Li and Rinzel (1994) simplified the model by De Young and Keizer (1992). In the model by Li and Rinzel (1994), cytosolic Ca²⁺ concentration depends on Ca²⁺-induced Ca²⁺ release (CICR) from the endoplasmic reticulum (ER) to the cytosol, Ca²⁺ pump flux from the cytosol to the ER via sarco/ER Ca²⁺-ATPase (SERCA) pump, and leakage flux from the ER to the cytosol (leak ER). In the model by Li and Rinzel (1994), the differential equation for the Ca²⁺ concentration can be written as: (1)d[Ca2+]cytdt=(rCICRm∞3n∞3h3+rLEAK)× ([Ca2+]free-(1+c1)[Ca2+]cyt)- VSERCA[Ca2+]cyt2[Ca2+]cyt2+KSERCA2 and the differential equation for the fraction of active inositol 1,4,5-trisphosphate (IP₃) receptors (IP₃Rs) can be written as: (2)dhdt=h∞-hτh, where (3)m∞=[IP3]cyt[IP3]cyt+d1, (4)n∞=[Ca2+]cyt[Ca2+]cyt+d5, (5)h∞=Q2Q2+[Ca2+]cyt, (6)τh=1a2(Q2+[Ca2+]cyt), and (7)Q2=d2[IP3]cyt+d1[IP3]cyt+d3. Li and Rinzel (1994) maintained IP₃ concentration constant. The parameter values can be obtained from the literature (see, e.g., Li and Rinzel, 1994; De Pittà et al., 2009). Li and Rinzel (1994) also presented equations for Ca²⁺ efflux and influx across the plasma membrane when the total free Ca²⁺ concentration ([Ca2+]free) was varying according to a differential equation.

The model by Höfer et al. (2002) is based on several other publications (Atri et al., 1993; Dupont and Goldbeter, 1993; Höfer and Politi, 2001). They model up to 361 astrocytes and their model has four variables per astrocyte: cytosolic Ca²⁺ and IP₃ concentrations, Ca²⁺ concentration in the ER, and fraction of active IP₃Rs. The cytosolic Ca²⁺ concentration depends on CICR, leak ER, and SERCA pump across the ER membrane (v_Rel includes both CICR and leak ER) and Ca²⁺ efflux, influx, and leak across the plasma membrane (v_in includes both influx and leak), as well as diffusion of Ca²⁺ inside the cytosol and transfer of Ca²⁺ via gap junctions. The Ca²⁺ concentration in the ER depends on CICR, leak ER, and SERCA pump. The IP₃ concentration depends on two distinct production terms via phospholipase C (PLC), one corresponding to PLCβ, which is activated through G-protein-coupled receptors exclusively in the stimulated cell, and the other to PLCδ, which is activated by Ca²⁺ elevation in the stimulated cell and in downstream cells, in addition to IP₃ degradation, diffusion inside the cytosol, and transfer of IP₃ via gap junctions. The fraction of active IP₃Rs depends on rates for IP₃R inactivation by Ca²⁺ binding and recovery. Thus, the model by Höfer et al. (2002) includes the following differential equations for the cytosolic Ca²⁺ concentration: (8)∂[Ca2+]cyt∂t=vRel-vSERCA+vin-vout+ DCa(∂2[Ca2+]cyt∂x2+∂2[Ca2+]cyt∂y2), for the Ca²⁺ concentration in the ER: (9)∂[Ca2+]ER∂t=β(vSERCA-vRel), for the IP₃ concentration: (10) ∂[IP3]cyt∂t=vPLCβ+vPLCδ-vdeg+ DIP3(∂2[IP3]cyt∂x2+∂2[IP3]cyt∂y2), and for the fraction of active IP₃Rs: (11)∂R∂t=vrec-vinact, where (12)vRel=(k1+k2R[Ca2+]cyt2[IP3]cyt2([Ca2+]cyt2+Ka2)([IP3]cyt2+KIP32))× ([Ca2+]ER-[Ca2+]cyt), (13)vSERCA=k3[Ca2+]cyt, (14)vin=v40+v41[IP3]cyt2[IP3]cyt2+Kr2, (15)vout=k5[Ca2+]cyt  , (16)vPLCδ=v7[Ca2+]cyt2[Ca2+]cyt2+KCa2, (17)vPLCβ=v8((1+κG)(κG1+κG+α0))-1α0, (18)vdeg=k9[IP3]cyt, and (19)vrec-vinact=k6(Ki2Ki2+[Ca2+]cyt2-R). Equation (17) is given here as in the original publication since we were not able to verify it from any other source. Evidently, it could also be given in the form vPLCβ=v8(κG+(1+κG)α0)-1α0 which is much simpler and this raises a question if the equation was given incorrectly in the original publication. Most of the parameter values can be obtained from the literature (Höfer et al., 2002).

