Statistical Models Without Differential Equations

Author

Patrick Kofod Mogensen

using Pumas
using AlgebraOfGraphics
using CairoMakie
using StableRNGs

1 Introduction

This tutorial represents a slight deviation from most other models presented and performed in Pumas that often includes pharmacokinetic modeling. Here, we will focus on simple Exposure-Response (ER) models. ER models can be models of efficacy, safety, toxicity, or any other response. The response can be continuous in nature, it can be binary, or even multinomial such as ordinal pain score models.

The main point of the tutorial is to introduce the situation where there is data that does not come with an inherent dynamical system component. Instead, we want to study the effect of an exposure measure such as plasma concentration (potentially as a proxy for biophase concentration) or AUC on some kind of response. The response could be almost any response you can think of from the total area of the body affected by eczema, a pain-score, pain relief indicator, body weight, presence of vomiting, or any other efficacy, safety, or toxicity measure. To keep things simple and focus on higher level ideas we go with a sigmoidal Emax model (with a Hill exponent) for some hypothetical response given some level of plasma concentrations.

# Data generating parameters
Emax = 100
C50 = 40
h = 2
# Function to evaluate the Emax model
hill_model(cp, emax, c50, hill) = emax * cp^hill / (c50^hill + cp^hill)
hill_model (generic function with 1 method)

The Hill function is well-known in pharmacodynamics when we have an exposure-response relationship that has an upper effect limit. The Hill parameter allows us to change where in the exposure domain the change in effect strongest. It includes two additional parameters: C50 and Emax. First, is the half maximal effective concentration C50 (sometimes EC50) parameter that is the exposure (here concentration, hence C) that leads to half of the response in excess of a baseline value. Here, the baseline is zero. Second, is the parameter Emax that is simply the maximum effect or response that can occur. If we sample with a technique that truly has additive error the observed maximal effect could in principle be above Emax.

Let us draw such a function with the data generating parameters.

Show plotting code
hill_plot =
    data((exposure = 0:200, effect = hill_model.(0:200, Emax, C50, h))) *
    mapping(:exposure, :effect) *
    visual(Lines) +
    data((exposure = [C50], effect = [0, hill_model(C50, Emax, C50, h)])) *
    mapping(:exposure, :effect) *
    visual(Lines; linestyle = :dot) +
    data((exposure = [0, C50], effect = [hill_model(C50, Emax, C50, h)])) *
    mapping(:exposure, :effect) *
    visual(Lines; linestyle = :dot) +
    data((exposure = [0, 200], effect = [Emax])) *
    mapping(:exposure, :effect) *
    visual(Lines; linestyle = :dot)

axis_spec = (;
    axis = (
        limits = (0, 200, 0, Emax + 10),
        xticks = ([0, C50, 100, 200], ["0", "C50", "100", "200"]),
        yticks = ([0, 25, Emax / 2, 75, Emax], ["0", "25", "Emax/2", "75", "Emax"]),
    )
)
draw(hill_plot; axis_spec...)

Since we have no model to explain the exposure but it is rather just a measured quantity we will simply sample exposures for this example. To ensure proper behavior of the estimator, we will make sure to sample well above C50.

2 Data Without Any Events

One basic property of the data for this kind of analysis we need to consider is that there are no events in the provided data. By events we think of the usual dose events associated with infusion rates and durations, bolus dose amounts, and other information about the specific mechanisms at play. We normally parse this information and use it to explicitly build a model for the trajectories of pharmacokinetic variables and how they might influence pharmacodynamics - but not here! We still require a time column, but often it may only be used to separate individual observations within subjects instead of being used for dynamical modeling.

Instead of using a predefined dataset we will construct a simple one as described in the previous section using sampled concentrations, the Hill model, and an additive error model. We need at least id, time, and observations to define an eventless dataset, but to drive the Emax model we need to include cp_i that are the measured or predicted exposures. The observations will be called resp here for response.

