of the plasma-membrane in which the transporter proteins reside. If we assume a spherical cell form, with a given equivalent spherical diameter (ESD) and an equal distribution of transporter proteins over the membrane surface, we can then report T_max in terms of a transport rate density (TRD; Table 1). Thus, for the transport of ammonium-N, units of TRD would be g ammonium-N d^-1 μm^-2; that is to say that every day across every μm² of cell plasma-membrane area so many g ammonium-N could be transported assuming no satiation feedback. The value of TRD is enabled by the activity of many transporter proteins spread over the cell surface area (SA), each of which has its own K_T and k_cat. TRD is thus (2) and T_max is (3) The larger the cell, the greater the surface area but there is no reason to necessarily expect the value of TRD to differ according to cell size. In the following we ignore changes in cell size associated with nutrient availability (e.g. N-limited cells are typically smaller, while P-limited cells are larger) and environmental conditions (e.g. growth at different temperatures and irradiance [28] affect cell shape and size).

Growth itself is not a simple function of the presence of external nutrient availability (even if estimated more accurately as S₀ rather than S_∞), but is primarily a function of availability of that nutrient within the cell, and the allied biochemical processes associated with its assimilation into biomass. We thus need to consider transport rates in the context of supply and demand for the cell. Depending on the nutrient status, the value of T_max changes (S2 Fig), and consequentially so does the value of TRD. We can now define two important specific values of TRD. These are the values of TRD needed to enable G = G_max (TRD_Gmax), and the maximum possible value of TRD (TRD_max); the latter defines the value of TRD which aligns with the absolute maximum value of T_max (T_absmax) which is usually expressed by a cell at an intermediate level of nutrient stress (S2 Fig). By analogy with the plots shown in S2 Fig, we can also consider the excess in transport potential that develops during nutrient stress as the ratio of TRD_max: TRD_Gmax (δ_TRD; Table 1).

At saturating concentrations of nutrient and plausible maximum growth rates we can assume that diffusion is not limiting the supply of substrate to the transporter proteins (S₀ ≈S_∞), and hence we can estimate the value of T_max (as per S2 Fig) and hence TRD. From experimental work for ammonium and nitrate transport into the coccolithophorid Emiliania huxleyi, raphidophyte Heterosigma carterae and the diatom Thalassiosira weissflogii we compiled the data shown in Table 2. These values exploit relationships between cell biovolume measured using an Elzone (Coulter counter–like) instrument, and C-biomass derived from elemental analysis. In Table 3, comparative values for TRD are presented, calculated using the allometric relationships of cell size to C-content taken from the literature [9]. While there are significant differences between the C-, and thus the N-content of the cells computed according to these different methods, from these estimates we obtain a feel for a likely maximum value of TRD_max. For a given computational choice (Table 2 or Table 3) the value of TRD_max is not so different between organisms of markedly different taxonomy, size and maximum growth rate potential. These values suggest a decreasing scope for excess in transport potential δ_TRD (i.e., TRD_max: TRD_Gmax) with increasing size, which may be expected, given the associated changes in surface area to volume (SA:Vol) ratio.

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Table 2. Allometric, stoichiometric and ammonium transport characteristics for 3 phytoplankton species.

More detailed explanations of the variables are given in Table 1. The data have been compiled from [29–34] for the coccolithophorid Emiliania huxleyi, raphidophyte Heterosigma carterae and the diatom Thalassiosira weissflogii.

https://doi.org/10.1371/journal.pcbi.1006118.t002

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Table 3. Alternatives to Table 2 computed using an allometric scaling function.

More detailed explanations of the variables are given in Table 1 and legend of Table 2.

https://doi.org/10.1371/journal.pcbi.1006118.t003

An analysis of the data compiled by [11], which reports experimentally derived nutrient uptake maxima, and assuming U_max = T_max, yields average TDR_max that are broadly in line with those in Tables 2 and 3. Those data yield TRD values (as pg nutrient μm^-2 d^-1) of 0.075 (+/- SE 0.041), 0.115 (+/- SE 0.0137) and 0.172 (+/- SE 0.069) for ammonium-N, nitrate-N and phosphate-P uptakes, respectively, with no statistical relationship with ESD. It is noteworthy that the TRD values for ammonium estimated from the data compiled by [11] are half those for nitrate; ammonium T_max and thus TRD is expected to be much greater than the values for nitrate transport [21,34], which could indicate confounding estimation of kinetic parameters by different researchers, as explained earlier.