We implemented two single astrocyte models with spontaneous Ca²⁺ excitability. The first Ca²⁺ oscillation model was the model by Lavrentovich and Hemkin (2008), which is based on the models by Houart et al. (1999) and Höfer et al. (2002). The model by Lavrentovich and Hemkin (2008) is a generic model, that is not built to represent any specific brain area. However, they used some experimentally supported hypotheses to build their model (see, e.g., Parri et al., 2001; Aguado et al., 2002; Parri and Crunelli, 2003). The model includes three variables: Ca²⁺ concentration in the cytosol, Ca²⁺ concentration in the ER, and IP₃ concentration (see Tables 1, 2). The second model was by Riera et al. (2011a,b), which is based on the models by Li and Rinzel (1994), Shuai and Jung (2002), Höfer et al. (2002), and Di Garbo et al. (2007). Riera et al. (2011a,b) included both modeling and wet-lab experimental work in mouse hippocampus. They used the experimental data to find the values for a few parameters. The model includes four variables: Ca²⁺ concentration, total free Ca²⁺ concentration, fraction of active IP₃Rs, and IP₃ concentration (see Tables 1, 3). In some of the simulations, Riera et al. (2011a) kept the total free Ca²⁺ concentration constant.

We implemented two single astrocyte models with neurotransmitter-evoked Ca²⁺ excitability. The first one was the generic model by De Pittà et al. (2009) for glutamate (Glu)-induced astrocytic Ca²⁺ dynamics, which is based on the models by De Young and Keizer (1992), Li and Rinzel (1994), and Höfer et al. (2002). Several key observations on a variety of cell types were used to construct the model, e.g., IP₃ kinetics data from Xenopus oocytes. De Pittà et al. (2009) also used experimental data by Tsodyks and Markram (1997) as input to their model. The model by De Pittà et al. (2009) includes three model variables: Ca²⁺ concentration, IP₃ concentration, and fraction of active IP₃Rs (see Tables 1, 4). De Pittà et al. (2009) pointed out in their publication that h denotes fraction of inactive IP₃Rs. However, they took the variable h from the model by Li and Rinzel (1994) where h is used to describe fraction of active IP₃Rs. The second model was the generic model by Dupont et al. (2011) for metabotropic Glu receptor 5 (mGlu5R)-induced Ca²⁺ oscillations. The model is based on their previous models (Dupont and Goldbeter, 1993; Dupont and Croisier, 2010), and they compared their simulation results with some experimental data from, e.g., Chinese hamster ovary cells (Nash et al., 2002). Their model includes six variables: Ca²⁺ concentration, diacylglycerol (DAG) concentration, ligand-bound mGlu5R dimer (DIM) concentration, IP₃ concentration, fraction of active protein kinase C (PKC), and fraction of Ca²⁺-inhibited IP₃Rs meaning fraction of inactive IP₃Rs (see Tables 1, 5).

