This function uses saemix::saemix() as a backend for fitting nonlinear mixed effects models created from mmkin row objects using the Stochastic Approximation Expectation Maximisation algorithm (SAEM).

saem(object, ...)

# S3 method for mmkin
saem(
  object,
  transformations = c("mkin", "saemix"),
  degparms_start = numeric(),
  test_log_parms = TRUE,
  conf.level = 0.6,
  solution_type = "auto",
  nbiter.saemix = c(300, 100),
  control = list(displayProgress = FALSE, print = FALSE, nbiter.saemix = nbiter.saemix,
    save = FALSE, save.graphs = FALSE),
  fail_with_errors = TRUE,
  verbose = FALSE,
  quiet = FALSE,
  ...
)

# S3 method for saem.mmkin
print(x, digits = max(3, getOption("digits") - 3), ...)

saemix_model(
  object,
  solution_type = "auto",
  transformations = c("mkin", "saemix"),
  degparms_start = numeric(),
  test_log_parms = FALSE,
  conf.level = 0.6,
  verbose = FALSE,
  ...
)

saemix_data(object, verbose = FALSE, ...)

Arguments

object

An mmkin row object containing several fits of the same mkinmod model to different datasets

...

Further parameters passed to saemix::saemixModel.

transformations

Per default, all parameter transformations are done in mkin. If this argument is set to 'saemix', parameter transformations are done in 'saemix' for the supported cases, i.e. (as of version 1.1.2) SFO, FOMC, DFOP and HS without fixing parent_0, and SFO or DFOP with one SFO metabolite.

degparms_start

Parameter values given as a named numeric vector will be used to override the starting values obtained from the 'mmkin' object.

test_log_parms

If TRUE, an attempt is made to use more robust starting values for population parameters fitted as log parameters in mkin (like rate constants) by only considering rate constants that pass the t-test when calculating mean degradation parameters using mean_degparms.

conf.level

Possibility to adjust the required confidence level for parameter that are tested if requested by 'test_log_parms'.

solution_type

Possibility to specify the solution type in case the automatic choice is not desired

nbiter.saemix

Convenience option to increase the number of iterations

control

Passed to saemix::saemix.

fail_with_errors

Should a failure to compute standard errors from the inverse of the Fisher Information Matrix be a failure?

verbose

Should we print information about created objects of type saemix::SaemixModel and saemix::SaemixData?

quiet

Should we suppress the messages saemix prints at the beginning and the end of the optimisation process?

x

An saem.mmkin object to print

digits

Number of digits to use for printing

Value

An S3 object of class 'saem.mmkin', containing the fitted saemix::SaemixObject as a list component named 'so'. The object also inherits from 'mixed.mmkin'.

An saemix::SaemixModel object.

An saemix::SaemixData object.

Details

An mmkin row object is essentially a list of mkinfit objects that have been obtained by fitting the same model to a list of datasets using mkinfit.

Starting values for the fixed effects (population mean parameters, argument psi0 of saemix::saemixModel() are the mean values of the parameters found using mmkin.

Examples

# \dontrun{
ds <- lapply(experimental_data_for_UBA_2019[6:10],
 function(x) subset(x$data[c("name", "time", "value")]))
names(ds) <- paste("Dataset", 6:10)
f_mmkin_parent_p0_fixed <- mmkin("FOMC", ds,
  state.ini = c(parent = 100), fixed_initials = "parent", quiet = TRUE)
f_saem_p0_fixed <- saem(f_mmkin_parent_p0_fixed)

