CD4+ Target Cell Availability Determines the Dynamics of Immune Escape and Reversion In Vivo

Infections with human immunodeficiency virus (HIV) and the closelyrelated monkey viruses simian-human immunodeficiency virus (SHIV)and simian immunodeficiency virus (SIV) are characterized byprogressive waves of immune responses, followed by viral mutationand "immune escape." However, escape mutation usually leadsto lower replicative fitness, and in the absence of immune pressure,an escape mutant (EM) virus "reverts" to the wild-type phenotype.Analysis of the dynamics of immune escape and reversion hassuggested it is a mechanism for identifying the immunogens bestcapable of controlling viremia. We have analyzed and modeleddata of the dynamics of wild-type (WT) and EM viruses duringSHIV infection of macaques. Modeling suggests that the dynamicsof reversion and immune escape should be determined by the availabilityof target cells for infection. Consistent with this suggestion,we find that the rate of reversion of cytotoxic T-lymphocyte(CTL) EM virus strongly correlates with the number of CD4⁺ Tcells available for infection. This phenomenon also affectsthe rate of immune escape, since this rate is determined bythe balance of CTL killing and the WT fitness advantage. Thisanalysis predicts that the optimal timing for the selectionof immune escape variants will be immediately after the peakof viremia and that the development of escape variants at latertimes will lead to slower selection. This has important implicationsfor comparative studies of immune escape and reversion in differentinfections and for identifying epitopes with high fitness costfor use as vaccine targets.

INTRODUCTION

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INTRODUCTION

Human immunodeficiency virus (HIV) has a high mutation rate,leading to the rapid accumulation of viral variants during infection.The immune response exerts a selective pressure on the virus,leading to the outgrowth of viral variants that have a reducedor no immune recognition. The selection of an escape mutant(EM) virus has been observed for humoral (34, 36) and CD4⁺ (19)and CD8⁺ (9, 32) T-cell recognition of the virus. The sequentialescape from immune response contributes to the clinical progressionof the infection over time (18), and at a population level,an increased number of escape mutations is associated with amore advanced disease stage (5). However, the viral mutationsthat lead to the loss of immune recognition may also impairthe viral replicative capacity, the "fitness cost" of an escapemutation. In the absence of immune pressure, the advantage ofthe EM virus (i.e., reduced immune recognition) is lost, andthe reduced replicative capacity of EM virus compared to thatof the wild-type (WT) virus leads to a reversion from the EMto the WT virus. This has been observed in vitro (15, 27), aswell as in both humans and macaques who lack the major histocompatibilitycomplex (MHC) molecules required for the recognition of theWT epitope (10, 14, 22). A phase of transient reversion followedby reescape has also been observed early after infection inindividuals bearing the required MHC, as at least some growthof the WT virus is required to induce an immune response tothe epitope (1, 10). This dynamic of immune escape and reversionwithin the infected individual leads to the transmission andpersistence of both WT and EM virus in the human population(28).

The ability of HIV to escape immune recognition presents a significantproblem for vaccine design, as vaccine efficacy may be compromisedby the rapid selection of EM virus. The ideal vaccine may beone that targets immunogenic but highly conserved regions ofthe virus, where immune escape is not possible. However, inthe absence of such invariant epitopes, the ideal vaccine targetsmay be multiple epitopes where immune escape leads to a veryhigh fitness cost to the virus (17, 21). Thus, immune escape,if it occurs, will lead to a crippled virus with reduced pathogenicpotential. One method for estimating the fitness cost of escapemutation is to measure the rate of reversion from EM to WT duringinfection (11, 21). Thus, EM virus that reverts extremely rapidlyis assumed to do so because of significantly impaired replicativecapacity compared to WT virus. An EM virus that reverts slowlyis assumed to have little or no fitness cost. If an EM virushas no fitness cost relative to that of the wild type, it shouldeventually spread within the host population to become the consensussequence.

Studies of the rate of immune escape suggest that escape canbe completed extremely rapidly in acute infection, and may besignificantly slower during chronic infection (2, 24). Thisappears due most likely to the peak of immune response observedin the first few weeks after infection. The rate of reversionfrom EM to WT virus also appears to be rapid if it occurs earlyduring infection but slower if it occurs later in disease (24).Thus, the time at which the competition between EM and WT virusoccurs appears to be an important determinant of the rate ofselection and is an important consideration in comparing therates of escape and reversion between different infection modelsor between different epitopes. In particular, in some circumstances,both WT and EM virus may be present and begin competing fromthe time of infection, and thus the rates of escape and reversioncan be measured during acute infection. However, in many circumstances(and most likely in natural infection), there may be a delaybefore one variant arises from the other due to mutation. Ifthe strength of the selection wanes with time, then the observedrate of selection will be intimately linked with the time atwhich the mutant first arises (24).

Cytotoxic T lymphocytes (CTLs) kill infected target cells, andwe hypothesized that target cell availability could be a crucialvariable affecting the rates of immune escape and reversion.Here, we apply a mathematical modeling approach to clarify howthe underlying virus and target (CD4⁺ T lymphocyte) cell dynamicscause the time dependence of reversion and escape rates. Wethen compare these model predictions with the dynamics of reversionand escape observed in vivo using a recently reported real-timePCR-based assay for measuring the absolute levels of EM andWT variants in simian-human immunodeficiency virus (SHIV) infectionof macaques. Although X4-tropic SHIV differs from HIV in therange of CD4⁺ T cells available for infection, the X4-tropicSHIV has an advantage in its target cell pool being known andmeasurable at all times.