Ultimately the balance of supply and demand is reflected in how close an organism comes to attaining its maximum growth rate, G_max. It is this maximum rate of growth, and the form of the functional curve relating nutrient concentration to the achieved growth rate (G) that help define competitive advantage, and certainly do so in simple mathematical models. However, while the performance of each transporter protein may be expected to conform to the RHt2 equation of Michaelis-Menten kinetics, diffusion limitation is expected to decrease potential transport at lower nutrient concentrations [35,4,36], and the satiation feedback is expected to suppress transport rates at higher concentration (S2 Fig). In short, there are various reasons to expect that a RHt2 response curve (as used in simple models) will not well describe the true functional response curve between the bulk nutrient concentration (S_∞) and G. Indeed, we should likely not expect such a RHt2 relationship even between S₀ and G (S1 Fig).

Let us now consider the situation that aligns with a growth rate at half the maximum value (G_0.5). At this rate, the residual steady-state nutrient concentration in the bulk medium (S_∞) would equate to the half saturation value for growth, which defines K_G. The value of T_max in cells growing at the N-status equal to G_0.5 is much higher than the value of T_max in cells growing at G_max (S2 Fig; e.g. [21]). In addition, the amount of N required to support growth at G_0.5 is less than that required to support G = G_max. If, for example, we consider G_max to be associated with a maximum cellular N:C (g:g) of 0.2, and G = 0 with a minimum N:C of 0.05, then a cellular N:C aligning with G_0.5 would be expected to be ca. 0.125 gN gC^-1 (S2 Fig). In such a situation, the potential excess (δ_TRD) in transport capacity, of T_max, at G_0.5 could be ca. 20 fold the nutrient transport rate required at G_max. It is thus readily apparent that cells with different stoichiometries will exhibit different growth kinetics with respect to nutrient concentration, all else being the same.

There is one other important part of the jigsaw, and that concerns the relationships between cell size, the cellular carbon density as affected by vacuolation, and cell shape. For simplicity we assume a spherical cell, which then sets surface area (SA) as a simple geometric function of cell size (ESD). Vacuolation in protists, and especially in diatoms, increases markedly with ESD [9,37], and hence the demands for nutrient transport across each μm² of cell surface does not simply relate to cell size.

Having described the physiological framework, and considered the experimental data, we now proceed to extend the analysis according to allometric constraints across a range of sizes, organism types and motilities. The questions that we consider are:

1. How may allometry, stoichiometry and changing cellular carbon density (vacuolation) affect K_G?
2. How may motility or sedimentation rates affect K_G?
3. How may the maximum growth rate (G_max) affect K_G?

The emphasis here is on factors that impact upon K_G, namely S_∞ that support G_0.5. This value of K_G can be seen to be an emergent property of TRD, K_T, cell size, G_max, cell motility, cell vacuolation and cellular elemental stoichiometry. To our knowledge, no previous study has considered the interconnected nature of all these facets. Collectively these also embrace the core features considered in classic trait trade-off studies.

“Affinity” and competitive advantage in nutrient transport

We may consider that transporter proteins are specialist enzymes. There is an established literature exploring the competitive advantages, and evolution, of enzymes of different k_cat and K_M. Pettersson (1989) [42] considers the evolution of the value of k_cat/K_M noting that, beyond the initial phase that sees the expected increase in k_cat and decrease in K_M, enzyme evolution displays a linked increase in both k_cat and K_M; the value of k_cat/K_M approximates the diffusion control limit at the level of the enzyme molecule. Several studies [43–45] discuss the usefulness of this so-called “specificity constant” (k_cat/K_M) pointing out various problems both with the usefulness of the value itself, and with its some-time alternative title as a value of “catalytic efficiency”.

