Case Study III - Development of a population PKPD model using Pumas

Author

Patrick Kofod Mogensen 

using Pumas
using DataFramesMeta
using PumasUtilities
using CSV

1 Third of three case studies

This is the third and tutorial based on in a series of case studies found here . The third case study is about building a PKPD model. It has IV infusion dosing, PK is governed by a simple one compartment model, and PD is an indirect response model (IDR).

2 Developing a population PKPD model using Pumas

In this tutorial, we will show how to build a PKPD model using a sequential approach. The PK model is a simple one compartment model with an IV infusion. The PD model is an indirect response model (IDR model) of histamine concentrations.

3 Data

Please download the PK dataset and PD dataset place them in the folder where this tutorial is placed First, we read the data from the csv file. We define an :evid and a :cmt column and set all event row values of :CONC to missing.

pkdata = CSV.read("CS3_IVINFEST.csv", DataFrame; header = 4)
@rtransform!(pkdata, :evid = :AMT == 0 ? 0 : 1)
@rtransform!(pkdata, :cmt = :AMT == 0 ? missing : Symbol("Central"))
@rtransform!(pkdata, :CONC = :evid == 1 ? missing : :CONC)

Then, we map the DataFrame to a population. We can omit specifying the cmt and evid keyword because we used the default value of lower case :cmt and :evid.

pk_population = read_pumas(
    pkdata;
    id = :CID,
    time = :TIME,
    observations = [:CONC],
    amt = :AMT,
    rate = :RATE,
)
Population
  Subjects: 20
  Observations: CONC

The data can be plotted using the observations_vs_time plot.

observations_vs_time(pk_population; axis = (title = "PK data plot",))

To emphasize individual trajectories, the sim_plot function also works on a population.

sim_plot(pk_population; axis = (title = "PK data plot",))

4 PK Model definition

The next step is to define the PK model. Since we have IV infusion we do not need a depot. The model does not contain any significant distribution phase. With just a Central compartment, we can use the Central1 predefined model and its associated closed form solution. This is equivalent to ADVAN1 in NONMEM.

inf1cmt = @model begin
    @param begin
        θcl  RealDomain(lower = 0.0)
        θvc  RealDomain(lower = 0.0)
        Ω  PDiagDomain(2)
        σ_add  RealDomain(lower = 0.0)
        σ_prop  RealDomain(lower = 0.0)
    end
    @random begin
        η ~ MvNormal(Ω)
    end
    @pre begin
        CL = θcl * exp(η[1])
        Vc = θvc * exp(η[2])
    end
    @dynamics Central1
    @derived begin
        conc_model := @. Central / Vc
        CONC ~ @. Normal(conc_model, sqrt(σ_add^2 + (conc_model * σ_prop)^2))
    end
end
PumasModel
  Parameters: θcl, θvc, Ω, σ_add, σ_prop
  Random effects: η
  Covariates: 
  Dynamical system variables: Central
  Dynamical system type: Closed form
  Derived: CONC
  Observed: CONC

To be able to fit the model we need to specify individual parameters.

initial_est_inf1cmt = (
    θcl = 1.0,
    θvc = 1.0,
    Ω = Diagonal([0.09, 0.09]),
    σ_add = sqrt(10.0),
    σ_prop = sqrt(0.01),
)
(θcl = 1.0,
 θvc = 1.0,
 Ω = [0.09 0.0; 0.0 0.09],
 σ_add = 3.1622776601683795,
 σ_prop = 0.1,)

And then we can fit the model to data.