We find that the rate of reversion is directly proportionalto the number of available uninfected CD4⁺ T-cell targets. Thus,animals have a high reversion rate immediately after infection,due to a high basic fitness cost at normal CD4 T-cell levels.However, this maximal reversion rate declines substantiallyas CD4⁺ T cells are depleted. As a consequence, the effectivefitness cost of the EM virus declines rapidly over the courseof infection, leading to the reduced reversion rate observedat later stages of infection. Since the rate of escape is thebalance of immune pressure and the effective fitness cost atany time, this has important implications for the dynamics ofimmune escape and control in vivo.

MATERIALS AND METHODS

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MATERIALS AND METHODS

In vivo studies. The experimental studies of viral loads of EM and wild-typevirus have been published previously (23). Briefly, we studiedpigtail macaques (Macaca nemestrina) infected with the CXCR4-tropicSHIV (SHIV_mn229) virus. The SHIV_mn229 stock is composed of $~$ 90%of the K165R SIV Gag mutation, which escapes the immunodominantMane-A*10⁺ restricted KP9-specific CD8⁺ CTL epitope. We studiedeight animals in detail, where we had frequent measurementsof KP9-specific T cells, EM and WT viral loads, and CD4⁺ T cells.Four animals were Mane-A*10 negative (4194, 4301, H20, and 1.1705)and used to study reversion of the EM KP9 to the WT, and fouranimals were Mane-A*10 positive (6167, 5712, 5614, and 6276)and used to study transient reversion and reescape at KP9. Twoof these four Mane-A*10⁺ macaques had received T-cell-basedvaccines (animal 6276 received DNA prime and fowlpox virus [DNA/FPV]boost vaccines; animal 5614 received DNA vaccines only) priorto the SHIV challenge. We chose vaccinated and control animalsin order to assess the impact of prior induction of KP9-specificCD8⁺ T cells on escape rates. The dynamics of the EM and WTviruses at the SIV Gag KP9 epitope were measured by using anovel quantitative real-time PCR assay as reported recently(24). CD4⁺ T-cell counts and the number of KP9-specific CD8⁺T cells (detected using KP9/Mane-A*10 tetramers) were measuredby flow cytometry (6, 8).

A simple model of reversion. The simplest model of reversion is based on the basic modelof virus dynamics, with the wild-type (W) and EM (M) virusescompeting for infection of target cells

Formula 1 (1)

Formula 1

Formula 1
In equation 1, T is the (time-varying) number of uninfectedCD4⁺ T cells that are targets for infection by the virus. Itrepresents the common environment in which both strains grow.I_W and I_M are the cells infected by the WT and EM viruses, respectively.The infectivity values k_W and k_M characterize the rate of infectionof target cells by WT or EM virus, and ${delta}$ is the death rate ofinfected cells. We assume that WT and EM sequences differ onlyin one epitope. In the absence of immune recognition of theepitope, the infected cells from the two strains of virus willdecay at the same rate (since cytopathic effects and immune-mediatedkilling through other epitopes should occur at the same rate).Under these circumstances, even if we allow the immune responseto be time dependent, the death rates for both strains willbe the same at all times. Production and clearance rates offree WT and EM virus are given by p_W and p_M and by c_W and c_M,respectively.

We assume that all parameters, with the possible exception of ${delta}$ , are constant in time. This not only implies a simple dynamicof target cells, infected cells, and virus but also neglectsthe possibility of the properties of WT and EM virus populationschanging in time due to compensatory mutations. In this model,we have also neglected the point mutations of EM into WT andvice versa during the course of infection.

Since the turnover of virions is generally faster than the turnoverof infected cells (c_i >> ${delta}$ _i, where i = W,M), the numberof infected cells closely follows the viral load, I_W = (c_W/p_W)Wand I_M = (c_M/p_M)M, so that the instantaneous rates of exponentialgrowth g_W and g_M of the WT and EM virus can be, to a good approximation(31), written as

Formula 2 (2)

Formula 2
, where r_W = k_Wp_W/c_W and r_M = k_Mp_M/c_Mare the replicative capacities of the WT and EM virus, respectively.Replicative capacity is a compound effect of virus infectivity,production, and clearance, while target cells represent themost important feature of their shared environment. Positivevalues of g_W and g_M, when replication exceeds death, imply anincrease in the viral load of each type, while negative valuesimply decay.

We define the instantaneous reversion rate, R(t), at a giventime, t, as the difference between the growth rates of WT andEM virus

Formula 3 (3)
where r_W– r_M is the absolute fitness cost of the escape mutationor the absolute selection advantage of WT virus.

The relative growth of each type of virus depends not only onthe different fitness of different virus types but also on theenvironment, most importantly on the target cell availability.When target cells are abundant, both types of virus will growfast, and the differences in replicative capacity will in shorttime result in large differences in the viral load of each type.When target cells are scarce, the same differences in replicativecapacity will result in a much slower change in the viral loadratio. Thus, the fitness cost of escape mutation may vary overtime. We define the basic fitness cost as the fitness cost ata normal target cell number (i.e., soon after infection, beforea significant number of CD4⁺ T cells is infected or lost). Theeffective fitness cost is the fitness cost experienced at anypoint in time, dependent on the number of target cells available.