f_mmkin_parent <- mmkin(c("SFO", "FOMC", "DFOP"), ds, quiet = TRUE)
f_saem_sfo <- saem(f_mmkin_parent["SFO", ])
f_saem_fomc <- saem(f_mmkin_parent["FOMC", ])
f_saem_dfop <- saem(f_mmkin_parent["DFOP", ])
illparms(f_saem_dfop)
#> [1] "sd(g_qlogis)"
update(f_saem_dfop, covariance.model = diag(c(1, 1, 1, 0)))
#> Kinetic nonlinear mixed-effects model fit by SAEM
#> Structural model:
#> d_parent/dt = - ((k1 * g * exp(-k1 * time) + k2 * (1 - g) * exp(-k2 *
#>            time)) / (g * exp(-k1 * time) + (1 - g) * exp(-k2 * time)))
#>            * parent
#> 
#> Data:
#> 90 observations of 1 variable(s) grouped in 5 datasets
#> 
#> Likelihood computed by importance sampling
#>     AIC   BIC logLik
#>   490.6 487.5 -237.3
#> 
#> Fitted parameters:
#>             estimate   lower   upper
#> parent_0      93.902 91.3695 96.4339
#> log_k1        -2.936 -3.9950 -1.8762
#> log_k2        -3.091 -4.9290 -1.2523
#> g_qlogis      -0.366 -0.6484 -0.0836
#> a.1            2.385  2.0033  2.7664
#> SD.parent_0    2.476  0.3890  4.5623
#> SD.log_k1      1.195  0.4381  1.9517
#> SD.log_k2      2.092  0.7906  3.3932
AIC(f_saem_dfop)
#> [1] 493.9811

# The returned saem.mmkin object contains an SaemixObject, therefore we can use
# functions from saemix
library(saemix)
#> Loading required package: npde
#> Package saemix, version 3.1
#>   please direct bugs, questions and feedback to emmanuelle.comets@inserm.fr
#> 
#> Attaching package: ‘saemix’
#> The following objects are masked from ‘package:npde’:
#> 
#>     kurtosis, skewness
compare.saemix(f_saem_sfo$so, f_saem_fomc$so, f_saem_dfop$so)
#> Likelihoods calculated by importance sampling
#>        AIC      BIC
#> 1 624.2598 622.3070
#> 2 467.8664 465.1324
#> 3 493.9811 490.4660
plot(f_saem_fomc$so, plot.type = "convergence")

plot(f_saem_fomc$so, plot.type = "individual.fit")

plot(f_saem_fomc$so, plot.type = "npde")
#> Simulating data using nsim = 1000 simulated datasets
#> Computing WRES and npde .
#> Please use npdeSaemix to obtain VPC and npde
plot(f_saem_fomc$so, plot.type = "vpc")


f_mmkin_parent_tc <- update(f_mmkin_parent, error_model = "tc")
f_saem_fomc_tc <- saem(f_mmkin_parent_tc["FOMC", ])
compare.saemix(f_saem_fomc$so, f_saem_fomc_tc$so)
#> Likelihoods calculated by importance sampling
#>        AIC      BIC
#> 1 467.8664 465.1324
#> 2 469.9096 466.7851

