Dependence of Macrophage Phagocytic Efficacy on Antibody Concentration

Macrophages ingest the fungus Cryptococcus neoformans only inthe presence of opsonins, and this provides a remarkably cleansystem for the detailed analysis of phagocytosis. This systemis also unusual in that antibody-mediated phagocytosis involvesingestion through both Fc and complement receptors in the absenceof complement. Mathematical modeling was used to analyze andexplain the experimental data that the macrophage phagocyticindex increased with increasing doses of antibody despite saturatingconcentrations and declined at high concentrations. A modelwas developed that explains the increase in phagocytic indexwith increasing antibody doses, differentiates among the contributionsfrom Fc and complement receptors, and provides a tool for estimatingantibody concentrations that optimize efficacy of phagocytosis.Experimental results and model calculations revealed that blockingof Fc receptors by excess antibody caused a reduction in phagocyticindex but increased phagocytosis through complement receptorsrapidly compensated for this effect. At high antibody concentrations,a further reduction in phagocytic index was caused by interferencewith complement receptor ingestion as a consequence of saturationof the fungal capsule. The ability of our model to predict theantibody dose dependence of the macrophage phagocytic efficacyfor C. neoformans strongly suggest that the major variablesthat determine the efficacy of this process have been identified.The model predicts that the affinity constant of the opsonicantibody for the Fc receptor and the association-dissociationconstant of antibody from the microbial antigen are criticalparameters determining the efficacy of phagocytosis.

INTRODUCTION

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Introduction

Phagocytosis is a process by which certain types of cells areable to ingest particles and microbes. Some protozoa, like amoebae,use phagocytosis for the acquisition of food. Among the metazoa,many animals have specialized cells for host defense that caningest and destroy microbes. In mammals, tissue macrophagesare highly specialized cells that ingest, destroy, and digestmicrobes and present peptide antigens to lymphocytes. Macrophagephagocytosis is dependent on cellular receptors and can be enhancedby the presence of antibody or complement opsonins (2). In manyinfectious diseases, the production of opsonic antibody is associatedwith immunity. Therefore, this phylogenetically ancient processrepresents a critical component of host defense against microbialinfections.

Cryptococcus neoformans is a pathogenic yeast that is a relativelyfrequent cause of life-threatening meningoencephalitis, especiallyin immunocompromised individuals (10). This fungus is unusualin that it has a polysaccharide capsule that is antiphagocytic.Consequently, the interaction of C. neoformans and macrophagesrarely results in phagocytosis unless specific antibody and/orcomplement-derived opsonins are present. Phagocytosis of C.neoformans by macrophages has been studied with cells derivedfrom various sources, including the J774 murine macrophage-likecell line (8). In this system, the phagocytic index was shownto depend on several variables, including the concentrationand type of opsonin, the size of the capsule expressed by theC. neoformans strain, and the relative ratio of macrophagesto yeast cells (8). This system has several advantages for thestudy of phagocytosis, including the fact that yeast cells arerelatively large and can be easily counted by light microscopyand the qualitative outcome of the interaction whereby thereis no significant phagocytosis in the absence of opsonins. Hence,it is possible to define the variables that affect the outcomeof the interaction between C. neoformans and macrophages ina manner that would be very difficult for other microbial-macrophagesystems.

We are particularly interested in the mechanisms of antibody-mediatedprotection against C. neoformans and the relationship betweenantibody dose and protective efficacy. Passive immunizationwith antibody to the capsule is protective, but administrationof large amounts of antibody abrogates protection (13, 15) andcan actually enhance the course of infection. This phenomenonhas been called a "prozone-like" effect. While studying theinteraction of macrophages and C. neoformans in vitro, we notedthat the phagocytic index declines at higher antibody concentrations(13, 15). Given that this observation could be associated withthe prozone-like phenomenon observed in passive protection experiments,we decided to study it in more detail and construct a mathematicalmodel of phagocytosis of C. neoformans that would allow us tobetter understand the contribution of the various parametersto opsonic efficacy.

There have been several attempts to generate mathematical modelsof phagocytosis in the literature (11, 16). Phagocytosis isan attractive process for mathematical modeling because manyof the variables are relatively well understood. However, noneof the models available have addressed the critical contributionof opsonin concentration, and the subject was last investigatedalmost two decades ago.

We propose and test a mathematical model based on understandingof the underlying principles and mechanisms of phagocytosis.We identify the main variables and parameters of the model andanalyze their impact on the outcomes of our experiments. Ourmathematical description of phagocytosis is based on the differentialequation which describes the rate of change of the total numberof ingested microbes, P_I, as a function of the population ofnoningested (free) microbes, P_F, and the rate of phagocytosis,r_T. The rate of phagocytosis depends on the amount of antibodybound to the C. neoformans capsule and the number of receptorsavailable, and we use this model to explore the dependence ofthe phagocytic index on the concentration of free antibody bycombining mathematical analysis and experimental work. We discussthe issues that arise from the analysis of the model and proposeexperimental and theoretical questions for further refinementof the model.