Similar reasoning was used previously (4, 26) to determine therelative fitness cost from in vitro reversion experiments. However,instead of the target cell number, the authors used an unknownfunction of time to characterize the environment shared by WTand EM virus.

Since the escape mutation carries a fitness cost, r_W > r_M,the reversion rate in this simple model is always positive,meaning that WT virus will always outgrow EM virus if they areboth present at the start of infection, when there is a largeamount of available target cells and no immune response. Thehigher replicative fitness of WT will result either in fastergrowth or in slower decay.

Measuring the reversion rate from experimental data. The experimental data typically contain viral loads for wild-type(W) and EM (M) virus at different time points. The growth ratesof the WT and EM, g_W and g_M, cannot then be found at each timepoint as in equation 2 but are defined between end points ofa time interval. If viral loads are measured at time pointst_s and t_e, the growth rates of WT g_W and EM g_M in a time intervalstarting at t_s and ending at t_e are determined from the experimentaldata, as follows

Formula 4 (4)

Formula 4
The growth rate is the average rateof exponential growth between the end points of the time interval.Negative growth rate implies decay.

The reversion rate, R, is again defined between end points ofan interval, instead of at a single time point as in equation3. In the time interval between t_s and t_e, the reversion rateis defined (11) as the difference between the growth rates ofequation 4 of the WT and EM virus in the same interval

Formula 5 (5)
which can be equivalently expressedin terms of the relative frequencies, z(t) = W(t)/M(t), or interms of WT and EM fractions, f_W(t) = W(t)/[W(t) + M(t)] andf_M(t) = M(t)/[W(t) + M(t)]

Formula 6 (6)
This rate represents the estimate of the absolute differencebetween the replication rates of the two virus strains, withdifferent sequences at the chosen epitope.

Measured reversion rate and target cell count in experimental data. If WT and EM virus differ only in one epitope and there areno mutations during the course of infection, then from equation3, we expect the reversion rate to be proportional to the targetcell number at each time point. However, both target cell numbersand viral loads are measured at discrete time points, and thereversion rate can be found experimentally only between endpoints t_s and t_e of a time interval, as in equation 5. So, whatis the relationship between equation 5 and equation 3? We observethat the experimental reversion rate equation 5 between t_s andt_e can be written as the integral of the difference of instantaneousgrowth rates, so that

Formula 7 (7)
meaning that the reversion rate equation 5 between t_s and t_ewill be proportional to the average number of target cells,T(t_s, t_e), in this interval. Since the target cells are usuallymeasured only at the end points, one needs to choose how tointerpolate their number between the end points in order toevaluate the area under the curve on the right hand side ofequation 7. If linear interpolation is chosen, the reversionrate, R(t_s, t_e), will correspond to T(t_s, t_e) = [T(t_s) + T(t_e)]/2.If we assume exponential growth/decay, it will correspond to

Formula 8 (8)
Although neither interpolationmethod is entirely justified, we chose the exponential methoddefined by equation 8.

A simple model of escape. In escape, the mutant has the same replicative disadvantageas in reversion, but while the specific WT epitope is recognizedby the CTLs, EM escapes CTL recognition at this epitope. Thenet effect of increased CTL killing of the WT virus is thatthe mutant with lower replicative capacity appears fitter inthis environment and gets the sufficient selective advantageto overtake the wild type.

In the simple model of WT and EM dynamics equation 1, escapeoccurs when the death rate of WT-infected cells, ${delta}$ _W, becomeshigher than the death rate of EM-infected cells, ${delta}$ _M, becauseof WT-specific CTL killing, so that the escape rate

Formula 9 (9)
becomes positive. This happenswhen the damaging results of increased killing of WT-infectedcells overcome its replicative advantage. The difference betweenWT-infected and EM-infected cell death rates is not relatedto target cell numbers, but we expect it to increase with CD8⁺numbers associated with the escape epitope. The effects of thereplicative advantage will be, on the other hand, more beneficialfor WT virus when there are more target cells available.

If we assume that the WT-infected and EM-infected cell deathrates are different ( ${delta}$ _W > ${delta}$ _M) but do not change in time, thenescape is faster at low numbers of targets (usually in the viralload decay phase). In contrast, the ability of the EM virusto establish infection depends on its ability to grow at thetime of its appearance (g_M = r_MT – ${delta}$ _M must be positive),which is larger for a larger target pool. Therefore, for a constantdifference in death rates, the escape rate is the lowest wherethe EM growth rate is the highest.

In reality, the time dependence of the escape rate is due toboth the target cell limitation and the WT-specific immune responsechanging in time. This is why EM does not have to have an advantageat all times.

In the expression for escape rate equation 9, the last termon the right-hand side actually represents the reversion thatwould occur if there were no specific CTL killing of WT-infectedcells. If we know the difference between the replicative capacitiesof the WT and the EM, r_W – r_M, from reversion experimentswith the same virus and can measure the observed escape rate,E, we can estimate the time-dependent WT killing rate, K, from

Formula 10 (10)

Estimating escape rate from experimental data. The escape rate, E (or the replacement rate of the WT by theEM), between time points t_s and t_e is calculated from the differencebetween the growth rates (equation 4) of the EM and WT

Formula 11 (11)
where z(t) = W(t)/M(t).