Interpretations of transporter kinetic parameters, operating at the site of individual transporter proteins, would be similarly implicated in such considerations. Just as trying to piece together whole organism biochemical evolution through reference to k_cat/K_M for all the constitutive enzymes in an organism is fraught with problems [42], so too are considerations of transport kinetics for different substrates into different species. However, it is noteworthy that our analysis indicates that, for a given cell configuration (size, motility, value of C_cell, stoichiometry; Fig 6 and Fig 7), the value of G_max/K_G is constant, as is k_cat/K_M expected to be constant in an evolutionary mature enzyme.

The phytoplankton literature has hitherto explored the relative competitive value of organisms under nutrient limitation through reference to (in our terminology–see Table 1) to U_max/K_U. This value of U_max/K_U has been termed “affinity” in parts of this literature [10,46]. Such usage of “affinity” conflicts with traditional parlance for enzyme affinity, which defines affinity by just the half saturation constant K_M. The form and interpretation of U_max/K_U is also different to that for k_cat/K_M for enzymes; while K_U may approximate to K_M, U_max is de facto a function of the product of transporter k_cat and the number of transporter proteins. The number of transporter proteins varies with cell size, nutrient status and likely also with G_max. In addition, there is the practical challenge of measuring U_max, being as it is a function of T_max (the rate of transport at the start of the experimental incubation, at t₀; [6]) and incubation conditions during the assay. In consequence, the values of U_max and K_U, and thence of their ratio, are subject to various confounding issues. The value of U_max/K_U could, under ideal conditions of measurement, perhaps be equated to T_max/K_T; however, there is still the question as to the impact of nutrient status upon T_max (S2 Fig), and the complication that K_T is the substrate value at the transporter protein (S₀) while K_U is the value of the substrate concentration in the bulk medium (S_∞).

The underlying explanations and potential trade-offs in expression of the uptake affinity defined as U_max/K_U has been argued to lack a mechanistic basis, hence leading to a potential misrepresentation of primary production in modelling approaches [3,47,5]. Our results indicate why a search for such a mechanistic basis has proven so difficult; there are too many confounding factors. An alternative approach considers nutrient uptake as a function of cell traits and actual nutrient availability in a turbulent environment [4,48,49]. The non-linear formulation describes so-called affinity as a function of cell size, density of uptakes sites at the cell surface (i.e. transporter proteins) and turbulence [5]. This diffusion- limited nutrient uptake results in a linear scaling of affinity with the cell diameter or radius (r). While some experimental results are consistent with this scaling [50], the general picture drawn by laboratory experiments over a wide range of sizes of taxa indicate a scaling closer to the square of cell radius [10,51] that is with the cells surface area, a trend that becomes more pronounced with decreasing cell size. Theoretical arguments have suggested that this mismatch might stem from the fact that cells are not “perfect sinks”, hence are not able to absorb all nutrients at the cells surface immediately as assumed by diffusion limited nutrient uptake [20], which is likely once satiation feedback develops. According to these considerations, while smaller cells are favoured by a larger surface to volume ratio, they also require a higher transporter density to achieve maximum affinity and would thus have higher relative investment costs [20]. However, T_max increases during at least the initial phase of nutrient-limitation (S2 Fig), which demonstrates an increased synthesis cost for transporters in such nutrient-limited cells; this suggests that the investment cost in transporters is not significant. There are clearly challenges with all the above analyses, centring upon what exactly U_max and K_U index as curve-fitting parameters for RHt2 curves fitted through imperfect (and only partially understood) experimentally-derived data.