sfo_sfo <- mkinmod(parent = mkinsub("SFO", "A1"),
  A1 = mkinsub("SFO"))
#> Temporary DLL for differentials generated and loaded
fomc_sfo <- mkinmod(parent = mkinsub("FOMC", "A1"),
  A1 = mkinsub("SFO"))
#> Temporary DLL for differentials generated and loaded
dfop_sfo <- mkinmod(parent = mkinsub("DFOP", "A1"),
  A1 = mkinsub("SFO"))
#> Temporary DLL for differentials generated and loaded
# The following fit uses analytical solutions for SFO-SFO and DFOP-SFO,
# and compiled ODEs for FOMC that are much slower
f_mmkin <- mmkin(list(
    "SFO-SFO" = sfo_sfo, "FOMC-SFO" = fomc_sfo, "DFOP-SFO" = dfop_sfo),
  ds, quiet = TRUE)
# saem fits of SFO-SFO and DFOP-SFO to these data take about five seconds
# each on this system, as we use analytical solutions written for saemix.
# When using the analytical solutions written for mkin this took around
# four minutes
f_saem_sfo_sfo <- saem(f_mmkin["SFO-SFO", ])
f_saem_dfop_sfo <- saem(f_mmkin["DFOP-SFO", ])
# We can use print, plot and summary methods to check the results
print(f_saem_dfop_sfo)
#> Kinetic nonlinear mixed-effects model fit by SAEM
#> Structural model:
#> d_parent/dt = - ((k1 * g * exp(-k1 * time) + k2 * (1 - g) * exp(-k2 *
#>            time)) / (g * exp(-k1 * time) + (1 - g) * exp(-k2 * time)))
#>            * parent
#> d_A1/dt = + f_parent_to_A1 * ((k1 * g * exp(-k1 * time) + k2 * (1 - g)
#>            * exp(-k2 * time)) / (g * exp(-k1 * time) + (1 - g) *
#>            exp(-k2 * time))) * parent - k_A1 * A1
#> 
#> Data:
#> 170 observations of 2 variable(s) grouped in 5 datasets
#> 
#> Likelihood computed by importance sampling
#>   AIC   BIC logLik
#>   842 836.9   -408
#> 
#> Fitted parameters:
#>                    estimate   lower   upper
#> parent_0            93.7701 91.1458 96.3945
#> log_k_A1            -5.8116 -7.5998 -4.0234
#> f_parent_qlogis     -0.9608 -1.3654 -0.5562
#> log_k1              -2.5841 -3.6876 -1.4805
#> log_k2              -3.5228 -5.3254 -1.7203
#> g_qlogis            -0.1027 -0.8719  0.6665
#> a.1                  1.8856  1.6676  2.1037
#> SD.parent_0          2.7682  0.7668  4.7695
#> SD.log_k_A1          1.7447  0.4047  3.0848
#> SD.f_parent_qlogis   0.4525  0.1620  0.7431
#> SD.log_k1            1.2423  0.4560  2.0285
#> SD.log_k2            2.0390  0.7601  3.3180
#> SD.g_qlogis          0.4439 -0.3069  1.1947
plot(f_saem_dfop_sfo)