From the experimental data, we can determine only the escaperate in a given time interval, so that the killing rate in thetime interval (t_s, t_e) is

Formula 12 (12)
where T(t_s, t_e) is the average number of target cells in theinterval.

RESULTS

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RESULTS

The CD4⁺ T-cell number determines the reversion rate. It has been conjectured that the reversion rate should followgeneral virus growth trends (18). However, we have found thatthe correlation between the total viral load growth rate andthe reversion rate is weak (24). We hypothesized that a moreimportant driver of the reversion of EM virus would be the viruses'ability to grow and replicate efficiently when they expand exponentiallyin large numbers of available target cells. Analysis of thebasic model of viral dynamics suggests that the rate at whichreversion occurs should be directly proportional to the numberof uninfected target cells (equation 3). Therefore, we comparedthe rate of reversion at different time intervals to the totalCD4⁺ T-cell count in peripheral blood. Since SHIV_mn229 is aCXCR4-tropic virus and can thus infect both naïve and memoryCD4⁺ T cells, it was not necessary to consider the differentpotential subsets of CD4⁺ T cells. Using experimental data forthe viral loads of WT and EM virus over time, measured usingquantitative real-time PCR, we estimated the reversion ratesover time in macaques, following infection with SHIV_mn229. TheSHIV_mn229 challenge stock used has been shown to be $~$ 10% WT and $~$ 90% EM virus at the KP9 epitope, and thus, both viral variantswere present at the time of infection. The calculated reversionrates and the CD4⁺ T-cell numbers over frequent time intervalsduring acute and postacute SHIV infection for the four animalsare shown in Fig. 1A to D. There was a close temporal relationshipbetween reversion rates and CD4⁺ T-cell levels.

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FIG. 1. Relationship between CD4⁺ T-cell numbers and reversion rate. For each animal, the number of CD4⁺ T cells (right-side axis) is plotted against the estimated rate of reversion (left-side axis) during each time interval. The reversion rate and CD4⁺ T-cell number appear closely linked over time, with the exception of the first time interval for animal 1.7105, where no reversion is observed in the first time period (circles). Gray areas indicate time periods where reversion was unable to be calculated.

If we plot the reversion rate against the average number oftarget CD4⁺ T-cells (estimated using equation 8) in each interval,we find a strong correlation (Fig. 2A), albeit with a differentslope for each animal. However, the normal number of CD4⁺ Tcells in blood is quite variable among healthy animals (andhumans) and may simply reflect the proportion of the total bodyCD4⁺ T-cell pool in the blood of that animal, whereas the totalbody pool may be more consistent between animals. In order toovercome this, instead of considering the absolute number ofCD4⁺ T cells in the animal's blood, we may consider the relativenumber of CD4⁺ T cells at any time compared to the baselinenumber for that animal. If we normalize the number of targetsat any time by the average number during the first week, wesee that there is a strong relationship between the reversionrate and the relative target cell number in the different animals(r² = 0.552; P = 0.0003) (Fig. 2B).

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FIG. 2. Reversion rate is strongly correlated with CD4⁺ T-cell number. (A) The calculated reversion rate and absolute CD4⁺ T-cell number are plotted for each animal. (B) The number of CD4⁺ T cells is normalized to the baseline level for each animal. There is a significant correlation between normalized CD4 levels and reversion rates (values for Spearman's test are indicated). For the purposes of calculating effective fitness cost used later in the study, the linear relationship (dashed line) between normalized CD4 level and reversion rate was estimated, excluding the data for animal 1.7105 (for this line, r² = 0.97; P < 0.0001).

The slope of this line is a measure of how the observed reversionrate varies with target cell number. We interpret this resultas implying that the different slopes in Fig. 3A do not reflectdifferent replicative capacities of WT and EM virus in differentanimals but that they reflect different percentages of the (generallyquite similar) total body CD4⁺ numbers found in blood of differentanimals.

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FIG. 3. Conditions for growth of the WT virus if it appears by mutation later in the EM infection. When a viral strain arises de novo by mutation, it must have an initial growth rate greater than zero in order to spread. During the nadir in target cell numbers in acute infection, it is possible that the WT virus will be unable to propagate because of extremely low target cell levels (gray area) if there is a low basic fitness cost of the EM virus (A). At high basic fitness cost of EM virus the WT virus will always have a positive growth rate (B). The same arguments apply to the spread of the EM virus in WT infection.

In one animal (Fig. 1D, 1.7105), reversion did not follow thegeneral pattern predicted by equation 3. In this animal, therewas no reversion during the first week of infection, but lateron, the reversion rate followed the trend of CD4 numbers. This1-week delay in reversion cannot be explained within the frameworkof our simple model but may require a more complex descriptionwith, for example, explicit delays and separate treatment oflatently infected cells. The point corresponding to the initialzero reversion rate in this animal is shown in Fig. 2 (graycircles).

Predicting periods when new mutants are unable to grow. The observation that reduced target cell numbers lead to reducedeffective fitness cost later in infection implies that reversionin vivo for the same epitope will occur with various rates duringthe course of infection. In the cases we have studied here,animals were infected with a mixture of WT and EM virus, andthus, there was no requirement for the virus to mutate to generatethe competing quasi-species. However, in many HIV-1 transmissionsettings, a clonal population of WT or EM virus will be transmitted(13), and the competing virus must first be generated throughmutation, then survive the early period of growth, and thencompete to become dominant in vivo. This process will oftenlead to a significant delay before the WT-revertant virus isdetected, and depending on when this occurs, we predict differentdynamics will be observed. Where the WT virus is present earlyin infection, it will benefit from a high effective fitnesscost of escape mutation and be rapidly selected. However, whereWT virus is first generated around the peak of infection (thenadir of target cells during acute infection), either it maycompete poorly with EM virus (which has a low effective fitnesscost at low target cell numbers) or it may even be lost if targetcells at the nadir are already severely depleted by the mutantvirus. In chronic infection, low target cell numbers will leadto a slow reversion to the WT virus.