MATERIALS AND METHODS

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Materials and Methods

Phagocytosis assays. The assay used to study phagocytosis involved minor modificationsto the previously described methods (8, 9). For all experiments,we used the J774.16 murine macrophage cell line, which faithfullyreproduces the interaction of C. neoformans with murine macrophages(6). Briefly, on the day prior to the phagocytosis experiment,approximately 5 x 10⁴ J774.16 cells were added to 96-well polystyrenetissue culture plates (BD Falcon, Franklin Lakes, NY) in mediaconsisting of 10% heat-inactivated fetal bovine serum (GeminiBio-Products, Woodland, CA), 10% NCTC-109 (Gibco, Grand Island,NY), and 1% nonessential amino acids (Mediatech, Herndon, VA)in Dulbecco's modified Eagle media (Gibco) containing 50 U/mlof gamma interferon. After overnight incubation at 37°C,the media were removed, the monolayer was washed three timeswith fresh media, and 10⁵ C. neoformans cells were added inmedia. All experiments used C. neoformans strain 24067 (AmericanType Tissue Collection, Rockville, MD). Monoclonal antibody(MAb) 18B7 is a murine immunoglobulin G1 (IgG1) that binds theC. neoformans capsular component glucuronoxylomannan and hasbeen extensively characterized and used in a human clinicaltrial (3, 5). MAb 18B7 was added to the C. neoformans suspensionin variable amounts, and the macrophage-yeast suspension wasincubated for 2 h at 37°C. In this experimental system,the macrophages are immobilized at the bottom by virtue of theircapacity to grow as an adherent monolayer. The C. neoformansis added in suspension, the yeast settle rapidly by gravity,and phagocytosis begins within minutes. Afterwards, the monolayerwas washed three times with phosphate-buffered saline, fixedwith cold methanol, and stained with Giemsa (Sigma-Aldrich,St. Louis, MO). The phagocytic index was determined by countingingested yeast with an inverted microscope at a magnificationof x100. Under these conditions, it is very easy to distinguishattached from ingested yeast cells, since the latter residein discernible intracellular vacuoles. The phagocytic indexunder the various conditions was determined by counting internalizedyeast cells per 100 macrophages in various fields (4 fieldswere counted). In our system and conditions, antibody-mediatedopsonization results in almost complete ingestion, such thatthe overwhelming majority of yeast cells are inside macrophages.In prior studies, we have validated our ability to distinguishbetween attached and ingested yeast cells using fluorescencedyes that stain only attached yeast cells. Antibody-mediatedopsonization in this system is highly efficient and leads toingestion. In all conditions, more than 90% of the attachedyeast cells internalized irrespective of antibody concentration.

In some experiments, yeast cells were incubated with 18B7 foran hour or an hour and a half to obtain a near-saturation occupancyof the yeast capsule before addition of the antibody-coatedcells to the macrophage monolayer. In some experiments, we blockedthe complement receptors by adding antibody to CD18, CD11b,and CD11c (BD Biosciences Pharmigen, San Jose, CA), which areexpressed by J774.16 cells (14). For these experiments, theabove protocol was modified by incubating the macrophage monolayerwith blocking antibodies (50 µg/ml) for 1 h prior to thephagocytosis experiment. After washing and addition of the C.neoformans suspension, MAb 18B7 blocking was maintained by includingthe blocking antibodies (10 µg/ml) in the macrophage-yeastsuspension. It is noteworthy that this protocol was arrivedat after modeling results revealed that incubation of J774 cellswith 10 µg/ml of blocking antibody was not sufficientto block the complement receptors.

Mathematical modeling. Our mathematical model of phagocytosis is based on the differentialequation

Formula 1 (1)
which describesthe rate of change of the total number of ingested microbes,P_I, as a function of the population of free microbes, P_F, andthe rate of phagocytosis, r_T. The detailed mathematical analysisof processes involved in phagocytosis is given in the supplementalmaterial, where we construct a mathematical model of this process.The main variables in the model are listed and described inTable 1. The main goal of this paper is to model the functionof r_T, which we call the efficacy of phagocytosis and whichdepends on the amount of antibody bound to the C. neoformanscapsule and the number of receptors available.

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TABLE 1. Main variables in the model

We built our mathematical model of the phagocytic efficacy ontwo main assumptions. The first assumption is that phagocyticefficacy increases as the number of binding sites on the C.neoformans capsule for the appropriate type of receptors increases,and the second is that there is a maximum efficacy of phagocytosisfor a given number of available receptors. Both of these assumptionswere motivated and confirmed by the experimental results.

The simplest, and naturally the first, model to consider isa model based on a linear increase in the phagocytic efficacywith the number of sites, s, on the C. neoformans capsule availableto bind the appropriate receptors on the macrophage surface.This model is described by the differential equation Formula 1 and is therefore based on the assumptionthat the rate at which the phagocytic efficacy increases doesnot depend on the amount of antibody already bound to the C.neoformans capsule. Moreover, the solution of this model, assumingr_T₁(0) = 0, is r_T₁ = k₁s and is proportional to the rate atwhich the antibody is binding to a given (constant) number ofreceptors. Combining this model with the assumption that thereis a maximum phagocytic efficacy led to our first mathematicalmodel of phagocytic efficacy:

Formula 2 (2)
Theconstant k₁ is the initial growth rate of phagocytic efficacy,and the term (R_M₁ – r_T₁) represents the reduction in therate at which the efficacy of phagocytosis increases as it approachesthe maximum phagocytic efficacy, R_M₁, for the given conditions.Both k₁ and R_M₁ depend on the number of available receptorsand may also depend on the health of macrophages and vary slightlydepending on the experimental conditions.