With suitable methods, estimates of U_max will approach T_max, and estimates of K_U will approach K_T [6]. The numeric disparity between these variables depends on the nutrient status of the cell, the size of the cell (and thus how close S₀ is to S_∞), the form in which the nutrient is available, and the capacity of the cell to accumulate unaltered that particular nutrient prior to the development of satiation feedback. In consequence, greater challenges could be expected when measuring the kinetics of ammonium transport, which is assimilated very rapidly [8] and not accumulated. The ability of the diatom Phaeodatylum to take up the un-metabolisable ammonium analogue methlyamine is many orders of magnitude higher than for any other N-source [21]. This likely reflects the fact that methylamine entering via the ammonium transporter is not subject to the usual very rapid accumulation of the ammonium-transport-repressor signalling amino acid glutamine [8]. Lesser problems can be expected when measuring nitrate transport into a large vacuolated diatom that may accumulate nitrate [52], in comparison to transport into a nanoflagellate that lacks such vacuoles. It may therefore likely be no coincidence that the (few) data for kinetics for ammonium transport collated by Edwards et al. (2015) [11] appear so competitively poor in comparison with those for nitrate when the converse might have been expected. Similarly we expect fewer challenges when measuring phosphate transport into a cell type that accumulates polyphosphate.

Nutrient “affinity” [10,46], which has been described in our terminology as U_max/K_U, has typically not been related to the C:N:P stoichiometry of the cell nor to the cellular carbon density both of which will affect the numeric value of this index. Together, these additional data would provide links between nutrient-status and T_max and to the level of vacuolation affecting resource demand to be satisfied by transport over the cell surface. Collectively, stoichiometry (Fig 5) and cellular carbon density (Fig 1) affect the cell’s demand for the nutrient, which is a critical factor affecting the relative importance of any index of nutrient affinity. There is, however, scope for T_max to vary allometrically on account of the packing of transporter proteins within the plasma membrane (Fig 6); which is consistent with the suggested explanation of the discrepancy between theoretical scaling and observed values of U_max/K_U [20]. Further, and of greater significance for large non-diatoms protists than for diatoms, there is scope for the maximum growth rate to be limited by TRD attaining TRD_max (Fig 8). That is, if TRD_max = TRD_Gmax there is no scope to further enhance transport during nutrient stress. This is important because the value of K_G is a function of the potential transport over the required capacity in transport (S1 Fig), as the ratio T_max: T_Gmax. This means that larger cells, and faster growing cells of a given configuration (cell type and motility), are expected to have a higher K_G.

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Fig 8. Relationship between G_max, cell size, and TRD_Gmax.

Maximum N:C (at G = G_max) was assumed as 0.18 gN gC^-1.The required value for TRD_Gmax in C_diat is less than that for C_prot because diatoms, being more vacuolated with a lower gC (cell L)^-1, have a decreased demand for N across a given area of cell plasma-membrane. The absolute maximum value of TRD (TRD_max) is expected to be ca. 0.4 pgN μm^-2 d^-1; large fast-growing protists approach the limit of TRD_Gmax = TRD_max.

https://doi.org/10.1371/journal.pcbi.1006118.g008

There are also additional features of ecophysiology that affect the medium term dynamics of nutrient transport. There is for example a difference in the handling of ammonium versus nitrate, that sees the uptake and assimilation of ammonium more constrained to just the light phase. Thus ammonium transport rates during light may have to be double those expected looking at the day-average value, while nitrate assimilation is more likely split over the whole day [30]. In these contexts, it is interesting to note the relationships between ESD and G_max for different cell types [53], and that the typical value of G_max in phytoplankton equates to a division per day (G_max = 0.693d^-1), aligning with RuBisCo activity [19]. It is not just nutrient acquisition at nutrient-limiting concentrations that may be limiting growth rate potential; maximum transport at non-limiting concentrations may also be a factor (Fig 8). While for nitrate transport, there may be the potential for the expression of high-rate transporters, endowing the cell with a biphasic kinetic capability [18,54,55], this may be less likely for ammonium transport. Ammonium is highly toxic at high internal concentrations and its transport appears, unsurprisingly, tightly regulated. Ammonium is also normally present at low (often at vanishingly low) concentrations in natural waters, as the product of N-regeneration in ecosystems with low inorganic N concentrations. If for a given cell, the ammonium transporter exists only as a high affinity system, which is incapable of supporting growth at the highest rates because of limitations in TRD for ammonium, then high growth rates in large protists may only be possible when augmented by nitrate transport. This would place an interesting new spin on our understanding of ammonium-nitrate interactions, with implications for modelling biogeochemical and ecological events.