This response can be better understood from Fig. 3, in whichthe variation in target cell numbers during the infection byEM virus is shown. In the steady state, when the EM virus isneither growing nor decaying (g_M = 0, in equation 2), the targetcell number will be at the equilibrium level, at T*_M = ${delta}$ /r_M.For target cell numbers higher than the T*_M value, the EM viruswill grow, and for target cell numbers lower than the T*_M value,it will decay (equation 2). The target cell number that wouldlead to the set point (equilibrium level) in WT virus infectionis always lower than the equilibrium target cell level in EMinfection (because the WT has a higher replication rate); thus,T*_M = ${delta}$ /r_W < T*_M. If the WT appears by mutation during theEM infection when T is more than T*_M (i.e., the target cellnumber is greater than the equilibrium level for the WT virus,which occurs with early infection or in chronic infection),the WT virus will be able to grow and eventually outgrow theEM virus. Around the nadir of target cells, when the numberof target cells is less than the equilibrium value for the WTvirus (T < T*_M; Fig. 3A), the basic reproductive ratio forthe WT virus will be <1, and if the WT virus initially ariseshere, it will likely be lost.

Thus, depending on the timing of when the WT virus arises, ithas a higher or lower probability of survival. If it arisesearly and expands sufficiently during the period of high targetcell availability, then it will not be lost during the contractionphase of virus and will still slowly overtake the EM virus butat a very low rate. If it just appeared by mutation at suchlow target cell numbers, it would disappear because it wouldnot be able to grow. The possibility of growth of the WT virusaround the target cell nadir in the EM infection depends onthe cost of the escape mutation. If the cost is high and thereplicative capacity of the EM is much impaired (r_M <<r_W), then target cells will not be sufficiently depleted, evenat the nadir, and the WT infection will always be able to spread(Fig. 3B). The windows where the WT cannot appear despite itsreplicative advantage exist only if the cost of escape mutationis not too high.

Similar arguments apply to the propagation and survival of theEM during WT infection in escape, but here the situation ismore complex because the amount of depletion at the nadir oftarget cells in WT infection depends on the effectiveness ofCTL killing at this time point.

Estimating the killing rate from the escape rate. The observed rate of immune escape is the balance of the immuneadvantage of the EM virus avoiding CTL recognition versus thefitness costs of escape. The immune advantage in this case isthe reduced CTL killing rate of the EM virus. Thus, the CTLkilling rate can be inferred as the sum of the observed escaperate and the fitness cost. We previously estimated the killingrate at the KP9 epitope to be 1.31 day^–1 during acuteinfection (11). However, this estimate included the basic fitnesscost (maximal reversion rate estimated during the first week,0.38 day^–1) and the maximal escape rate (estimated duringthe third and fourth week). Since the effective reversion rateis substantially lower during the third and fourth week, usingthe basic reversion rate estimated in the first week will tendto overestimate the killing rate (16). Understanding the relationshipbetween the target cell number and the reversion rate describedabove allows us to estimate the effective fitness cost at anytime from data for the number of target cells, using equation12. We determined the difference in replicative capacities fromthe slope of the line in Fig. 2B [(r_W – r_M) T_baseline= 0.387 ± 0.02 day^–1], obtained by linear regressionwithout taking into account the anomalous data points belongingto animal 1.7105 (for this line, r² = 0.97; P < 0.0001).

In order to examine the relationship between virus escape andepitope-specific CD8⁺ T cells, we followed the escape ratesand KP9-specific CTL levels in four responder (Mane-A*10-positive)macaques infected with SHIV_mn229, which demonstrated an earlyreversion to the WT, followed by reescape (described in references10 and 24). Table 1 illustrates the differences in killing ratesestimated by using the basic fitness cost value versus the effectivefitness cost value. The mean basic fitness cost estimated fromthe maximal reversion rate in the first week is 0.38 day^–1.Using this estimate of fitness cost (and adding it to the escaperate), we would estimate the killing rates at between 0.43 day^–1and 0.90 day^–1 (equivalent to the half-lives for killingthrough the KP9 epitope of approximately 18 to 39 h). However,since the maximal escape rate occurred later in infection, theeffective fitness costs at this time were significantly lower.Incorporating the effective fitness costs into the killing ratecalculation leads to significantly lower estimates of the killingrate, from 0.05 day^–1 to 0.61 day^–1 (equivalentto the half-lives for killing through KP9 of between approximately27 h and 13 days) (Table 1). In fact, escape and killing ratesdiffer significantly only when there is not much CD4⁺ depletion(Fig. 4A). In addition, the timing of maximal killing rate canalso change once the effective fitness cost is considered. Thatis, since the maximal effective fitness cost, R, does not coincidewith the highest escape rate, E (Fig. 4A), so maximal CTL killingmay not occur at the maximum of observed escape rate (Fig. 4B).For animal 6276, the maximal escape rate is between days 10and 13, and thus, when the basic fitness cost is considered,the maximal killing rate occurs at the same time. When the effectivefitness cost is added, the maximal killing rate is found tobe between days 7 and 10.