We implemented the models in MATLAB® and in Python based on the information in the original publications, such as equations, parameter values, initial conditions, and stimuli (see Tables 1–5), and simulated the models. In MATLAB®, we used both the forward Euler method and built-in differential equation solvers, such as ode15s. In Python, we built and ran the models using Jupyter Notebook (jupyter.org) and used Scipy's differential equation solver odeint. Simulations run using different platforms and solvers produced consistent results. The models implemented in Python can be found in ModelDB, Accession numbers 223144, 223269, 223273, and 223274 (senselab.med.yale.edu/modeldb; Migliore et al., 2003; Hines et al., 2004). We checked if we were able to reproduce the original results given in the original publications (see Figure 1 and Table 6). The percentage changes in Table 6 were calculated using: (20)y-xx×100, where x is the original value and y is the reproduced value. We also tested the comparability of the models to each other (see Figures 2–5).

Lavrentovich and Hemkin (2008) and Riera et al. (2011a,b) studied spontaneous Ca²⁺ oscillations in a single astrocyte model. Lavrentovich and Hemkin (2008) explicitly presented all the equations, parameter values, and initial conditions in their publication and they have additionally provided a corrigendum (see Tables 1, Table 2 for details). They showed five simulation result figures where the variables were plotted against time. We were able to reproduce well all of them (Figures 3–5, 7, 9 of the original publication) with our implementation of the model (see also Manninen et al., in press). The first column from the left of Figure 1 (under “Lavrentovich”) shows the same behavior as Figure 3 of the original publication by Lavrentovich and Hemkin (2008) when using the information in the corrigendum (see Table 6 for more details). It was difficult to extract the exact maximum value from the original figures (Figures 5b,c of the original publication by Lavrentovich and Hemkin, 2008) if the maximum value occurred in an early stage of the simulation. Thus, Table 6 shows large percentage changes when the original and reproduced values are compared.

Riera et al. (2011a,b) presented all model equations and parameter values in their publication (see Tables 1, 3 for details). However, they did not give the initial conditions for the variables, but we were able to obtain them from the results of the original publication (Riera et al., 2011a, see Tables 1, 3 for details). For the Ca²⁺ and IP₃ concentrations, we set the initial values to 0.09 μM and 0.14 μM, respectively. For the fraction of active IP₃Rs, we set the initial value to 0.79. The total free Ca²⁺ concentration we set to a constant value of 2 μM (the sum of fluxes over the cell membrane was zero; j_in+v_CCE−v_OUT = 0) based on Figure 4b of the original publication by Riera et al. (2011a). While trying to reproduce the simulation results as in Figure 4b of the original publication, we realized that there was a typographical error in the original differential equation for the fraction of active IP₃Rs (see Tables 3, 6 for details). After modifying the equation accordingly, we were able to reproduce, with our implementation of the model, more similar results as in Figure 4b of the original publication. The second column from the left of Figure 1 (under “Riera”) shows that our values for h and IP₃ did not stay high in the beginning of the simulation as the black curves did in Figure 4b of the original publication when X_IP3 was 0.43 μM/s between 100 s and 900 s and 0 otherwise (curves with dotted lines in Figure 1). Especially, the concentration of IP₃ dropped nearly to zero which can be seen in Table 6 as very high percentage changes in the minimum values. One possible reason for the differing original and reproduced results is that Riera et al. (2011a) must have used a nonzero value for X_IP3 in the beginning of the simulation. Thus, a pulse function of 0.43 μM/s between 100 and 900 s, and otherwise 0.2 μM/s produced about the same curves as the original figure (see curves with solid lines in Figure 1 and Table 6).