# Define the number of concentrations to sample
N = 40
# Define the random number generator
rng = StableRNG(983)
# Sample concentrations from a log-normal distribution
cp_i = rand(rng, LogNormal(log(C50 + 5), 0.6), N)
# Generate response variables given the exposure, cp_i and parameters for the Hill model
resp = @. rand(rng, Normal(hill_model(cp_i, Emax, C50, h), 3.2))
# Combine results into a DataFrame
response_df = DataFrame(id = 1:N, time = 1, cp_i = cp_i, resp = resp)
40×4 DataFrame
15 rows omitted
Row id time cp_i resp
Int64 Int64 Float64 Float64
1 1 1 29.9617 32.829
2 2 1 67.714 78.3184
3 3 1 58.7976 69.3724
4 4 1 37.54 46.1287
5 5 1 58.5205 67.6474
6 6 1 51.4522 61.8933
7 7 1 106.938 84.1643
8 8 1 17.5912 21.9294
9 9 1 14.974 11.6478
10 10 1 40.0817 47.5374
11 11 1 67.7002 77.037
12 12 1 38.6564 43.8903
13 13 1 31.8099 40.5693
29 29 1 109.159 82.9605
30 30 1 21.5369 22.6964
31 31 1 79.237 82.8221
32 32 1 94.6278 82.5703
33 33 1 53.9975 59.4201
34 34 1 44.5625 52.5194
35 35 1 130.494 92.3875
36 36 1 66.5144 75.9562
37 37 1 18.7343 22.4305
38 38 1 62.8681 71.8646
39 39 1 63.7703 73.3971
40 40 1 48.1412 64.6768
Show plotting code
draw(hill_plot + data(response_df) * mapping(:cp_i, :resp) * visual(Scatter); axis_spec...)

2.1 Defining Pumas Population Without Events

To map from tabular data in response_df to a Population in response_pop we use read_pumas just as we did in the case with event data. The important part is to turn off event_data to disable checks that are not relevant to this eventless example. If event_data is not set to false we would get errors about missing event columns for example.

response_pop = read_pumas(
    response_df,
    id = :id,
    time = :time,
    covariates = [:cp_i],
    observations = [:resp],
    event_data = false,
)
Population
  Subjects: 40
  Covariates: cp_i
  Observations: resp

2.2 A Model Without Dynamics

Above we simply defined the input exposure and output response as simple arrays and function evaluations to defer the PumasModel definition until after seeing how to load eventless datasets. However, to perform a maximum likelihood fit we need to define a proper PumasModel.

response_model = @model begin
    @param begin
        θemax  RealDomain(lower = 0, init = 90)
        θc50  RealDomain(lower = 0, init = 30)
        θhill  RealDomain(lower = 0, init = 3)
        σ  RealDomain(lower = 1e-5, init = 0.1)
    end
    @covariates cp_i
    @pre begin
        emax_i = hill_model(cp_i, θemax, θc50, θhill)
    end
    @derived begin
        resp ~ @. Normal(emax_i, σ)
    end
end
PumasModel
  Parameters: θemax, θc50, θhill, σ
  Random effects:
  Covariates: cp_i
  Dynamical system variables:
  Dynamical system type: No dynamical model
  Derived: resp
  Observed: resp

2.3 Fitting

To fit the model, we simply invoke fit with the model, population, parameters, and likelihood approximation method. Since there are no random effects in this model there is no integral to approximate so we use NaivePooled(). This will perform a maximum likelihood estimation according to the distribution used in @derived. The parameters in this case will match a non-linear least squares fit since we have an additive gaussian error model, but inference may deviate as usual.