summary(f_saem_dfop_sfo, data = TRUE)
#> saemix version used for fitting:      3.1 
#> mkin version used for pre-fitting:  1.1.2 
#> R version used for fitting:         4.2.1 
#> Date of fit:     Wed Aug 10 13:15:20 2022 
#> Date of summary: Wed Aug 10 13:15:20 2022 
#> 
#> Equations:
#> d_parent/dt = - ((k1 * g * exp(-k1 * time) + k2 * (1 - g) * exp(-k2 *
#>            time)) / (g * exp(-k1 * time) + (1 - g) * exp(-k2 * time)))
#>            * parent
#> d_A1/dt = + f_parent_to_A1 * ((k1 * g * exp(-k1 * time) + k2 * (1 - g)
#>            * exp(-k2 * time)) / (g * exp(-k1 * time) + (1 - g) *
#>            exp(-k2 * time))) * parent - k_A1 * A1
#> 
#> Data:
#> 170 observations of 2 variable(s) grouped in 5 datasets
#> 
#> Model predictions using solution type analytical 
#> 
#> Fitted in 9.258 s
#> Using 300, 100 iterations and 10 chains
#> 
#> Variance model: Constant variance 
#> 
#> Mean of starting values for individual parameters:
#>        parent_0        log_k_A1 f_parent_qlogis          log_k1          log_k2 
#>         93.8102         -5.3734         -0.9711         -1.8799         -4.2708 
#>        g_qlogis 
#>          0.1356 
#> 
#> Fixed degradation parameter values:
#> None
#> 
#> Results:
#> 
#> Likelihood computed by importance sampling
#>   AIC   BIC logLik
#>   842 836.9   -408
#> 
#> Optimised parameters:
#>                    est.   lower   upper
#> parent_0        93.7701 91.1458 96.3945
#> log_k_A1        -5.8116 -7.5998 -4.0234
#> f_parent_qlogis -0.9608 -1.3654 -0.5562
#> log_k1          -2.5841 -3.6876 -1.4805
#> log_k2          -3.5228 -5.3254 -1.7203
#> g_qlogis        -0.1027 -0.8719  0.6665
#> 
#> Correlation: 
#>                 parnt_0 lg_k_A1 f_prnt_ log_k1  log_k2 
#> log_k_A1        -0.0160                                
#> f_parent_qlogis -0.0263  0.0612                        
#> log_k1           0.0100 -0.0014 -0.0033                
#> log_k2           0.0131  0.0050 -0.0011  0.0071        
#> g_qlogis        -0.0419 -0.0199  0.0026 -0.0765 -0.0707
#> 
#> Random effects:
#>                      est.   lower  upper
#> SD.parent_0        2.7682  0.7668 4.7695
#> SD.log_k_A1        1.7447  0.4047 3.0848
#> SD.f_parent_qlogis 0.4525  0.1620 0.7431
#> SD.log_k1          1.2423  0.4560 2.0285
#> SD.log_k2          2.0390  0.7601 3.3180
#> SD.g_qlogis        0.4439 -0.3069 1.1947
#> 
#> Variance model:
#>      est. lower upper
#> a.1 1.886 1.668 2.104
#> 
#> Backtransformed parameters:
#>                     est.     lower    upper
#> parent_0       93.770115 9.115e+01 96.39447
#> k_A1            0.002993 5.005e-04  0.01789
#> f_parent_to_A1  0.276720 2.034e-01  0.36443
#> k1              0.075467 2.503e-02  0.22753
#> k2              0.029516 4.867e-03  0.17902
#> g               0.474353 2.949e-01  0.66073
#> 
#> Resulting formation fractions:
#>                 ff
#> parent_A1   0.2767
#> parent_sink 0.7233
#> 
#> Estimated disappearance times:
#>          DT50   DT90 DT50back DT50_k1 DT50_k2
#> parent  14.56  58.26    17.54   9.185   23.48
#> A1     231.62 769.41       NA      NA      NA
#> 
#> Data:
#>          ds   name time observed predicted residual   std standardized
#>   Dataset 6 parent    0     97.2  95.78623  1.41377 1.886     0.749758
#>   Dataset 6 parent    0     96.4  95.78623  0.61377 1.886     0.325498
#>   Dataset 6 parent    3     71.1  71.34666 -0.24666 1.886    -0.130812
#>   Dataset 6 parent    3     69.2  71.34666 -2.14666 1.886    -1.138429
#>   Dataset 6 parent    6     58.1  56.49768  1.60232 1.886     0.849749