Our experimental results in the case of fully blocked complementreceptors strongly supported this model. The number of bindingsites for Fc receptors, s, is equal to the amount of antibodybound to the C. neoformans capsule A_P, and therefore, equation2 leads to the differential equation

Formula 3 (3)
whose solution is

Formula 4 (4)
The data of the phagocytic efficacy versusthe amount of antibody bound to the C. neoformans capsule indicatethat the same type of a model

Formula 5 (5)
doesnot fully account for the increase in the phagocytic index whenthe complement receptors are involved. Consequently, to explainthe efficacy of phagocytosis when the complement receptors areinvolved, we consider a mathematical model where the increasein the phagocytic efficacy is a linear function of the numberof the complement receptor binding sites s on the C. neoformanscapsule. The differential equation applicable in this case is

Formula 6 (6)
where s is the number of complementreceptor binding sites on the C. neoformans capsule. This mathematicalmodel indicates a possibility of cooperation among receptorsat high density of antibody bound to C. neoformans capsule.The general solution of the above differential equation is

Formula 7 (7)
where K is a constant. We combinedthe two above models (equations 5 and 7) and obtained a mathematicalmodel that incorporates both effects: the constant increasein phagocytic efficacy at lower concentrations and the morerapid increase in the efficacy of phagocytosis at a higher densityof antibody bound to C. neoformans capsule. We assumed thatequation 7 describes the rate of increase of the maximum phagocyticefficacy due to cooperation between receptors. The constantK was determined from the assumption that, when there is nocooperation (s = 0), the maximum phagocytic efficacy is r_T₃= R_M₂. We therefore obtained Formula 7 . We replaced the constant maximum phagocytic efficacy R_M₂ inequation 5 with r_T₃ and therefore modeled phagocytosis throughcomplement receptors by the following equation

Formula 8 (8)
where . Our experimental results also indicated that, whenboth types of receptors are available, the phagocytosis throughFc and phagocytosis through complement receptors are not independentprocesses, that is, the cumulative result is not simply thesum of their respective contributions. Our model is set up sothat this effect can be easily incorporated. A natural extensionof our model for phagocytosis through complement receptors isthe following equation:

Formula 9 (9)
wheres is the number of complement receptor binding sites on theC. neoformans capsule. Note that we introduced R_M₄ and k₄ inthis model instead of R_M₃ and k₃. While R_M₃ and k₃ formallydescribed the effect of cooperation among complement receptors,R_M₄ and k₄ account for the effect of cooperation among complementreceptors as well as complement and Fc receptors. We assumedthat the number of complement receptor binding sites on theC. neoformans capsule increases quadratically with the amountof antibody bound to the capsule, reaches a maximum, and thendecreases with binding of the additional antibody. The assumptionof the quadratic increase is justified by the experimental results,which show that the total increase in phagocytic efficacy ismore rapid than the linear increase in the number of bindingsites s in equation 9 would imply. We were primarily interestedin modeling the phagocytic efficacy in the range of concentrationsof free antibody where the number of complement receptor bindingsites on the C. neoformans capsule increases. In that range,our model leads to the following dependence of the phagocyticefficacy, r_T, of phagocytosis on the amount of antibody boundto C. neoformans capsule:

Formula 10 (10)

Simulations of the model. We used MatLab 7.4 (The MathWorks, Natick, MA) in simulationsof our model.

RESULTS

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Results

Dependence of phagocytosis on antibody concentration and time. The efficacy of phagocytosis was studied as a function of antibodyconcentration (Fig. 1) and time (Fig. 2) in the presence andabsence of complement receptor blockade. Although this systemdoes not include complement opsonins, phagocytosis can occurthrough the complement receptor as a result of an antibody-mediatedchange in the fungal polysaccharide capsule that allows interactionof polysaccharide with the complement receptor. Hence, in theabsence of complement receptor blockage, phagocytosis occursthrough both Fc and complement receptors, whereas in the presenceof blockage, phagocytosis occurs only through the Fc receptor.In the absence of complement receptor blockage, the number ofingested microbes increased as a function of antibody concentrationuntil 250 µg/ml but sharply decreased thereafter (Fig.2A). At most antibody concentrations studied, phagocytosis isessentially completed or considerably slowed down after 2 h.

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FIG. 1. Experimental counts of the number of phagocytized microbes (per 100 macrophages) as a function of antibody concentration (A) and in the setting of blocked complement (C3R) receptors (B). Error bars represent standard deviations.

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FIG. 2. Experimental counts of the number of phagocytized microbes (per 100 macrophages) as a function of time for antibody concentrations of 10 and 100 µg/ml (A) and 0, 250, 500, and 100 µg/ml (B). Error bars represent standard deviations.

Mathematical analysis of antibody binding to C. neoformans and Fc receptors. C. neoformans capsule has 1.1 x 10⁶ binding sites (4), whichimplies that the 1.5 x 10⁵ microbes per well used in our experimentscan bind 0.04 µg of IgG. It is known that each macrophagecell has approximately 10⁵ binding sites (see references 7 and18), and therefore, 0.75 x 10⁵ macrophages would bind approximately0.004 µg IgG (for 2 x 10⁵ binding sites per macrophageas given in reference 7). This implies that in our experimentsthe amount of free antibody is well above the total (Cryptococcusneoformans capsule and macrophage together) capacity for bindingof antibody. In such a case, standard biochemical equationsimply that the amount, A_M, of the antibody bound to the Fc receptorsis given by the exponential function

Formula 11 (11)
L_M is the total capacity (the number ofreceptors) of Fc receptors for binding the antibody, K_M is theaffinity constant, and D_FM is the corresponding dissociationrate constant. c₀ is the initial concentration of free antibody.A summary of the variables and parameters as well as their valuesand units are given in Tables 2 and 3. A full derivation anda discussion of these equations is given in the supplementalmaterial.