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TABLE 1. Basic fitness cost overestimates killing rate^a

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FIG. 4. Estimating the killing rate using the effective fitness cost. (A) The measured escape rate (black) and estimated effective fitness cost (red, estimated from the relationship described in the legend to Fig. 2B) are shown for animal 6276. The estimated killing rate is the sum of the escape rate and effective fitness cost. In late escape, the effective fitness cost is almost negligible. (B) The WT-specific killing rate estimated using an earlier approach (red, determined using the basic fitness cost, as in reference 11) tends to overestimate the actual killing rate. The actual WT-specific killing rate (black bars) estimated using the effective fitness cost is substantially lower at all times after the first time interval. The maximal escape rate does not necessarily coincide with the maximum killing rate.

Killing rate correlates poorly with the specific CD8⁺ T-cell number. Once the killing rate can be accurately estimated from datafor EM and WT viral loads and CD4⁺ T-cell count, it is expectedthat this should be directly correlated with the magnitude ofthe CD8⁺ T-cell response to the epitope. In Fig. 5, we showa time course for the killing rate and the KP9-specific CD8⁺numbers for two vaccinated animals, 6276, vaccinated with theDNA/FPV vaccine (Fig. 5A), and 5614, vaccinated with DNA only(Fig. 5B). The killing rate generally follows the trend of CD8⁺numbers in both animals. The DNA/FPV vaccine (animal 6276) appearsat first sight to be more efficient than the DNA-only vaccine(animal 5614), since it generates approximately 10-fold largerepitope-specific CTL levels at all times. However, if we comparethe killing rates, we see that they are quite similar, implyingthat the CTL number is not always indicative of their efficiency.

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FIG. 5. Rapid fluctuations in the killing rate around the peak of CTL. Although the estimated killing rate generally follows the magnitude of the CD8⁺ T-cell response, there are major fluctuations from the highest to the very lowest observed killing rate around the peak of the CD8⁺ T-cell response in animals 6276 and 5614. Animal 6276 even has negative killing rates in three time intervals (circled in gray). This suggests a more complicated dynamic of immune control than would be predicted by a straight "CD8-killing" model.

When we plotted the WT-specific killing rates for all four Mane-A*10⁺animals against the number of KP9-specific CD8⁺ T cells presentat that time (measured using MHC class I peptide tetramers),we found that there was no significant correlation, as shownin Fig. 6A. The poor correlation (Spearman's r = 0.1395; P =0.403) is mostly due to the three points with negative killingrates (i.e., reversion to the WT) at elevated CTL levels (Fig.5A and 6A, circled in gray), belonging to animal 6276. Thesepoints correspond to surprisingly large fluctuations from thehighest killing rate to the very lowest (or even negative) killingrates observed also with control animals 6167 and 5712. (Thenegative killing rate value would mean an advantage of the WTlarger than expected from its fitness advantage without anyCTL killing.)

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FIG. 6. Poor correlation between KP9-specific CD8⁺ T-cell numbers and the killing rate. The number of KP9-specific CD8⁺ T cells (detected using MHC class I peptide tetramers) is relatively poorly correlated with the estimated killing rate in individual animals.

It is not clear if the large fluctuations in killing rate andthe lack of significant correlations between CTL killing andCTL numbers are consequences of statistical errors in the determinationof WT and EM viral loads at different time points or if theyreflect some unexplained effect of CTL control not taken intoaccount in our model (e.g., latently infected cells, the roleof CD4⁺ T-cell help [25] for the activation of killing functionalityof CTLs, or noncytolytic CTL function).

The large fluctuations are often seen around the peaks of bothviral load and CTL numbers. Although such fluctuations appearunusual, similar fluctuations and negative escape rates closelyfollowing the periods of the fastest outgrowth of the mutantwere also found in four out of the eight animals described ina recent paper in which the role of CD4⁺ T-cell help in CTLkilling in SIV viral escape was estimated (25). In that study,the authors assumed the direct proportionality between the killingrate, K, and the CTL numbers, E_W [K(t) = ${kappa}$ E_W(t)], and found thebest fit for the killing constant, ${kappa}$ , from the time dependenceof the EM fraction in time. The periods of negative escape rateswere smoothed out in this process. We did not make any assumptionsabout the form of dependence between CTL numbers and killingrate and avoided data manipulation such as smoothing in ordernot to mask any real effects.

Surprisingly, we found a significant correlation between theCD4⁺ T-cell numbers from all four animals and killing rates(Fig. 6C, Spearman's P = 0.0008). Although the correlationswere not significant from the smaller number of data pointsin each individual animal, the correlation values were consistentlystronger for the CD4⁺ T-cell numbers and the WT-killing ratethan for the correlation between the number of tetramer-positivecells and the WT-killing rate. The positive correlation betweentarget cell numbers and killing rate supports the hypothesisof the need for CD4⁺ help in CTL killing (25). It is also consistentwith some noncytolytic CTL function. The effect of noncytolyticcontrol of infection (either by KP9-specific or other CTL) wouldbe to reduce the effective fitness cost by decreasing the overallreplication of the virus and would therefore be proportionalto the target cell numbers in addition to the dependence onCTL levels.