#>   Dataset 6 parent    6     56.6  56.49768  0.10232 1.886     0.054262
#>   Dataset 6 parent   10     44.4  44.53511 -0.13511 1.886    -0.071650
#>   Dataset 6 parent   10     43.4  44.53511 -1.13511 1.886    -0.601974
#>   Dataset 6 parent   20     33.3  29.77451  3.52549 1.886     1.869656
#>   Dataset 6 parent   20     29.2  29.77451 -0.57451 1.886    -0.304675
#>   Dataset 6 parent   34     17.6  19.32540 -1.72540 1.886    -0.915023
#>   Dataset 6 parent   34     18.0  19.32540 -1.32540 1.886    -0.702894
#>   Dataset 6 parent   55     10.5  10.42781  0.07219 1.886     0.038282
#>   Dataset 6 parent   55      9.3  10.42781 -1.12781 1.886    -0.598107
#>   Dataset 6 parent   90      4.5   3.74190  0.75810 1.886     0.402037
#>   Dataset 6 parent   90      4.7   3.74190  0.95810 1.886     0.508102
#>   Dataset 6 parent  112      3.0   1.96485  1.03515 1.886     0.548966
#>   Dataset 6 parent  112      3.4   1.96485  1.43515 1.886     0.761096
#>   Dataset 6 parent  132      2.3   1.09395  1.20605 1.886     0.639596
#>   Dataset 6 parent  132      2.7   1.09395  1.60605 1.886     0.851726
#>   Dataset 6     A1    3      4.3   4.72702 -0.42702 1.886    -0.226458
#>   Dataset 6     A1    3      4.6   4.72702 -0.12702 1.886    -0.067361
#>   Dataset 6     A1    6      7.0   7.51314 -0.51314 1.886    -0.272128
#>   Dataset 6     A1    6      7.2   7.51314 -0.31314 1.886    -0.166063
#>   Dataset 6     A1   10      8.2   9.63719 -1.43719 1.886    -0.762179
#>   Dataset 6     A1   10      8.0   9.63719 -1.63719 1.886    -0.868244
#>   Dataset 6     A1   20     11.0  11.84931 -0.84931 1.886    -0.450409
#>   Dataset 6     A1   20     13.7  11.84931  1.85069 1.886     0.981468
#>   Dataset 6     A1   34     11.5  12.82336 -1.32336 1.886    -0.701808
#>   Dataset 6     A1   34     12.7  12.82336 -0.12336 1.886    -0.065418
#>   Dataset 6     A1   55     14.9  12.89456  2.00544 1.886     1.063533
#>   Dataset 6     A1   55     14.5  12.89456  1.60544 1.886     0.851403
#>   Dataset 6     A1   90     12.1  11.55919  0.54081 1.886     0.286806
#>   Dataset 6     A1   90     12.3  11.55919  0.74081 1.886     0.392871
#>   Dataset 6     A1  112      9.9  10.42334 -0.52334 1.886    -0.277539
#>   Dataset 6     A1  112     10.2  10.42334 -0.22334 1.886    -0.118442
#>   Dataset 6     A1  132      8.8   9.37987 -0.57987 1.886    -0.307519
#>   Dataset 6     A1  132      7.8   9.37987 -1.57987 1.886    -0.837844
#>   Dataset 7 parent    0     93.6  90.95702  2.64298 1.886     1.401639
#>   Dataset 7 parent    0     92.3  90.95702  1.34298 1.886     0.712217
#>   Dataset 7 parent    3     87.0  84.77506  2.22494 1.886     1.179942
#>   Dataset 7 parent    3     82.2  84.77506 -2.57506 1.886    -1.365616
#>   Dataset 7 parent    7     74.0  77.60962 -3.60962 1.886    -1.914268
#>   Dataset 7 parent    7     73.9  77.60962 -3.70962 1.886    -1.967301
#>   Dataset 7 parent   14     64.2  67.50646 -3.30646 1.886    -1.753499
#>   Dataset 7 parent   14     69.5  67.50646  1.99354 1.886     1.057221
#>   Dataset 7 parent   30     54.0  52.48909  1.51091 1.886     0.801271
#>   Dataset 7 parent   30     54.6  52.48909  2.11091 1.886     1.119465
#>   Dataset 7 parent   60     41.1  39.54372  1.55628 1.886     0.825335
#>   Dataset 7 parent   60     38.4  39.54372 -1.14372 1.886    -0.606542
#>   Dataset 7 parent   90     32.5  33.87968 -1.37968 1.886    -0.731676
#>   Dataset 7 parent   90     35.5  33.87968  1.62032 1.886     0.859298
#>   Dataset 7 parent  120     28.1  30.41071 -2.31071 1.886    -1.225427
#>   Dataset 7 parent  120     29.0  30.41071 -1.41071 1.886    -0.748135