inf1cmt_results = fit(inf1cmt, pk_population, initial_est_inf1cmt, FOCE())
[ 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     3.174194e+03     1.463122e+03
 * time: 0.02028489112854004
     1     1.700194e+03     3.899473e+02
 * time: 0.47061896324157715
     2     1.372117e+03     2.133637e+02
 * time: 0.47582101821899414
     3     1.149219e+03     9.540101e+01
 * time: 0.48154187202453613
     4     1.063179e+03     5.172865e+01
 * time: 0.4863548278808594
     5     1.025366e+03     2.646221e+01
 * time: 0.49088096618652344
     6     1.011715e+03     1.666561e+01
 * time: 0.4952998161315918
     7     1.007591e+03     1.182557e+01
 * time: 0.4991018772125244
     8     1.006663e+03     9.681515e+00
 * time: 0.5033619403839111
     9     1.006394e+03     8.838980e+00
 * time: 0.50736403465271
    10     1.006061e+03     8.916639e+00
 * time: 0.5564849376678467
    11     1.005287e+03     8.898501e+00
 * time: 0.5603599548339844
    12     1.003673e+03     1.594601e+01
 * time: 0.5641708374023438
    13     1.000433e+03     3.264510e+01
 * time: 0.5680558681488037
    14     9.939620e+02     5.680776e+01
 * time: 0.5722169876098633
    15     9.920492e+02     8.189008e+01
 * time: 0.576685905456543
    16     9.853470e+02     4.792287e+01
 * time: 0.5812950134277344
    17     9.821580e+02     4.099167e+01
 * time: 0.5848639011383057
    18     9.784445e+02     4.359738e+01
 * time: 0.5891108512878418
    19     9.753844e+02     1.715016e+01
 * time: 0.593580961227417
    20     9.742523e+02     1.244736e+01
 * time: 0.5968108177185059
    21     9.734762e+02     1.086879e+01
 * time: 0.6004559993743896
    22     9.729031e+02     1.529972e+01
 * time: 0.6033468246459961
    23     9.714972e+02     2.051054e+01
 * time: 0.6350619792938232
    24     9.702763e+02     1.703802e+01
 * time: 0.6389219760894775
    25     9.693945e+02     1.242588e+01
 * time: 0.6424579620361328
    26     9.690627e+02     1.193813e+01
 * time: 0.6457438468933105
    27     9.687959e+02     1.049254e+01
 * time: 0.6491608619689941
    28     9.683343e+02     7.801000e+00
 * time: 0.6526038646697998
    29     9.667001e+02     1.096197e+01
 * time: 0.656203031539917
    30     9.660129e+02     9.792112e+00
 * time: 0.6595869064331055
    31     9.655534e+02     9.823330e+00
 * time: 0.6630709171295166
    32     9.651971e+02     1.059550e+01
 * time: 0.6663739681243896
    33     9.636185e+02     1.011640e+01
 * time: 0.6699228286743164
    34     9.621257e+02     7.727968e+00
 * time: 0.6733508110046387
    35     9.603739e+02     9.857407e+00
 * time: 0.6769578456878662
    36     9.603277e+02     1.508837e+01
 * time: 0.680668830871582
    37     9.598745e+02     3.570285e-01
 * time: 0.6843478679656982
    38     9.598694e+02     2.341098e-01
 * time: 0.7095229625701904
    39     9.598690e+02     9.077958e-02
 * time: 0.712709903717041
    40     9.598690e+02     3.615731e-02
 * time: 0.715569019317627
    41     9.598690e+02     3.631911e-03
 * time: 0.7184388637542725
    42     9.598690e+02     3.934849e-04
 * time: 0.7210068702697754
FittedPumasModel

Successful minimization:                      true

Likelihood approximation:                     FOCE
Likelihood Optimizer:                         BFGS
Dynamical system type:                 Closed form

Log-likelihood value:                   -959.86896
Number of subjects:                             20
Number of parameters:         Fixed      Optimized
                                  0              6
Observation records:         Active        Missing
    CONC:                       220              0
    Total:                      220              0

---------------------
           Estimate
---------------------
θcl         0.024451
θvc         0.074289
Ω₁,₁        0.072037
Ω₂,₂        0.09384
σ_add       3.2726
σ_prop      0.10228
---------------------

5 Model diagnostics

As usual, we use the inspect function to calculate all diagnostics.

inf1cmt_insp = inspect(inf1cmt_results)
[ Info: Calculating predictions.
[ Info: Calculating weighted residuals.
[ Info: Calculating empirical bayes.
[ Info: Evaluating individual parameters.
[ Info: Evaluating dose control parameters.
[ Info: Done.
FittedPumasModelInspection