The results of our analysis show how features relating to the regulation of the synthesis and kinetics of transporter proteins, as well as to stoichiometric and allometric features of the cell, all play a part in the story. Arguably, the competitive advantage of an organism would be best indexed by the value of G_max/K_G as this integrates over all aspects of the organism’s nutrient physiology. We thus emphasise factors affecting K_G. In the following we assume for the most part that all else remains constant (i.e. K_T, TRD_max, NC_max and NC_min are constant) and consider the impacts of each of these factors upon the system.

Allometry, stoichiometric, and cellular carbon density effects on K_G

If the cellular carbon density is constant across cell sizes, then there is a clear and powerful impact of cell size on K_G (Figs 4–7). Smaller cells are much better equipped than are larger cells in this regard; this is because the SA:Vol ratio directly translates to a SA:N-demand ratio, as well as to lower diffusion limitations in smaller cells [56]. However, in reality there is an important allometric relationship between cellular carbon density and cell size [9] such that larger cells have a lower cellular carbon density. For diatoms in particular, which are increasingly vacuolate at large size [37], this greatly decreases the needs for nutrient transport across a given area of plasma-membrane. According to the calculations presented here, large diatoms with high sedimentation rates appear potentially to be much better adapted to make use of low nutrient concentrations than one may expect if one was to assume a fixed cellular carbon density (i.e., C_diat vs C₁₅₀) (Fig 4).

The consequences of this decrease in cellular carbon density with cell size is actually secondary to the decrease in N-cell density; the above mentioned mitigation of cell size on K_G in consequence of the lower N-cell density thus assumes that cell stoichiometry is the same. From the effects of altering the range of cell stoichiometry, shown in Fig 5, we conclude that cell stoichiometry and the form of the relationship between stoichiometry and growth rate (the quota relationship–see [57]) are also important factors to consider when reviewing calculations of K_G. That is to say, if larger cells had a high NC_min, such that the value of N:C at G_0.5 was elevated, then the mitigation afforded through being more vacuolated would be eroded. Conversely, if smaller cells were relatively N-rich, then the advantage of being small would be eroded. For example cyanobacteria are typically relatively N-rich [58] and would therefore not be so competitive as may at first appear.

The physiology of nutrient acquisition and stoichiometry has the potential to override, or at least partially compensate for, limitations at transport [59]. Models considering detailed explorations of nutrient uptake kinetics thus need also to relate those kinetics to variable stoichiometry and cell size, and not assume simple fixed relationships. For phosphate transport, as for ammonium transport, TRD_max is likely very much higher than TRD_Gmax. In addition, the strongly curved form of the P:C quota relationship [57] will also have a strong impact upon K_G for P-limited growth as the P:C value in cells growing at G_0.5 will be low.

Motion (motility or sedimentation) effects on K_G

Our analysis suggests that for smaller cells (ca. <5μm ESD) motion has little additional scope to moderate diffusion limitation. Above that size, the negative effect of size is greatly countered (though not negated) by motion through swimming or sedimentation (Figs 1–5). Note that sedimentation is affected directly by Stokes law; hence differences in cell mass between species, and with nutrient status may affect sedimentation rates [60]. While it may be tempting to explain motility primarily as a mechanism to enhance competitive advantage for nutrient transport (i.e., through lowering K_G), the role of motility is also related to behaviour linked to vertical migration [61,62]. Motility is also important for finding prey to support mixotrophy, an activity present in even the very smallest flagellated species, with an ESD of <3 μm, Micromonas [63].

Sedimentation in diatoms is a common trait [64,65], often considered as detrimental but having clear advantages for nutrient acquisition at low concentrations in turbulent water systems (Fig 4). For diatoms, sedimentation adds significantly to the advantage of becoming increasingly vacuolate with larger ESD (Figs 4–7). Given that cell size usually also confers an anti-predator advantage, this means that larger diatoms appear better adapted to dominate in turbulent waters (in which their sedimentation de facto confers motility) than may otherwise appear.