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TABLE 2. Antibody binding variables and parameters

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TABLE 3. Affinity and rate constants for antibody binding

Similarly, we determined that the amount of the antibody, A_P,bound to the Cryptococcus neoformans capsule is given by

Formula 12 (12)
L_P is the total capacity ofmicrobes for binding the antibody (number of binding sites inthe capsule), K_P is the affinity constant, and D_FP is the correspondingdissociation rate constant.

From the above equations, we can calculate that the half-timefor antibody-macrophage binding is Formula 12 , and 90% of Fc receptors are occupied after . This implies that 90% of Fc receptorswould be occupied in less than 1 min at concentrations of 100,250, and 500 µg/ml of free antibody, assuming that K_M= 2 x 10⁷ M^–¹. At 10 µg/ml, approximately 80% ofthe total number of Fc receptors are occupied in a long run,and saturation is reached within the first 5 min. The predictionsfor the amount of free antibody bound to the C. neoformans capsuleare depicted in Fig. 3 and indicate that this process will reachsaturation within 2 h.

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FIG. 3. Graphs of the antibody binding to the microbe capsule: the amount bound after 2 h as a function of the initial concentration (A) and the dynamics of binding (B).

The above binding dynamics are consistent with our experimentaldata on the time course of phagocytosis at low concentrations(Fig. 2A) as well as at high concentrations. There was no increasein the number of ingested microbes after 1 h with high initialconcentrations of free antibody (Fig. 2B). However, the experimentaldata also revealed a progressive increase in phagocytosis after1 h for assays using an initial antibody concentration of 250µg/ml. This was unexpected because, at this concentration,our calculations showed that most of the Fc receptors on themacrophage surface and antibody binding sites in the capsuleare occupied (saturated) at that time.

The increase in the phagocytic index at antibody concentrationsof 100 and 250 µg/ml (Fig. 1A) was also rather surprising,considering that most Fc receptors are occupied very rapidlyand that the number of sites on C. neoformans available forbinding of antibody already bound to Fc receptors is reducedwith higher concentrations. This was unexpected because, atthis concentration, our calculations showed that most of theFc receptors on the macrophage surface and antibody bindingsites in the capsule are occupied (saturated).

It is noteworthy that these results indicate that there is noreplication of ingested yeast. That result is consistent withthe fact that intracellular yeast replication occurs severalhours after ingestion (17), while the experiments studied andmodeled here were limited to 2 h.

The above experimental data and the analysis of the bindingprocess indicated that the dynamics of binding in this experimentalsetup had a major influence on the outcome of these experiments.We hypothesized that phagocytosis at lower concentrations ofantibody was facilitated by both Fc and complement receptors,that at higher concentrations the contribution of the complementreceptors would be more significant than at low concentrations,and that phagocytosis through Fc receptors is negligible sincefree antibody would block most of them very quickly. Consequently,we proposed a mathematical description of the efficacy of phagocytosisand designed several new experiments to analyze and quantifyits dependence on the amount of antibody and further developthe mathematical formalism based on the experimental resultsobtained.

We performed three additional sets of experiments, each setincluding two conditions, one with and the other without blockingcomplement receptors. In all three sets, C. neoformans was incubatedwith IgG1 for at least 1 h to obtain near-saturation occupancyof the binding sites on the C. neoformans capsule. This providedus with a set of data where the amount of antibody bound tothe C. neoformans capsule did not change significantly overthe 2 h during which the phagocytosis experiments were conductedand was therefore suitable for modeling phagocytic efficacyand validating our models and assumptions.

Experiments designed to investigate phagocytic efficacy. In the first set of experiments, C. neoformans cells were incubatedwith antibody for 1 h, separated from remaining free antibodypresent in the solution, and added to the macrophage monolayerin the fresh medium. This experimental setup eliminated thepossibility of blocking of Fc receptors by excess free antibody.In this set, we conducted experiments without blocking complementreceptors as well as experiments with (partial) blocking ofcomplement receptors. The experimental results are shown inFig. 4. We blocked the complement receptor using antibodiesto the complement receptor subunit components CD11b, CD11c,and CD18. These antibodies do not affect the Fc receptor butinhibit phagocytosis through the complement receptor. The experimentalmethodology used had been developed in a prior study that exploredmechanisms by which IgM promoted phagocytosis in the absenceof complement (14). Initially, we applied those conditions tothe system studied, but the inability of our modeling equationsto adequately describe the dependence of the phagocytic indexon the antibody concentration suggested that this protocol,which had been devised to block IgM-mediated phagocytosis throughthe complement receptor, was inadequate for fully inhibitingIgG-mediated phagocytosis through that receptor. Hence, theprotocol was modified to increase the amount of antibody inthe initial blocking step and to maintain blocking by addingantibody to the complement receptor to the phagocytosis conditions.Phagocytosis data generated with the enhanced blocking conditionswere well simulated by our proposed model. Hence, the modelproposed here was predictive of incomplete blocking and generateda hypothesis that could be tested by altering the conditionsof the experiment.