Fitting was successful: true
Likehood approximation used for weighted residuals : Pumas.FOCE{Optim.NewtonTrustRegion{Float64}, Optim.Options{Float64, Nothing}}(Optim.NewtonTrustRegion{Float64}(1.0, 100.0, 1.4901161193847656e-8, 0.1, 0.25, 0.75, false), Optim.Options(x_abstol = 0.0, x_reltol = 0.0, f_abstol = 0.0, f_reltol = 0.0, g_abstol = 1.0e-5, g_reltol = 1.0e-8, outer_x_abstol = 0.0, outer_x_reltol = 0.0, outer_f_abstol = 0.0, outer_f_reltol = 0.0, outer_g_abstol = 1.0e-8, outer_g_reltol = 1.0e-8, f_calls_limit = 0, g_calls_limit = 0, h_calls_limit = 0, allow_f_increases = false, allow_outer_f_increases = true, successive_f_tol = 1, iterations = 1000, outer_iterations = 1000, store_trace = false, trace_simplex = false, show_trace = false, extended_trace = false, show_every = 1, time_limit = NaN, )
)

These can be saved to a file by constructing a table representation of everything from predictions to weighted residuals and empirical bayes estimes and individual coefficients (POSTHOC in NONMEM).

df_inspect = DataFrame(inf1cmt_insp)
CSV.write("inspect_file.csv", df_inspect)
"inspect_file.csv"

Besides mean predictions, it is also simple to simulate from the estimated model using the empirical bayes estimates as the values for the random effects.

sim_plot(simobs(inf1cmt, pk_population, coef(inf1cmt_results)))

For the PD model we need individual CL and Vc values.

icoef_dataframe = unique(df_inspect[!, [:id, :time, :CL, :Vc]], :id)
rename!(icoef_dataframe, :CL => :CLi, :Vc => :Vci)
20×4 DataFrame
Row id time CLi Vci
String Float64 Float64? Float64?
1 1 0.0 0.0154794 0.0879781
2 10 0.0 0.0308652 0.0566826
3 11 0.0 0.028236 0.0814447
4 12 0.0 0.0397456 0.0597957
5 13 0.0 0.021964 0.0764398
6 14 0.0 0.0233953 0.115324
7 15 0.0 0.0270355 0.0653006
8 16 0.0 0.0253244 0.0579478
9 17 0.0 0.0278282 0.144549
10 18 0.0 0.0400327 0.0813417
11 19 0.0 0.0183681 0.0723819
12 2 0.0 0.0191042 0.0920158
13 20 0.0 0.0276561 0.0533032
14 3 0.0 0.0156637 0.0753704
15 4 0.0 0.0260312 0.0691899
16 5 0.0 0.0284244 0.103891
17 6 0.0 0.0245165 0.094743
18 7 0.0 0.0153045 0.0360822
19 8 0.0 0.0261443 0.0750091
20 9 0.0 0.0248482 0.0555691

6 Getting the data

The data file consists of data obtained from 10 individuals who were treated with 500mg dose TID (three times a day, every eight hours) for five days. The dataset exists in the PharmaDatasets package and we load it into memory as a DataFrame. We specify that the first column should be a String because we want to join the individual parameters from the PK step to the PD data, and the id column of the DataFrame from inspect is a String column. We use the first(input, number_of_elements) function to show the first 10 rows of the DataFrame.

pddata = CSV.read("CS3_IVINFPDEST.csv", DataFrame; header = 5, types = Dict(1 => String))
rename!(pddata, :CID => :id, :TIME => :time, :AMT => :amt, :CMT => :cmt)
@rtransform!(pddata, :evid = :amt == 0 ? 0 : 1)
@rtransform!(pddata, :HIST = :evid == 1 ? missing : :HIST)
first(pddata, 10)
10×10 DataFrame
Row id time HIST amt cmt RATE MDV CLI VI evid
String Float64 Float64? Int64 Int64 Float64 Int64 Float64 Float64 Int64
1 1 0.0 missing 100 1 16.7 1 15.585 90.812 1
2 1 0.0 missing 1 2 0.0 1 15.585 90.812 1
3 1 0.0 13.008 0 2 0.0 0 15.585 90.812 0
4 1 0.5 13.808 0 2 0.0 0 15.585 90.812 0
5 1 1.0 8.6859 0 2 0.0 0 15.585 90.812 0
6 1 3.0 6.2601 0 2 0.0 0 15.585 90.812 0
7 1 5.0 4.0602 0 2 0.0 0 15.585 90.812 0
8 1 6.0 4.4985 0 2 0.0 0 15.585 90.812 0
9 1 8.0 3.2736 0 2 0.0 0 15.585 90.812 0
10 1 12.0 2.6026 0 2 0.0 0 15.585 90.812 0