Maximum growth rate effects on K_G

Our analysis indicates that the relationship between G_max/K_G and G_max is flat for a given ESD (Fig 5). This relationship is useful as it permits the estimation of K_G for a given organism type, motility and size. It also means that a given organism will have a lower K_G if its G_max should decrease through adaptation, or indeed through acclimation, to different environmental conditions. The analysis also indicates that there is scope for a much greater spread in nutrient-related kinetics in larger cells (Fig 4). For smaller cells there is less effect of motility, and less variation in cell-C density; inter-species variation will thus generate increasing “noise” in the relationship between ESD and kinetics in larger cells.

The value of G_max/K_G reflects many interactions and as a summary parameter provides an index for competitive advantage in simple nutrient-competition (bottom-up controlled) systems. The value of K_G itself also has important implications for the health of the cell; it defines the bulk water nutrient concentration (S_∞) supporting a state of health aligning with G_0.5. Health affects the intrinsic mortality rate of the cell, a factor that is typically not included in models scaled to nutrient status, but one that is important as a selective feature [66,67]. A poor health status adversely affects the operation of repair mechanisms, e.g. compensating for photo-damage [68], and explains the duration of the lag phase of growth seen when nutrient-starved microalgae are re-fed [69].

Describing the relationship between nutrient concentration and growth rate

Simple models relate nutrient concentration to transport rate and thence to growth rate using a rectangular hyperbolic type 2 (RHt2) response curve, in line with Monod (1949) [70]. From our analysis (Figs 9, S1 and S3–S6) RHt2 cannot be expected to well define the actual relationship between nutrient concentration in the bulk medium (S_∞) and transport. The fitting of RHT2 tends to over-estimate transport at lower nutrient availability and over or under estimate it at high availability. The expected relationship plateaus more abruptly than RHt2 can describe it. It is noteworthy that the fit of RHt2 to the modelled relationships was high (R² > 0.95 in all instances, and most > 0.98); the “noise” in biological measurements that is inherent in experimental procedures of transport and growth rates [6] will inevitably result in a statistically acceptable fit to RHt2. Nonetheless, RHt2 does not appear to be appropriate, and the apparent subtle differences in the form of the described nutrient transport kinetics will manifest themselves in potentially important differences in competitive advantage in modelled populations. Such differences become more apparent when considering the form of the relationship between nutrient status and T_max (Fig 7), a topic that is also of consequence when describing the ammonium-nitrate interaction [71]. It is also important to couple nutrient-light limitations in the correct way, else the expected decrease in K_G with light limitation does not occur [72]. Interactions with temperature and allometry are also complex [53,73], with changes in cell size, overall growth rate, and differential impacts on transport vs metabolism [28,74]. All of this speaks to the importance of describing the relationship between multi-factor feedback interactions upon cell growth, with some attempt to simulate (de)repression of different metabolic pathways.

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Fig 9. Relationship between T_max N-status (N:C) and cell size (ESD).

This is shown for cells as protists or diatoms of different size (as equivalent spherical diameter, ESD), defined using Eqs 5, 6 and 7 with KT_con = 0.1. The green layer shows the transport need to support growth; the difference between this green layer and the potential transport rate T_max indicates the potential over-capacity for transport (see S2 Fig). The maximum growth rate was assumed as 0.693 d^-1; at higher G_max the green layer is elevated there thus being less difference between T_max and the transport required to meet demand. Maximum and minimum N:C were assumed at 0.18 and 0.05 gN gC^-1, respectively; the cellular carbon density was set via the allometric relationships for C_prot and C_diat [9]; the maximum transporter rate density was set at TRD_max = 0.4 pgN μm^-2 d^-1.