De Pittà et al. (2009) and Dupont et al. (2011) modeled neurotransmitter-evoked Ca²⁺ excitability. De Pittà et al. (2009) presented all the equations and parameter values in their publication (see Tables 1, 4 for details). However, they did not give the initial conditions for the variables. For Ca²⁺ concentration, IP₃ concentration, and the fraction of active IP₃Rs, we set the initial values to 0.09 μM, 0.22 μM, and 0.78, respectively. De Pittà et al. (2009) showed one simulation result figure (Figure 12 of the original publication with both the amplitude modulation (AM) and frequency modulation (FM)), where the variables were plotted against time. We were able to reproduce well Figure 12 AM of the original publication with our implementation of the model (see the second column from the right of Figure 1 under “De Pittà”). The stimulus used in Figure 1 was a two-pulse wave with alternating Glu concentrations of 2 nM and 5 μM, pulse duration of 62.5 s, and period 125 s. Compared to Figure 12 FM of the original publication, we were not able to reproduce the lower amplitude oscillations toward the end of stimulus and our IP₃ concentration had smaller values (see Table 6 for details). They have also provided an erratum. However, the erratum did not provide any such information that helped us to reproduce the results.

Dupont et al. (2011) presented a model for mGlu5R-induced Ca²⁺ oscillations. Dupont et al. (2011) presented all the equations and parameter values in the original publication, but did not give the initial conditions for the variables (see Tables 1, 5 for details). For four of the variables, we were able to obtain the initial values from the results of the original publication. The initial values we used were 0.1 μM for the Ca²⁺ concentration, 14 nM for the concentration of DIM, 25 nM for the DAG concentration, and 0.2 for the fraction of active PKC. For the IP₃ concentration and fraction of Ca²⁺-inhibited IP₃Rs we decided to use 0.2 μM and 0.9898, respectively (see also Manninen et al., in press). Dupont et al. (2011) presented two figures where the variables were plotted against time. With the original parameter values, we were able to reproduce the oscillating behavior as seen in Figure 2 of the original publication for the concentrations of DAG and DIM, and fraction of active PKC. However, in our implementation, the Ca²⁺ concentration oscillated with very small amplitude (nM). In addition, with the original parameter values we were not able to obtain oscillating Ca²⁺ behavior as in Figure 3 of the original publication. We then checked the references mentioned by Dupont et al. (2011), and decided in this study to change the equation for Ca²⁺ concentration. We modified the equation to be more similar to the one in the publication by Dupont and Croisier (2010) (see Table 5 for details). With this modified model we were able to reproduce the oscillating behavior as in Figure 2 of the original publication by Dupont et al. (2011) (see the first column from the right of Figure 1 under “Dupont” and Table 6 for details). In this case, the stimulus was a constant Glu concentration of 8 μM. When comparing our simulation results to Figure 3 of the original publication, the modified model implemented by us produced more frequent oscillations for Ca²⁺ concentration compared to the original model and the concentration of DIM oscillated once before reaching a steady-state value (see Table 6 for details). We therefore conclude that our modified Ca²⁺ equation was not exactly the same that Dupont et al. (2011) must have used in their original simulations.

It was difficult to compare the models by Lavrentovich and Hemkin (2008) and Riera et al. (2011a,b) because these models originally had quite differing dynamical behavior (see Figure 1). However, these models actually have some components that are identical or just have different parameter values (Tables 2, 3); Ca²⁺ efflux from the cytosol to the extracellular space (vout=kout[Ca2+]cyt), flow of Ca²⁺ from the extracellular space to the cytosol (parameters v_in by Lavrentovich and Hemkin, 2008 and j_in by Riera et al., 2011a,b), and transport of Ca²⁺ from the cytosol to the ER via SERCA pump (v_SERCA). The production and degradation terms of IP₃ are also almost identical with just different parameter values except that the model by Riera et al. (2011a,b) has two production terms, the parameter X_IP3 in addition to the production term depending on Ca²⁺ concentration. Different equations are used for CICR via IP₃Rs (named v_CICR by Lavrentovich and Hemkin, 2008 and v_Rel by Riera et al., 2011a,b), in which Ca²⁺ is released from the ER to the cytosol. Lavrentovich and Hemkin (2008) and Riera et al. (2011a,b) modeled the leak flux from the ER to the cytosol due to concentration gradient with similar equations but different parameter values. Riera et al. (2011a,b) modeled it as part of the equation for v_Rel. In addition, Riera et al. (2011a,b) modeled the capacitative Ca²⁺ entry (v_CCE) from extracellular space to the cytosol and also had the fraction of active IP₃Rs as a model variable. Lavrentovich and Hemkin (2008) did not take into account the ratio of effective volumes for cytoplasmic and ER Ca²⁺ in their model.