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FIG. 4. Experimental counts of the number of phagocytized microbes, P_I (per 100 macrophages), as a function of the initial antibody concentration c₀. IgG1 was incubated with C. neoformans cells for 1 h to obtain near-saturation occupancy of the binding sites on the C. neoformans capsule. C. neoformans cells were then separated from antibody and added to a macrophage monolayer in the fresh medium (see Materials and Methods). The two sets of results represent experiments without and with blocking of complement receptors. The results of experiments with blocking represented in panel A were obtained with partial blocking of complement receptors, and those in panel B were obtained with complement receptors fully blocked. Error bars represent standard deviations.

In the second set of experiments, C. neoformans cells were againincubated with IgG1 for 1 h to obtain near-saturation occupancyof the binding sites on the C. neoformans capsule. C. neoformanscells were then separated from remaining free antibody presentin the solution and added to the macrophage monolayer in thefresh medium. We first conducted a control experiment withoutblocking of complement receptors and under the same experimentalconditions as the experiment without blocking of complementreceptors in the first set. The experiment with blocking ofcomplement receptors was also conducted under the same experimentalconditions as the corresponding experiment in the first set,except for the enhanced blocking of complement receptors. Forthese experiments, the protocol of the experiment with blockingwas modified by incubating the macrophage monolayer with (complement)blocking antibodies (50 µg/ml) for 1 h prior to the phagocytosisexperiment. After washing and addition of the C. neoformanssuspension and MAb 18B7, complement receptor blocking was maintainedby including the blocking antibodies (10 µg/ml) in themacrophage-yeast suspension. The experimental results are shownin Fig. 4B. The experimental results show a considerable reductionin the phagocytic index compared to the experiment with blockingin the first set and, in particular, almost no increase in thephagocytic index with increasing concentrations of free antibodyabove 10 µg/ml. In our simulations, we assume that complementreceptors in this experiment were fully blocked.

In the third set of experiments, we incubated antibody withC. neoformans for an hour and a half. The mixture of antibodyand C. neoformans was added to macrophages, and phagocytizedC. neoformans cells were counted after 2 h. In this set of experiments,we again examined conditions with and without blocking of complementreceptors. The experiment with blocking of complement receptorswas done under the same conditions as the experiment withoutblocking except for the (partial) blocking of complement receptors(by adding 10 µg/ml complement blocking antibodies, asdiscussed above). The experimental results are shown in Fig.5. Our model reveals that a slight, but noticeable, drop inthe number of ingested microbes observed in experimental resultsat 10 µg/ml is a result of blocking Fc receptors by excessfree antibody. A summary of the experimental conditions in theabove described three sets of experiments is given in Table4.

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FIG. 5. Experimental counts of the number of phagocytized microbes, P_I (per 100 macrophages), as a function of the initial antibody concentration, c₀. IgG1 was incubated with C. neoformans cells for an hour and a half to obtain near-saturation occupancy of the binding sites on the C. neoformans capsule. C. neoformans (in the solution) was then added to the macrophage monolayer (see Materials and Methods). The two sets of results represent experiments without and with (partial) blocking of complement (C3R) receptors. Error bars represent standard deviations.

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TABLE 4. Summary of experiments designed to model efficacy of phagocytosis and corresponding simulations

Modeling the efficacy of phagocytosis and simulations of the model. We used our proposed mathematical model and the above-describedexperimental results to investigate the dependence of the phagocyticefficacy on the antibody bound to the capsule and to generatesimulations that could be compared to the experimental data.The main variables and parameters of the model are listed inTables 1, 2, and 3, and a detailed mathematical derivation isgiven in the supplemental material.

In our experiments, C. neoformans was incubated with IgG1 forat least 1 h to obtain near-saturation occupancy of the bindingsites on the C. neoformans capsule. This provided us with aset of data where the amount of antibody bound to the C. neoformanscapsule did not change significantly over the 2 h during whichthe phagocytic efficacy was observed. In addition to that, sincethe number of ingested microbes per macrophage is small comparedto the number of microbes a macrophage can ingest, we can alsoassume that the number of receptors does not change significantlyin our first two sets of experiments (12). Consequently, wecan consider that the phagocytic efficacy, r_T, does not changeduring the time of the experiments (120 min) and solve the mainequation in our model (equation 1) analytically. Therefore,after 120 min, the number of ingested microbes (per 100 macrophages)is given by

Formula 13 (13)
Inour simulations of the model, we will assume that the initialpopulation of microbes is ₀= 200, which corresponds to the population of microbes (200)per 100 macrophages in our experiments, therefore normalizingthe number of cells involved with respect to the number of macrophages.

We were primarily interested in modeling the phagocytic efficacyin the range of concentrations of free antibody where the numberof complement receptor binding sites on C. neoformans capsuleincreases. It that range our model, mathematically derived inMaterials and Methods, leads to the following expression ofthe phagocytic efficacy, r_T, of phagocytosis

Formula 14 (14)
where A_P/L_P is the fractionof antibody binding sites on C. neoformans capsule that areoccupied. The units for r_T, R_M₁, and R_M₂ are min^–1, andthe parameters k₁, k₂, k₄, and R_M₄ are dimensionless parameters.Descriptions, values, and units of A_P and L_P are given in Table2.