The file contains 11 columns:

pd_dataframe = outerjoin(pddata, icoef_dataframe; on = [:id, :time])
sort!(pd_dataframe, [:id, :time])
280×12 DataFrame
255 rows omitted
Row id time HIST amt cmt RATE MDV CLI VI evid CLi Vci
String Float64 Float64? Int64? Int64? Float64? Int64? Float64? Float64? Int64? Float64? Float64?
1 1 0.0 missing 100 1 16.7 1 15.585 90.812 1 0.0154794 0.0879781
2 1 0.0 missing 1 2 0.0 1 15.585 90.812 1 0.0154794 0.0879781
3 1 0.0 13.008 0 2 0.0 0 15.585 90.812 0 0.0154794 0.0879781
4 1 0.5 13.808 0 2 0.0 0 15.585 90.812 0 missing missing
5 1 1.0 8.6859 0 2 0.0 0 15.585 90.812 0 missing missing
6 1 3.0 6.2601 0 2 0.0 0 15.585 90.812 0 missing missing
7 1 5.0 4.0602 0 2 0.0 0 15.585 90.812 0 missing missing
8 1 6.0 4.4985 0 2 0.0 0 15.585 90.812 0 missing missing
9 1 8.0 3.2736 0 2 0.0 0 15.585 90.812 0 missing missing
10 1 12.0 2.6026 0 2 0.0 0 15.585 90.812 0 missing missing
11 1 15.0 2.3422 0 2 0.0 0 15.585 90.812 0 missing missing
12 1 18.0 3.8008 0 2 0.0 0 15.585 90.812 0 missing missing
13 1 24.0 7.1397 0 2 0.0 0 15.585 90.812 0 missing missing
269 9 0.0 34.608 0 2 0.0 0 24.809 56.453 0 0.0248482 0.0555691
270 9 0.5 29.57 0 2 0.0 0 24.809 56.453 0 missing missing
271 9 1.0 27.68 0 2 0.0 0 24.809 56.453 0 missing missing
272 9 3.0 18.397 0 2 0.0 0 24.809 56.453 0 missing missing
273 9 5.0 14.908 0 2 0.0 0 24.809 56.453 0 missing missing
274 9 6.0 11.669 0 2 0.0 0 24.809 56.453 0 missing missing
275 9 8.0 8.5475 0 2 0.0 0 24.809 56.453 0 missing missing
276 9 12.0 16.895 0 2 0.0 0 24.809 56.453 0 missing missing
277 9 15.0 21.326 0 2 0.0 0 24.809 56.453 0 missing missing
278 9 18.0 26.131 0 2 0.0 0 24.809 56.453 0 missing missing
279 9 24.0 26.278 0 2 0.0 0 24.809 56.453 0 missing missing
280 9 30.0 39.643 0 2 0.0 0 24.809 56.453 0 missing missing

7 Converting the DataFrame to a collection of Subjects

population = read_pumas(pd_dataframe; observations = [:HIST], covariates = [:CLi, :Vci])
Population
  Subjects: 20
  Covariates: CLi, Vci
  Observations: HIST

8 IDR model

irm1 = @model begin
    @metadata begin
        desc = "POPULATION PK-PD MODELING"
        timeu = u"hr" # hour
    end
    @param begin
        tvkin  RealDomain(lower = 0)
        tvkout  RealDomain(lower = 0)
        tvic50  RealDomain(lower = 0)
        tvimax  RealDomain(lower = 0)
        Ω  PDiagDomain(3)
        σ_add_pd  RealDomain(lower = 0)
        σ_prop_pd  RealDomain(lower = 0)
    end