emax_fit = fit(response_model, response_pop, init_params(response_model), NaivePooled())
[ Info: Checking the initial parameter values.
[ Info: The initial negative log likelihood and its gradient are finite. Check passed.
Iter     Function value   Gradient norm 
     0     2.191392e+05     2.289229e+06
 * time: 0.0308229923248291
     1     6.818291e+04     2.824317e+05
 * time: 1.1940038204193115
     2     4.291959e+04     9.008422e+04
 * time: 1.1942219734191895
     3     2.526194e+04     7.438611e+04
 * time: 1.194394826889038
     4     1.555090e+04     5.381298e+04
 * time: 1.1945698261260986
     5     9.814559e+03     6.070009e+04
 * time: 1.1947410106658936
     6     7.614303e+03     5.099953e+04
 * time: 1.1949188709259033
     7     6.795333e+03     3.666906e+04
 * time: 1.1950910091400146
     8     6.332366e+03     2.139158e+04
 * time: 1.1952710151672363
     9     5.860625e+03     1.311493e+04
 * time: 1.195436954498291
    10     5.219282e+03     1.507053e+04
 * time: 1.1956019401550293
    11     4.162225e+03     1.424461e+04
 * time: 1.1957659721374512
    12     2.938417e+03     1.622318e+04
 * time: 1.1959328651428223
    13     2.319141e+03     1.430247e+04
 * time: 1.1960978507995605
    14     1.257223e+03     6.948150e+03
 * time: 1.1962649822235107
    15     7.239484e+02     3.073878e+03
 * time: 1.196429967880249
    16     4.221635e+02     1.591054e+03
 * time: 1.1966049671173096
    17     2.681901e+02     8.356172e+02
 * time: 1.1967709064483643
    18     1.904231e+02     4.511418e+02
 * time: 1.1969399452209473
    19     1.552170e+02     2.590796e+02
 * time: 1.1971030235290527
    20     1.412507e+02     1.609948e+02
 * time: 1.1972689628601074
    21     1.368116e+02     1.106316e+02
 * time: 1.1974530220031738
    22     1.357202e+02     8.485850e+01
 * time: 1.1976368427276611
    23     1.353898e+02     7.013620e+01
 * time: 1.1978638172149658
    24     1.350937e+02     5.450614e+01
 * time: 1.1980400085449219
    25     1.347410e+02     3.733061e+01
 * time: 1.198213815689087
    26     1.345492e+02     6.266036e+01
 * time: 1.1983859539031982
    27     1.345033e+02     6.975752e+01
 * time: 1.1985549926757812
    28     1.344943e+02     6.841408e+01
 * time: 1.1987240314483643
    29     1.344938e+02     6.745130e+01
 * time: 1.1989119052886963
    30     1.344931e+02     6.665860e+01
 * time: 1.199084997177124
    31     1.344910e+02     6.496068e+01
 * time: 1.1992528438568115
    32     1.344858e+02     6.244698e+01
 * time: 1.1994190216064453
    33     1.344718e+02     5.817264e+01
 * time: 1.1995868682861328
    34     1.344356e+02     5.122402e+01
 * time: 1.1997559070587158
    35     1.343407e+02     4.121832e+01
 * time: 1.1999340057373047
    36     1.340960e+02     5.595102e+01
 * time: 1.2001240253448486
    37     1.334812e+02     7.977600e+01
 * time: 1.200286865234375
    38     1.320677e+02     1.141588e+02
 * time: 1.2005579471588135
    39     1.295160e+02     1.330673e+02
 * time: 1.2008368968963623
    40     1.270177e+02     7.901632e+01
 * time: 1.2011189460754395
    41     1.264533e+02     2.155415e+01
 * time: 1.201387882232666
    42     1.262863e+02     8.225580e+00
 * time: 1.2016608715057373
    43     1.262719e+02     6.032004e+00
 * time: 1.201936960220337
    44     1.262707e+02     4.659021e+00
 * time: 1.2022278308868408
    45     1.262707e+02     4.722942e+00
 * time: 1.2025399208068848
    46     1.262706e+02     4.816900e+00
 * time: 1.20281982421875
    47     1.262705e+02     4.995290e+00
 * time: 1.203110933303833
    48     1.262702e+02     5.268485e+00
 * time: 1.2033970355987549
    49     1.262694e+02     5.722605e+00
 * time: 1.203678846359253
    50     1.262674e+02     6.456700e+00
 * time: 1.2039709091186523
    51     1.262619e+02     7.663981e+00
 * time: 1.2042629718780518
    52     1.262474e+02     9.659510e+00
 * time: 1.204542875289917
    53     1.262080e+02     1.301621e+01
 * time: 1.2048108577728271
    54     1.260905e+02     1.869585e+01
 * time: 1.2050879001617432
    55     1.254864e+02     1.996336e+01
 * time: 1.2053589820861816
    56     1.242755e+02     2.959843e+01
 * time: 1.2056338787078857
    57     1.218934e+02     3.470690e+01
 * time: 1.2059149742126465
    58     1.211416e+02     1.164980e+02
 * time: 1.2062358856201172
    59     1.173281e+02     1.882403e+02
 * time: 1.2065598964691162
    60     1.148987e+02     6.454397e+01
 * time: 1.2068359851837158
    61     1.142754e+02     5.925562e+01
 * time: 1.2071619033813477
    62     1.139379e+02     4.781775e+01
 * time: 1.2074458599090576
    63     1.134167e+02     4.884944e+01
 * time: 1.2077348232269287
    64     1.110742e+02     6.710274e+01
 * time: 1.208009958267212
    65     1.071014e+02     7.528856e+01
 * time: 1.2082769870758057
    66     1.048398e+02     6.135959e+01
 * time: 1.2085769176483154
    67     1.031549e+02     6.415724e+01
 * time: 1.2088649272918701
    68     1.023007e+02     1.955391e+01
 * time: 1.2091679573059082
    69     1.019906e+02     1.355104e+01
 * time: 1.2094388008117676
    70     1.019243e+02     1.030982e+01
 * time: 1.2097089290618896
    71     1.019192e+02     1.001753e+00
 * time: 1.2099838256835938
    72     1.019190e+02     3.009678e-01
 * time: 1.2102768421173096
    73     1.019189e+02     4.438935e-02
 * time: 1.2105779647827148
    74     1.019189e+02     1.971922e-03
 * time: 1.210860013961792
    75     1.019189e+02     2.678153e-05
 * time: 1.2111499309539795
FittedPumasModel