This model is based on the assumption that there is a maximumphagocytic efficacy, R_M₁, for Fc as well as for complement receptors(R_M₂) but that high concentrations of antibody bound to C. neoformanscapsule and the presence of complement receptors provide anadditional increase in both the maximum phagocytic efficacyand the rate at which this maximum is reached. The first twoterms describe the increase in phagocytic efficacy due to Fc[ Formula 14 ] and complement receptors [] when there is no cooperation among receptors. The rates k₁ and k₂ quantify the rates at whichthe efficacy of phagocytosis increases with the increasing amountof antibody bound the C. neoformans capsule. The factor accounts for the increase in thephagocytic efficacy due to cooperation among different receptors.

We assumed that a maximum number of complement receptor bindingsites is reached for a certain occupancy of C. neoformans capsuleand that, after that point, the number of sites decreases quadraticallywith the increasing amount of the antibody bound to the capsule.Our model provides an estimate for the fraction of antibodybinding sites on a C. neoformans capsule occupied that resultsin the maximum phagocytic efficacy of phagocytosis through complementreceptors: data presented in Fig. 6 (computed from the experimentalresults presented in Fig. 4 and 5) indicate that the maximumnumber of complement receptor binding sites on C. neoformanscapsule is reached when between 70 and 80% of the sites areoccupied. However, we do not have enough data to set up a simplemodel for the events that occur after the maximum efficacy isreached.

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FIG. 6. Plots of efficacy of phagocytosis computed from the experimental data. We computed the efficacy using the formula r_T = –ln(1 – P_I/200)/120 and experimental data from the three sets of experiments presented in Fig. 4 and 5. The efficacy of phagocytosis is plotted as a function of the initial concentration, c₀, of antibody (A) and as a function of the fraction (A_P/L_P) of the antibody binding sites on the C. neoformans capsule occupied by IgG (B). A summary of experimental conditions in given in Table 4.

We therefore use equation 14 to describe the increase in phagocyticefficacy involving both Fc and complement receptors and in therange in which the number of complement receptor binding siteson the C. neoformans capsule increases. We provide an approximatemodel based on equation 9 and assuming a quadratic decreasein the number of complement receptor binding sites on the C.neoformans capsule after the maximum number is reached. Thisapproximation fits well to the data. The experimental resultsand simulations are presented in Fig. 7, 8, and 9.

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FIG. 7. Comparison of the model simulations and experimental results presented in Fig. 4A. Panels A and B present the same data and simulations but using different scales. The same legend applies to both panels. Error bars represent standard deviations. Summaries of experimental conditions and simulation parameters are given in Tables 4 and 5.

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FIG. 8. Comparison of the model simulations and experimental results presented in Fig. 4B. Panels A and B present the same data and simulations but using different scales. The same legend applies to both panels. Error bars represent standard deviations. Summaries of experimental conditions and simulation parameters are given in Tables 4 and 5.

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FIG. 9. Comparison of the model simulations and experimental results presented in Fig. 5. Panels A and B present the same data and simulations but using different scales. The same legend applies to both panels. Error bars represent standard deviations. Summaries of experimental conditions and simulation parameters are given in Tables 4 and 5.

Simulation parameters. The data for r_T computed from the experimental results and presentedin Fig. 6 determine the maximum efficacy of phagocytosis aswell as the appropriate rates of increase. We first determinedthe parameters R_M₁ and k₁ by fitting the model to the data pointsdepicted in Fig. 6 (experiment IIB: experiment with [full] blockingin our second set of experiments). The model and experimentalresults for phagocytosis through Fc receptors and with fullcomplement receptors completely blocked are presented in Fig.8. The parameters R_M₂, R_M₄, k₂, and k₄ were then determinedby fitting the model to the data points computed from the experimentalresults (Fig. 4B) for phagocytosis without blocking complementreceptors (in the same set) and are depicted in Fig. 6 (experimentIIA). The model and experimental results for phagocytosis throughFc receptors and without complement receptors blocking are alsopresented in Fig. 8.

Simulations of the model for the experimental conditions inour first set of experiments presented in Fig. 7 were obtainedby reducing the appropriate parameters in our model for thephagocytosis through complement receptors, as indicated in Tables4 and 5. We note that the outcomes of the experiments withoutblocking, which were conducted under the same experimental conditions,were slightly different. We attributed this difference to smallvariations in the experimental procedure; for example, stateof activation of macrophages and different media lots, etc.,and accounted for those variations first by adjusting the parameters(k₂) of the model to fit the experimental results of the controlexperiment. A similar adjustment was done when fitting the parametersto simulate the results of the experiments in our third set,where we reduced the total maximum efficacy of phagocytosisby a factor of 0.9. Results (not shown) of earlier experimentsconducted under the same conditions justify this adjustmentand its attribution to the experiment-to-experiment variation.