#>   Dataset 7 parent  180     26.5  25.36386  1.13614 1.886     0.602524
#>   Dataset 7 parent  180     27.6  25.36386  2.23614 1.886     1.185881
#>   Dataset 7     A1    3      3.9   2.74863  1.15137 1.886     0.610600
#>   Dataset 7     A1    3      3.1   2.74863  0.35137 1.886     0.186341
#>   Dataset 7     A1    7      6.9   5.92686  0.97314 1.886     0.516081
#>   Dataset 7     A1    7      6.6   5.92686  0.67314 1.886     0.356983
#>   Dataset 7     A1   14     10.4  10.38800  0.01200 1.886     0.006362
#>   Dataset 7     A1   14      8.3  10.38800 -2.08800 1.886    -1.107320
#>   Dataset 7     A1   30     14.4  16.93529 -2.53529 1.886    -1.344524
#>   Dataset 7     A1   30     13.7  16.93529 -3.23529 1.886    -1.715751
#>   Dataset 7     A1   60     22.1  22.33044 -0.23044 1.886    -0.122209
#>   Dataset 7     A1   60     22.3  22.33044 -0.03044 1.886    -0.016144
#>   Dataset 7     A1   90     27.5  24.42300  3.07700 1.886     1.631809
#>   Dataset 7     A1   90     25.4  24.42300  0.97700 1.886     0.518127
#>   Dataset 7     A1  120     28.0  25.51140  2.48860 1.886     1.319768
#>   Dataset 7     A1  120     26.6  25.51140  1.08860 1.886     0.577313
#>   Dataset 7     A1  180     25.8  26.80282 -1.00282 1.886    -0.531818
#>   Dataset 7     A1  180     25.3  26.80282 -1.50282 1.886    -0.796981
#>   Dataset 8 parent    0     91.9  91.08733  0.81267 1.886     0.430980
#>   Dataset 8 parent    0     90.8  91.08733 -0.28733 1.886    -0.152377
#>   Dataset 8 parent    1     64.9  67.55332 -2.65332 1.886    -1.407123
#>   Dataset 8 parent    1     66.2  67.55332 -1.35332 1.886    -0.717701
#>   Dataset 8 parent    3     43.5  41.65811  1.84189 1.886     0.976800
#>   Dataset 8 parent    3     44.1  41.65811  2.44189 1.886     1.294994
#>   Dataset 8 parent    8     18.3  19.65773 -1.35773 1.886    -0.720038
#>   Dataset 8 parent    8     18.1  19.65773 -1.55773 1.886    -0.826103
#>   Dataset 8 parent   14     10.2  10.65118 -0.45118 1.886    -0.239269
#>   Dataset 8 parent   14     10.8  10.65118  0.14882 1.886     0.078925
#>   Dataset 8 parent   27      4.9   3.11694  1.78306 1.886     0.945601
#>   Dataset 8 parent   27      3.3   3.11694  0.18306 1.886     0.097082
#>   Dataset 8 parent   48      1.6   0.43165  1.16835 1.886     0.619603
#>   Dataset 8 parent   48      1.5   0.43165  1.06835 1.886     0.566570
#>   Dataset 8 parent   70      1.1   0.05441  1.04559 1.886     0.554503
#>   Dataset 8 parent   70      0.9   0.05441  0.84559 1.886     0.448438
#>   Dataset 8     A1    1      9.6   7.66431  1.93569 1.886     1.026546
#>   Dataset 8     A1    1      7.7   7.66431  0.03569 1.886     0.018930
#>   Dataset 8     A1    3     15.0  15.57948 -0.57948 1.886    -0.307311
#>   Dataset 8     A1    3     15.1  15.57948 -0.47948 1.886    -0.254279
#>   Dataset 8     A1    8     21.2  20.38988  0.81012 1.886     0.429625
#>   Dataset 8     A1    8     21.1  20.38988  0.71012 1.886     0.376593
#>   Dataset 8     A1   14     19.7  20.16439 -0.46439 1.886    -0.246276
#>   Dataset 8     A1   14     18.9  20.16439 -1.26439 1.886    -0.670535
#>   Dataset 8     A1   27     17.5  16.40918  1.09082 1.886     0.578489
#>   Dataset 8     A1   27     15.9  16.40918 -0.50918 1.886    -0.270030
#>   Dataset 8     A1   48      9.5  10.12011 -0.62011 1.886    -0.328861
#>   Dataset 8     A1   48      9.8  10.12011 -0.32011 1.886    -0.169764
#>   Dataset 8     A1   70      6.2   5.79080  0.40920 1.886     0.217011
#>   Dataset 8     A1   70      6.1   5.79080  0.30920 1.886     0.163979