Successful minimization:                      true

Likelihood approximation:              NaivePooled
Likelihood Optimizer:                         BFGS
Dynamical system type:          No dynamical model

Log-likelihood value:                   -101.91895
Number of subjects:                             40
Number of parameters:         Fixed      Optimized
                                  0              4
Observation records:         Active        Missing
    resp:                        40              0
    Total:                       40              0

-------------------
          Estimate
-------------------
θemax    104.13
θc50      41.558
θhill      1.8147
σ          3.0927
-------------------

and we may use the usual workflow to get estimates of parameter uncertainty

infer(emax_fit)
[ Info: Calculating: variance-covariance matrix.
[ Info: Done.
Asymptotic inference results using sandwich estimator

Successful minimization:                      true

Likelihood approximation:              NaivePooled
Likelihood Optimizer:                         BFGS
Dynamical system type:          No dynamical model

Log-likelihood value:                   -101.91895
Number of subjects:                             40
Number of parameters:         Fixed      Optimized
                                  0              4
Observation records:         Active        Missing
    resp:                        40              0
    Total:                       40              0

---------------------------------------------------------
         Estimate         SE               95.0% C.I.
---------------------------------------------------------
θemax   104.13          4.1798       [95.942 ; 112.33  ]
θc50     41.558         2.1123       [37.418 ;  45.698 ]
θhill     1.8147        0.1155       [ 1.5883;   2.0411]
σ         3.0927        0.27055      [ 2.5624;   3.6229]
---------------------------------------------------------

as well as inspect. Diagnostics for these models are typically simple enough that they can be constructed from the DataFrame constructed from inspect output.

2.4 Extensions

Since we used a normal PumasModel we can extend the response analysis with:

  • covariate effects including time, dose level, etc
  • random effects if there are multiple observations per subject
  • more complicated response models such as binary response and ordinal response

3 Concluding Remarks

This tutorial introduced a simple Exposure-Response (ER) modeling approach using the Emax model, focusing on cases where no explicit time component or dynamic system is involved. By working with eventless data, we demonstrated how to structure the dataset, define a model without pharmacokinetics, and fit it using maximum likelihood estimation in Pumas.

The methodology presented provides a foundation for analyzing ER relationships in various contexts, from efficacy assessments to safety evaluations. While we used a basic model, the approach can be extended to incorporate covariate effects, random effects, and more complex response types, making it highly adaptable to different modeling needs. By leveraging these capabilities, users can perform robust ER analyses even in the absence of traditional pharmacokinetic modeling constraints.