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TABLE 5. Simulation parameters

Simulations of the results of the experiments in our third set,conducted without separating excess free antibody from the suspensioncontaining microbes, are presented in Fig. 9. The model parametersin this case were obtained by introducing the dependence ofthe parameters R_M₁ and R_M₄ on the initial amount of free antibody.While the assumption that the number of receptors does not significantlychange in the course of our experiments is reasonable in ourfirst two sets of experiments, it does not apply to the thirdset, since our computations showed that a large fraction ofFc receptors were blocked by excess free antibody. Since theconditions in our experiments were uniform and controlled, weknow that most yeast cells reach the macrophage layer withinminutes. Moreover, our computations indicated that most Fc receptorsare blocked by excess antibody also within minutes at all initialconcentrations of free antibody used in our experiments exceptthe lowest one. Therefore, we assumed that the phagocytic efficacyin our experiment was mostly influenced by the number of Fcreceptors that were available at the moment when the yeast cellsreached the macrophage layer. Consequently, when applying ourmodel to the experimental results of our third set of experiments,we accounted for this reduction in the number of Fc receptorsby making an appropriate adjustment to phagocytic efficacy.We therefore introduced a decrease in the maximum phagocyticefficacy through Fc receptor R_M₁ by a factor Formula 14 , where c₀ is in µg/ml. This decrease correspondsto the increase in blocking of Fc receptors as the concentrationof free antibody is increasing. We also reduce R_M₄ by a factorwhich characterizes the contribution of Fc receptors to theincrease in phagocytic efficacy due to cooperation among thereceptors.

This is a very rough approximation, but it gives a surprisinglygood fit to the experimental data. The rationale for such anestimate is that the fraction of the Fc receptors that willbind free antibody increases exponentially as a function ofthe initial concentration and that the phagocytic efficacy isconsiderably reduced at the point when a large fraction of Fcreceptors are occupied very early in the process.

The summary of experimental conditions in the experiments modeledand the corresponding adjustments of the parameters in the simulationsis given in the Table 4. The values of model parameters usedin simulations are given in Table 5.

DISCUSSION

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Discussion

Experimental studies of dependence of the phagocytic index onIgG concentration revealed a peculiar aspect of this processthat was difficult to explain: while the phagocytic index increasedsteadily in the 10- to 100-µg/ml IgG range, at antibodyconcentrations greater than 250 µg/ml, there was a consistentnet reduction in phagocytic index. This phenomenon is calledthe prozone-like effect, and it is noteworthy that a similartype of nonlinear dose dependence is observed in the experimentswith the survival rate of mice subject to passive immunizationwhere the high doses of antibody are associated with reducedefficacy and protection (13). Moreover, the higher concentrationsused in our experiments and studied in our mathematical analysisare comparable to those found when antibody is administeredpassively or therapeutically. The lower concentrations of antibodyused in our studies are comparable to those found after an immuneresponse or vaccination.

To understand the mechanisms of phagocytosis and, in particular,those responsible for the above-described increase and subsequentdrop in phagocytic index, we turned to mathematical modeling,which allows quantitative analysis of causal relationships andthe testing of assumptions. There are several mathematical modelsof phagocytosis in the literature (11, 16), but none has consideredthe mechanism of attachment of microbes to macrophages and thedependence of the processes involved in both attachment andingestion on the amount of antibody and the number of availablereceptors. We described the phenomenon of IgG-mediated phagocytosisby a system of seven differential equations. We started withvery general assumptions that a biological process of this typewould satisfy and constructed a model that reproduced the experimentalresults very well.

The results of our mathematical analysis of the dependence ofphagocytic index on the concentration of antibody in our initialexperiments brought to light a perplexing phenomenon: the concentrationswhere the increase in the phagocytic index was observed in ourinitial experiments were considerably higher than the bindingcapacity of both macrophages and microbes, and there was a highlikelihood that both antigen binding sites in the cryptococcalcapsule and Fc receptors were saturated. This suggested additionalexperiments that provided insights into these effects and enabledus to construct a mathematical model that reproduced the experimentaldata.

More precisely, our calculations indicated that, in our initialset of experiments, Fc receptors would be rapidly saturatedat concentrations higher than 10 µg/ml. That is, we obtainedfrom equation 11 that, at concentrations of 100, 250, and 500µg/ml of free antibody, half of the Fc receptors are occupiedwithin a minute and 90% of them are occupied in less then 5min. As we already pointed out in our initial experiments, weobserved an increase in phagocytic index through the range ofconcentration up to 250 µg/ml of free antibody.

Our mathematical analysis indicated that the conditions in theexperiments whose outcomes we analyzed were quite extreme: theconcentrations of free antibody were much higher than the bindingcapacity of not only macrophages but also microbes. The factthat the range of concentrations studied is well above the bindingcapacity of microbes and macrophages and yet we still observedan increase in the phagocytic index over that range put an emphasison understanding the dynamics of phagocytosis and, in particular,the contribution of phagocytosis through complement receptorsto the phagocytic index. Our analysis of binding of antibodyto the C. neoformans capsule predicted that the timing of mixingthe antibody with microbes and macrophages was essential forthe outcomes of our experiments.

More precisely, the analysis indicated that the time necessaryfor the binding sites on C. neoformans capsule to reach saturationwas comparable to the time during which the phagocytosis wastaking place and was observed (e.g., 2 h). Consequently, thisindicated that the amount of antibody bound to C. neoformanscapsule changed considerably throughout the duration of ourexperiments. To understand and model the dependence of phagocyticindex on the amount of antibody bound to C. neoformans capsule,we designed and conducted a new set of experiments where theamount of antibody would not change significantly during thetime when phagocytosis is in progress and used those resultsto construct our mathematical model.