    @random begin
        η ~ MvNormal(Ω)
    end

    @covariates CLi Vci

    @pre begin
        kin = tvkin * exp(η[1])
        kout = tvkout * exp(η[2])
        bsl = kin / kout
        ic50 = tvic50 * exp(η[3])
        imax = tvimax
        CL = CLi
        Vc = Vci
    end

    @init begin
        Response = bsl
    end

    @dynamics begin
        Central' = -CL / Vc * Central
        Response' =
            kin * (1 - imax * (Central / Vc) / (ic50 + Central / Vc)) - kout * Response
    end

    @derived begin
        HIST ~ @. Normal(Response, sqrt(σ_add_pd^2 + (Response * σ_prop_pd)^2))
    end
end
PumasModel
  Parameters: tvkin, tvkout, tvic50, tvimax, Ω, σ_add_pd, σ_prop_pd
  Random effects: η
  Covariates: CLi, Vci
  Dynamical system variables: Central, Response
  Dynamical system type: Nonlinear ODE
  Derived: HIST
  Observed: HIST
init_θ = (
    tvkin = 5.4,
    tvkout = 0.3,
    tvic50 = 3.9,
    tvimax = 1.0,
    Ω = Diagonal([0.2, 0.2, 0.2]),
    σ_add_pd = 0.05,
    σ_prop_pd = 0.05,
)
(tvkin = 5.4,
 tvkout = 0.3,
 tvic50 = 3.9,
 tvimax = 1.0,
 Ω = [0.2 0.0 0.0; 0.0 0.2 0.0; 0.0 0.0 0.2],
 σ_add_pd = 0.05,
 σ_prop_pd = 0.05,)
irm1_results = fit(
    irm1,
    population,
    init_θ,
    Pumas.FOCE();
    constantcoef = (tvimax = 1.0,),
    optim_options = (show_every = 10,),
)
[ 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     1.625453e+03     2.073489e+03
 * time: 7.700920104980469e-5
    10     5.899604e+02     6.134653e+00
 * time: 0.7545020580291748
    20     5.824375e+02     2.641101e+01
 * time: 1.4005329608917236
    30     5.801204e+02     1.223992e+00
 * time: 2.055785894393921
    40     5.798576e+02     5.986550e-01
 * time: 2.621187925338745
    50     5.668945e+02     6.290122e+00
 * time: 3.201838970184326
    60     5.591273e+02     5.076031e+00
 * time: 3.814880847930908
    70     5.559638e+02     3.255237e-04
 * time: 4.427348852157593
FittedPumasModel

Successful minimization:                      true

Likelihood approximation:                     FOCE
Likelihood Optimizer:                         BFGS
Dynamical system type:               Nonlinear ODE
Solver(s):(OrdinaryDiffEq.Vern7,OrdinaryDiffEq.Rodas5)

Log-likelihood value:                   -555.96385
Number of subjects:                             20
Number of parameters:         Fixed      Optimized
                                  1              8
Observation records:         Active        Missing
    HIST:                       240              0
    Total:                      240              0

------------------------
              Estimate
------------------------
tvkin          5.5533
tvkout         0.27864
tvic50        30.427
tvimax         1.0
Ω₁,₁           0.18348
Ω₂,₂           0.067395
Ω₃,₃           0.20683
σ_add_pd       1.1094
σ_prop_pd      0.1038
------------------------
irm1_insp = inspect(irm1_results)
goodness_of_fit(irm1_insp)
[ Info: Calculating predictions.
[ Info: Calculating weighted residuals.
[ Info: Calculating empirical bayes.
[ Info: Evaluating individual parameters.
[ Info: Evaluating dose control parameters.
[ Info: Done.

9 Conclusion

In this tutorial, we saw how to map from data to a Population, how to formulate a model of oral administrationand fit it, and how to use built-in functionality to assess the quality of the formulated model. We also saw some advanced features such as bootstrap and SIR inference, VPC plots, and simulations.