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Wider context & conclusions

In general, the importance and usefulness of using a single proxy as a determinant of competitive advantage seems overstated. This applies to usage of the value of k_cat/K_M in enzyme kinetics, U_max/K_U in studies of diffusion limitation, or G_max/K_G in whole organism growth kinetics. Similarly, only considering stoichiometry represents too great a simplification in considerations of nutrient competition [59]. We simply have too limited knowledge of the real nutrient concentrations at the scales of consequence for these organisms (proximate to the cells), while we also know that factors such as alternative nutritional routes (nitrate vs ammonium vs dissolved organic -N; phosphate vs dissolved organic -P, phago-mixotrophy), different transporter types with different affinities for a given nutrient [14,16], allelopathy [75], palatability for grazers [76] and resistance to non-predator factors affecting cell mortality [77] are all important if not critical factors affecting competition at different times and places in the real world.

Our analysis, like many other studies, makes the unrealistic caveat of all-else-being-equal across a wide range of organism types, shapes, sizes, motilities and stoichiometries. So, while Fig 4 portrays a general theoretical pattern, application of that pattern to explain species competition for growth in the same water body must be viewed with extreme caution. It is of some comfort that the approach justifies (is consistent with) a common assumption that fast growing (r-select) species are disadvantaged in mature ecosystems where their slower growing (K-select) competitors have a better nutrient affinity (lower K_G). However, simply relating K_G (or indeed any such parameter) to size is in any case highly problematic: many very small, non-motile cells tend to grow together (notably when P-stressed), and diatoms can grow in chains or mats, so that effective particle size (affecting boundary layer thickness and sedimentation) is often larger than it appears; the impacts of such changes are typically not included in models. Furthermore, little is known about interactions with alternative modes of nutrition, such as mixotrophy (including the use of dissolved organics), which likely vary significantly between organisms and will impact greatly upon the significance of K_G for a given limiting nutrient at any instant in time.

Within simple bottom-up controlled systems operating under non-steady-state conditions, possession of a higher growth rate is expected to endow a powerful competitive advantage under conditions of nutrient abundance. Larger growing cells need not be disadvantaged in such systems. However, smaller organisms appear always to be at an advantage for nutrient acquisition within nutrient limited systems running closer to steady-state, as epitomised by chemostat experimental systems and typically observed in the oligotrophic oceans. In a chemostat, at a given dilution rate the substrate concentration converges on that which enables the growth rate to match the dilution rate. Besides the logistic challenges in running chemostats to determine K_G, there is also the real risk that the organisms adapt to enforced slow growth over many months [66]. It is notable that the predicted values of K_G from this study (Fig 2) are in the main very low, bordering on the level of chemical detection in the bulk media, even when assuming a transporter protein nutrient affinity (K_T) of 1 μM. Interestingly, in modelled systems, the dynamics of the system may be more heavily controlled by the parameters controlling activity of zooplankton than by the value of K_G for phytoplankton [78]. It is also noteworthy that factors affecting cell size, motility/sedimentation, stoichiometry and cellular carbon density impact greatly upon predation kinetics and the value of the organism as food for the predator [79,26]. Thus, while motility enhances transport potential through decreasing boundary-layer limitations, motility is rather a double-edged-sword as it raises the likelihood of encountering a predator. For sure, simple comparisons between single-factors such as nutrient competition cannot possibly determine the true competitive advantage.

We can perhaps be more secure in considering the implications of our analysis for the evolution of an individual species, where intra-species competition is important. Here, within a particular cell line of a given species, the values of K_G and G_max can be expected to be linked; a faster growing cell will have a higher K_G. This observation is consistent with a general feature of enzyme activity such that high k_cat is often associated with a high K_M [42], in consequence of a low K_M being deleterious for the rapid breakdown of the enzyme-substrate complex. Irrespective of species-species interactions, one may thus expect a trade-off between K_G and G_max and for this to be reflected in the evolution of a particular cell line. Taken alone, this is an important trade-off between traits affecting the benefit of fast growth and is consistent with the observation that cells forced to grow slowly in a low-dilution chemostat (noting that dilution rate = growth rate at steady-state, and that the residual nutrient concentration is lower at low dilution rates) evolve a lower G_max than the parent population [66]. The complexity of trade-offs in the evolution of individual enzymes [42] perhaps warns against attempting too-tight a linkage between K_G and G_max in terms of trait trade-off arguments at the whole organism level.