In particular, we introduced and studied the efficacy of phagocytosis,which we define as the fraction of the free microbes that isingested as a function of the amount of antibody bound to C.neoformans capsule and the number of receptors available (seereference 1). We discussed and tested mathematical models forthis function and constructed a mathematical model for phagocyticefficacy through Fc and complement receptors separately as wellas for phagocytic efficacy when both types of receptors areavailable.

By studying the reduction in phagocytic index that resultedfrom blocking complement receptors by antibodies to CD11 andCD18, we distinguished among the contributions from the twodifferent types of receptors: Fc receptors and complement receptors.In fact, our modeling simulations predicted that the blockingprotocol used in earlier studies (13, 14) was inadequate tofully inhibit phagocytosis through the complement receptor athigher antibody concentrations. Consequently, the protocol forblocking complement receptors was modified to use higher amountsof blocking antibody, leading to improved concordance betweenexperimental results and mathematical predictions. The abilityof the mathematical model to discriminate between receptor bindingand to yield insight on the relative contribution of the tworeceptors to phagocytosis provides confidence in the relevanceand correctness of the proposed equations.

We considered IgG concentration effects on both the microbeand the macrophage. Our model predicts that more free antibodyresults in more rapid binding to the yeast capsule, producinga higher saturation level and therefore rapidly enhancing phagocytosisthrough Fc receptors. However, too much antibody rapidly reducesthe number of available Fc receptors. Phagocytosis through complementreceptors rapidly compensates for this effect, and after a slightbut noticeable drop in the phagocytic efficacy (at the concentrationof free antibody, around 10 µg/ml in our experiments),phagocytic index continues to increase. However, eventuallythere is too much antibody bound to the capsule, which considerablyreduces phagocytosis through complement receptors, possiblythrough steric effects and/or additional changes to the capsule.Additional experimental information that could contribute tothe refinement of the model includes more quantitative dataon the involvement of different types of receptors, the extentto which there is cooperation between them, and a better understandingof the interaction between antibody-modified capsular polysaccharideand the complement receptors. Particularly interesting wouldbe experiments with different biological systems whereby antibody-mediatedphagocytosis occurs through more than one cellular receptor.

Given that antibody-mediated phagocytosis through the complementreceptor has recently been shown to be associated with protection(19), interference with this mechanism by high antibody concentrationsmay contribute to the decline in efficacy observed in passiveprotection studies with large antibody doses (13, 15). We expectthat, in all conditions, the efficacy of phagocytosis will involvea subtle balance between enough free antibody available to bindto the yeast capsule and yet not so much as to saturate thecapsule and Fc receptors.

We established that with higher initial concentrations of freeantibody the affinity constant of Fc receptors for binding offree antibody is an essential parameter of the model and mightinfluence how the phagocytic index depends on the concentrationsof free antibody. This in turn implies that modeling the efficacyof phagocytosis will strongly depend on the type of the phagocyticcell and the types, affinities, and numbers of Fc receptorsinvolved. Furthermore, the model predicts that the magnitudeof the affinity and dissociation constants of the antibody frombinding sites on the microbe is a major contributor to the phagocyticefficacy, especially for the phagocytosis through the complementreceptors.

In summary, we propose a mathematical model for the phagocytosisof C. neoformans that can simulate and explain experimentalresults obtained through a range of antibody concentrations.The ability of our model to predict the experimental outcomeon the basis of the assumed parameters provides confidence thatthe major variables and parameters in this system are well understood.The model proposed successfully predicts the dependence of thephagocytic index on the antibody concentration and explainsthe paradoxical reduction in phagocytic index at high antibodyconcentrations. Hence, our model provides an explanation forthe processes involved, establishes the relative importanceof those variables and parameters, and provides a starting pointfor incorporating additional complexity. Although the equationspresented were derived to explain the experimental data forC. neoformans, they could serve as a basis for future mathematicalmodeling of phagocytosis of other microbes, especially thosesystems in which opsonization and/or cooperation among differenttypes of receptors plays a significant role. The developmentof a more accurate model for C. neoformans phagocytosis wouldrequire additional information that is not currently available,including the rates of microbe-macrophage attachment as a functionof antibody concentration, macrophage receptor density, andmicrobial binding sites. In this regard, the mathematical modelinghas identified gaps in the current knowledge of C. neoformansphagocytosis and calls for further studies, experimental andtheoretical, of the mechanisms of attachment and ingestion ofthis and other microbes to macrophages, the signaling pathwaysinvolved, and the potential for cooperation between differenttypes of opsonic receptors.

ACKNOWLEDGMENTS

A.C. is supported by NIH grants AI033142, AI033774, and HL059842.

N.M. thanks W. Weckesser for many valuable discussions. We alsothank The Mathematical Biosciences Institute at Ohio State Universityfor organizing the interdisciplinary workshop on Host-PathogenInteractions in Disease Models in June 2004 where we began ourcollaboration. We are also grateful to the reviewers for theirvaluable comments.

FOOTNOTES

* Corresponding author. Mailing address: Albert Einstein College of Medicine, 1300 Morris Park Ave., Bronx, NY 10461. Phone: (718) 430-3665. Fax: (718) 430-8968. E-mail: casadeva{at}aecom.yu.edu.

Published ahead of print on 5 February 2007.

Editor: J. L. Flynn

Supplemental material for this article may be found at http://iai.asm.org/.

REFERENCES

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