DISCUSSION

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DISCUSSION

Identifying HIV vaccine targets based upon the rate of escapeor inferred fitness cost of these epitopes is a step towardthe rational design of better T-cell vaccines (11, 14, 20).In addition, a comparison of escape rates and fitness costshas been performed between HIV and SHIV/SIV infection (3) andbetween epitopes in the same infection (14, 23) to understandimmune control of virus. A major difficulty with previous studiesis that these comparisons are often performed at different stagesof infection and may therefore be confounded by the differentdynamics of infection (24). In vitro studies have previouslysuggested that target cell availability may play a role in theviral competition between drug-resistant and wild-type viruses(35). Here we demonstrate that a basic viral dynamics modelpredicts a relationship between the rate of reversion of escapemutation and the number of target CD4⁺ T cells available forinfection and that this relationship is observed for experimentalstudies of reversion in vivo for the CXCR4-tropic SHIV infectionof pigtail macaques, where target cells can be easily identifiedand measured. Importantly, the maximal reversion rate estimatedvery early in infection gives an estimate of the basic fitnesscost (the fitness cost in the presence of normal target cellnumbers), but the effective fitness cost (fitness cost at agiven time or number of target cells) is often much lower thanthis. Thus, depending on when the WT virus arises, it may revertrapidly, die out early, or revert slowly (Fig. 7A).

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FIG. 7. Target cell availability determines escape and reversion kinetics (schematic). (A) The expected rate of reversion varies during infection with the number of target cells. The highest reversion is seen immediately after infection, where the basic fitness cost is observed. However, following the peak of virus, extremely slow reversion is seen during the nadir of target cells due to low effective fitness cost. The WT virus arising during this period may die out due to stochastic effects because its growth rate is negative (asterisk). (B) Varying the effective fitness cost leads to slow viral escape immediately after infection (white field), where the mutants can grow faster than the WT only if they have very low fitness cost or if there is extremely high CTL killing of the WT. This is followed by a period of extremely low effective fitness cost just after the peak of virus, where even extremely unfit or weakly killed viruses may be selected if they are already present. However, if the mutants appear during this period, they may disappear due to stochastic effects (dark gray field marked with an asterisk). In chronic infection (light gray area) there is an intermediate effective fitness cost where mutant viruses will escape slowly.

Similarly, the rate of immune escape will be significantly affectedby the timing of generation of the EM virus. Figure 7B showswhat we would expect if the preferential CTL killing of theWT-infected target cells were constant in time ( ${delta}$ _W and ${delta}$ _M in equation9 are constants). Immediately after infection, the EM viruspays the highest effective fitness cost, and thus, the EM viruswill be selected during this time only if it has extremely lowfitness costs or if there is extremely high CTL killing. Bycontrast, the fastest escape will be observed when target cellsare depleted following the peak of viremia. At this time, evenEM viruses with extremely high fitness costs may be selected.In chronic infection, effective fitness costs are still relativelylow, so viruses with high fitness costs or low CTL killing canbe selected. Importantly, the early dynamics are extremely fast,and definitions of acute infection may span periods of extremelyhigh, low, or intermediate effective fitness cost, and caremust be taken when comparing these periods.

It should be stressed at this point that our model (expressedin equation 1 and Fig. 7) represents an idealized picture ofreversion and escape, with approximations regarding both thevirus populations and target cell numbers. In the model, weassume that the WT and EM virus populations differ only at oneepitope and do not experience compensatory mutations that mightchange their fitness over the course of infection. However,the real-time PCR assay used in the experimental studies measuresall virus particles with the WT sequence at the KP9 epitope.Similarly, measurements of the EM virus represent all virusparticles with the EM sequence at the same epitope. Thus, thisapproach would not detect compensatory mutations or escape atother epitopes that may evolve over the course of infection.We note that in our previous studies using direct sequencingof the viral Gag gene (10, 11), we have sequenced many hundredsof WT and EM viruses on multiple occasions and have not detectedany clear patterns of compensatory or other mutations that mightaffect selection. Thus, it seems unlikely that compensatorymutations are playing a large role in affecting viral fitnessin this study.

With respect to the target cells, the model implicitly assumesthat all target cells can be infected with equal probabilityby each strain of virus (i.e., WT or EM) and would produce thesame amount of virus when infected. However, the replicativecapacity of virus is thought to differ between naïve andmemory CD4 T cells and according to the activation state ofthe cell (39). Moreover, the number and activation state oftargets in different subsets may change in time, affecting thereplicative capacity of virus (33). Thus, although we assumethat the CD4⁺ T-cell measurements in peripheral blood alwaysreflect the availability of target cells, both the locationof target cells in different anatomical locations, their phenotypes,and the activation state of these cells may differ with time.In our study, we observed a linear relationship between thetarget cell levels and the reversion rate, suggesting that theeffects of compensatory mutations and variations in subsetsof CD4⁺ T cells and their distributions in anatomical compartmentswere negligible, so that reversion rate was nearly "ideal."