We tested the model by Lavrentovich and Hemkin (2008) when the sum of ionic fluxes across the cell membrane was zero (vin-kout[Cacyt2+]=0) and otherwise the same setup as in Figure 1 (see the first column from the left of Figure 2 under “Lavrentovich”). Mimicking this setup in the model by Riera et al. (2011a,b) (compare to the second column from the left of Figure 1 under “Riera”), we changed the parameter producing IP₃ (X_IP3) to zero in the model by Riera et al. (2011a,b) in addition to having the total free Ca²⁺ concentration as a constant value of 2 μM as in Figure 1 (see the second column from the left of Figure 2 under “Riera”). Comparing these two columns of Figure 2, it is evident that the model by Lavrentovich and Hemkin (2008) has higher Ca²⁺ and IP₃ concentrations compared to the model by Riera et al. (2011a,b). However, when taking into account the ratio of effective volumes for cytoplasmic and ER Ca²⁺ (β = 35) from the model by Di Garbo et al. (2007) to the model by Lavrentovich and Hemkin (2008), the Ca²⁺ and IP₃ concentrations became lower than compared to the condition when not taking the ratio into account (not shown). Including this ratio did not work directly with the original setup of the model since model variables ceased to oscillate.

Next, we attempted to maximize the frequency of oscillations in the model by Lavrentovich and Hemkin (2008) to match better the results of the model by Riera et al. (2011a,b). The second column from the right of Figure 2 (under “Lavrentovich”) shows the results when the parameter V_M2 related to the SERCA pump was changed to 5.8 μM/s in the model by Lavrentovich and Hemkin (2008) and a simulation setup otherwise similar as in Figure 1 was used. With this value we were able to obtain more frequent Ca²⁺ oscillations compared to the original attempt presented in Figure 1. The first column from the right of Figure 2 (under “Riera”) shows the results of a setup where the total free Ca²⁺ concentration was a variable and X_IP3 was a constant value of 0.43 μM/s in the model by Riera et al. (2011a,b) and otherwise the simulation setup was similar to Figure 1. It can thus be concluded that these two models have very differing dynamical behavior.

We also tested how the models by Lavrentovich and Hemkin (2008) and Riera et al. (2011a,b) behaved with each others' parameter values when we had net ionic fluxes over the cell membrane (not shown). We studied the equations of both models and decided to change only those parameter values that were in equations of exactly identical form in both models (parameters v_in vs. j_in, v_M2 vs. V_SERCA, k_f vs. v₂, v_p vs. v_δ, k_p vs. K_δCa, and k_deg vs. K_IP3 by Lavrentovich and Hemkin (2008) and Riera et al. (2011a,b), respectively). We tested both modifying all values simultaneously, and modifying them one by one. We discovered that the model by Lavrentovich and Hemkin (2008) was not able to oscillate at all or only once in 600 s with any of the values by Riera et al. (2011a,b), neither when parameters were tested one by one nor when they were tested simultaneously. When testing the model by Riera et al. (2011a,b) with the parameter values of the model by Lavrentovich and Hemkin (2008), we found out that if the two values for the same parameter were almost similar, the model by Riera et al. (2011a,b) still oscillated with the parameter value from the model by Lavrentovich and Hemkin (2008). X_IP3 would appear to be the most important parameter causing the model by Riera et al. (2011a,b) to oscillate. If X_IP3 was zero, the model did not oscillate with the original parameter value or with any parameter value from the model by Lavrentovich and Hemkin (2008).

We compared the model by De Pittà et al. (2009) and our modified version of the model by Dupont et al. (2011) using four different stimuli. Figure 3 shows the model behaviors when the stimuli were two different constant Glu concentrations. The two columns from the left of Figure 3 show how the models behaved when the stimulus was a constant Glu concentration of 0.1 μM. We chose this stimulus because both models oscillated with a value this small. The two columns from the right of Figure 3 show how the models behaved when the stimulus was a constant Glu concentration of 2.5 μM. This stimulus was chosen because it clearly brought out the difference between these two models. The simulation results of the model by De Pittà et al. (2009) with a constant Glu stimulus of 2.5 μM showed how all the model variables, Ca²⁺, IP₃, and fraction of active IP₃Rs, oscillated, whereas the simulation results of our modified version of the model by Dupont et al. (2011) showed oscillations with only two model variables, Ca²⁺ concentration and the fraction of Ca²⁺-inhibited IP₃Rs. In addition, it should be noted that the models had opposite behaviors with these two stimulus values; the higher stimulus value produced higher Ca²⁺ concentrations with the model by De Pittà et al. (2009), but it produced lower Ca²⁺ concentrations with our modified version of the model by Dupont et al. (2011). Based on experimental data (Honsek et al., 2012; Haustein et al., 2014), the Ca²⁺ concentration is higher when the Glu concentration is higher, and the model by De Pittà et al. (2009) seems to behave more realistically than our modified version of the model by Dupont et al. (2011) in this sense (see Figure 3).

Figure 4 shows model dynamics when the Glu stimuli were two different seven-pulse waves. The two columns from the left of Figure 4 show how the models behaved when the Glu stimulus was a seven-pulse wave with alternating concentrations of 2 nM and 5 μM, pulse duration of 5 s, and period 15 s. The two columns from the right of Figure 4 show how the models behaved when the Glu stimulus was a seven-pulse wave with alternating concentrations of 2 nM and 5 μM, pulse duration of 1 s, and period 6 s. In our modified version of the model by Dupont et al. (2011), the Ca²⁺ concentration oscillated even with the Glu concentration of 2 nM, which was not the case with the model by De Pittà et al. (2009) (see Figure 4). The model by Dupont et al. (2011) was developed and tested for a constant stimulus, whereas the model by De Pittà et al. (2009) was developed for a varying stimulus (see Figures 3–5).

Since the model by De Pittà et al. (2009) and our modified version of the model by Dupont et al. (2011) produced opposite results, we decided to investigate their dynamical behavior in more detail. Our modified version of the model by Dupont et al. (2011) did not oscillate with all the model variables when the stimulus was a constant Glu concentration between 1.8 μM and 3.4 μM or zero. We also discovered that when the stimulus was a constant Glu concentration higher than 3.8 μM, the model by De Pittà et al. (2009) ceased to oscillate during the simulation, and it reached a steady-state. The higher the constant stimulus concentration, the faster the model by De Pittà et al. (2009) ceased to oscillate. At a constant Glu concentration of 3.8 μM, the model ceased to oscillate around 500 s. At a constant Glu concentration of 4 μM, the model ceased to oscillate around 300 s. At a constant Glu concentration of 8 μM (the original stimulus of the model by Dupont et al., 2011), the model ceased to oscillate around 100 s (see Figure 5). Such a long-lasting constant stimulus may be considered to mimic cell culture conditions where a neurotransmitter is applied with a pipette and not immediately rinsed. We also tested our modified version of the model by Dupont et al. (2011) with the original stimulus of the model by De Pittà et al. (2009) (compare Figures 1 and 5).

The authors declare that the research was conducted in the absence of any commercial or financial relationships that could be construed as a potential conflict of interest.