Although our study was limited to an X4-tropic SHIV, we expectmuch of the analysis regarding the target cell dependence ofreversion and escape rates is applicable to R5-tropic SIV andHIV infections under the idealized conditions considered inthe model. However, in CCR5-tropic virus infections such asthose caused by HIV and SIV, estimating the effective fitnesscosts may be more difficult, since the precise phenotype, anatomicallocation, and activation state of target cells are not welldefined and may change over the course of infection (30). Consequently,it may be difficult to unambiguously define the target cellsin R5-tropic infections, although we expect that the relationshipsbetween target cell numbers and growth rates would still apply.The reversion rate would still reflect the underlying targetcell numbers, while the escape rate would still be given bythe general expression as the balance of fitness cost and thedifference in death rates of infected cells. On the other hand,the combination of the varying composition of target cell pooland its varying distribution over the anatomical compartments,as well as changes in composition of WT and EM populations,may have a much stronger impact in HIV infection.

The differences in target pool phenotype and turnover betweenX4-tropic SHIV and R5-tropic SIV or HIV may result in targetcell numbers following a different time dependence in theseinfections compared to that shown in Fig. 7. However, when adefined population of target cells in the gut was studied (37),the dynamics of target cell depletion appeared to be similarto that observed for CXCR4 virus infection (7), suggesting thatthe dynamics of target cells may be similar when they can bemeasured directly. Specifically, memory CD4⁺ T-cells, consideredthe main targets of HIV, are severely depleted in the chronicinfection phase. Thus, the near absence of reversion to theWT virus in chronic, progressive HIV infection, when the immunepressure due to CTL activity is much decreased, can be explainedby relatively small target cell pool at this stage of infection.

The CD8⁺ T-cell response to HIV infection is stimulated by thepresence of virus and can vary greatly with time. In addition,not all CD8⁺ T-cell responses arise simultaneously: some responsespeak early in infection (around the peak of viral load), whileothers may develop slowly in chronic infection (38). For CTLresponses that are the highest around the peak in viral load(and nadir of CD4⁺ T cells during acute infection), maximalkilling will coincide with minimal effective fitness cost andlead to extremely rapid selection of EM virus at this time.However, for responses that peak later in infection, the peakin killing may coincide with an intermediate effective fitnesscost, slowing viral escape. Importantly, vaccination is likelyto have the effect of bringing forward the peak in CD8⁺ T-cellresponse; in some cases, it may bring the peak in WT killingforward in time to coincide with the nadir in effective fitnesscost and lead to rapid escape at an epitope which would otherwiseexperience slow escape and more prolonged immune pressure. Thishypothesis is testable with future studies of larger numbersof macaques or human subjects in randomized vaccine trials,for example in the recently stopped adenovirus-recombinant HIVvaccine trial (29). Analyses of the fine kinetics of T-cellescape and viral loads in subjects that become infected despitevaccination could identify useful HIV antigens for future HIVvaccine studies.

Since it is rare for the EM and WT viral loads to be estimatedaround the peak of viral load in HIV infection, it is not surprisingthat the estimated rate of immune escape in HIV is lower thanin SHIV/SIV, where the maximal escape rate is usually measuredjust after the peak of viral load (3). Even when analyses arelimited to acute infection, this definition for HIV can be extremelybroad (i.e., up to 6 months). Similarly, an association betweenan increased number of escape mutations and a lower CD4⁺ T-cellcount suggests that increased escape is associated with diseaseprogression (5). However, this analysis may be confounded bythe fact that lower CD4⁺ T-cell levels may lead to lower effectivefitness cost, and thus, permit the selection of EM virus atepitopes with higher fitness cost or lower killing. Comparisonof the frequency of escape mutations in responders (bearingthe correct MHC) versus nonresponders has been another meansof estimating the rate of escape and reversion (12, 28). However,these frequencies are inevitably linked to not only the rateof selection, but also the timing of mutation (if the mutantis not present in the inoculum). Thus, a WT virus that arisesearly (i.e., is easily produced by mutation) will be rapidlyselected and dominate from early infection. However, a WT virusthat evolves only later around the peak of infection may initiallybe lost due to a minimal fitness cost of EM virus and a negativeoverall viral growth rate. A WT virus that arises even laterwill only be slowly selected and may be detected only for ashorter proportion of the period of infection (and thus, havea lower frequency in the MHC-negative population and appearto have a low fitness). Thus, the timing, rate, and frequencyof reversion observed in vivo are governed both by the probabilityof mutation and by the effective fitness cost.

The dynamics of immune escape and reversion in vivo presenta complex balance of CTL killing and effective fitness costand determine both the viral quasispecies within the host andthat circulating within the host population. Optimal targetingof the CTL response to epitopes with high fitness cost may beone mechanism to maximize vaccine effectiveness. Here, we demonstratethe important role played by CD4⁺ target cells for infectionin determining the dynamics of escape and reversion and suggestthat this effect needs to be taken into account when viral dynamicsin vivo are studied. Further studies should aim to verify thiseffect in HIV.

ACKNOWLEDGMENTS

We thank Ruy Ribeiro for review of the manuscript and helpfuldiscussion.

This work was supported by the James S. McDonnell Foundation21st Century Research Award/Studying Complex Systems and bythe Australian National Health and Medical Research Council(NHMRC). M.P.D. is a Sylvia and Charles Viertel Senior MedicalResearch Fellow.

FOOTNOTES

* Corresponding author. Mailing address: Complex Systems in Biology Group, Centre for Vascular Research, University of New South Wales, Kensington, NSW 2052, Australia. Phone: 61 2 93852762. Fax: 61 2 93851389. E-mail: m.davenport{at}unsw.edu.au

Published ahead of print on 13 February 2008.

REFERENCES

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