#>   Dataset 9 parent    0     99.8  97.38786  2.41214 1.886     1.279218
#>   Dataset 9 parent    0     98.3  97.38786  0.91214 1.886     0.483731
#>   Dataset 9 parent    1     77.1  79.25431 -2.15431 1.886    -1.142481
#>   Dataset 9 parent    1     77.2  79.25431 -2.05431 1.886    -1.089449
#>   Dataset 9 parent    3     59.0  55.69866  3.30134 1.886     1.750781
#>   Dataset 9 parent    3     58.1  55.69866  2.40134 1.886     1.273489
#>   Dataset 9 parent    8     27.4  31.64893 -4.24893 1.886    -2.253314
#>   Dataset 9 parent    8     29.2  31.64893 -2.44893 1.886    -1.298729
#>   Dataset 9 parent   14     19.1  22.57316 -3.47316 1.886    -1.841901
#>   Dataset 9 parent   14     29.6  22.57316  7.02684 1.886     3.726507
#>   Dataset 9 parent   27     10.1  14.11345 -4.01345 1.886    -2.128430
#>   Dataset 9 parent   27     18.2  14.11345  4.08655 1.886     2.167199
#>   Dataset 9 parent   48      4.5   6.95586 -2.45586 1.886    -1.302400
#>   Dataset 9 parent   48      9.1   6.95586  2.14414 1.886     1.137093
#>   Dataset 9 parent   70      2.3   3.31753 -1.01753 1.886    -0.539619
#>   Dataset 9 parent   70      2.9   3.31753 -0.41753 1.886    -0.221424
#>   Dataset 9 parent   91      2.0   1.63642  0.36358 1.886     0.192816
#>   Dataset 9 parent   91      1.8   1.63642  0.16358 1.886     0.086751
#>   Dataset 9 parent  120      2.0   0.61667  1.38333 1.886     0.733614
#>   Dataset 9 parent  120      2.2   0.61667  1.58333 1.886     0.839679
#>   Dataset 9     A1    1      4.2   3.67247  0.52753 1.886     0.279763
#>   Dataset 9     A1    1      3.9   3.67247  0.22753 1.886     0.120666
#>   Dataset 9     A1    3      7.4   8.36240 -0.96240 1.886    -0.510385
#>   Dataset 9     A1    3      7.9   8.36240 -0.46240 1.886    -0.245223
#>   Dataset 9     A1    8     14.5  12.80590  1.69410 1.886     0.898422
#>   Dataset 9     A1    8     13.7  12.80590  0.89410 1.886     0.474162
#>   Dataset 9     A1   14     14.2  13.99625  0.20375 1.886     0.108053
#>   Dataset 9     A1   14     12.2  13.99625 -1.79625 1.886    -0.952596
#>   Dataset 9     A1   27     13.7  14.22730 -0.52730 1.886    -0.279641
#>   Dataset 9     A1   27     13.2  14.22730 -1.02730 1.886    -0.544803
#>   Dataset 9     A1   48     13.6  13.33713  0.26287 1.886     0.139406
#>   Dataset 9     A1   48     15.4  13.33713  2.06287 1.886     1.093991
#>   Dataset 9     A1   70     10.4  11.84008 -1.44008 1.886    -0.763708
#>   Dataset 9     A1   70     11.6  11.84008 -0.24008 1.886    -0.127318
#>   Dataset 9     A1   91     10.0  10.30732 -0.30732 1.886    -0.162980
#>   Dataset 9     A1   91      9.5  10.30732 -0.80732 1.886    -0.428142
#>   Dataset 9     A1  120      9.1   8.33981  0.76019 1.886     0.403149
#>   Dataset 9     A1  120      9.0   8.33981  0.66019 1.886     0.350117
#>  Dataset 10 parent    0     96.1  93.70349  2.39651 1.886     1.270926
#>  Dataset 10 parent    0     94.3  93.70349  0.59651 1.886     0.316342
#>  Dataset 10 parent    8     73.9  77.86253 -3.96253 1.886    -2.101429
#>  Dataset 10 parent    8     73.9  77.86253 -3.96253 1.886    -2.101429
#>  Dataset 10 parent   14     69.4  70.18665 -0.78665 1.886    -0.417182
#>  Dataset 10 parent   14     73.1  70.18665  2.91335 1.886     1.545019
#>  Dataset 10 parent   21     65.6  64.03245  1.56755 1.886     0.831308
#>  Dataset 10 parent   21     65.3  64.03245  1.26755 1.886     0.672210
#>  Dataset 10 parent   41     55.9  54.71491  1.18509 1.886     0.628480
#>  Dataset 10 parent   41     54.4  54.71491 -0.31491 1.886    -0.167007
#>  Dataset 10 parent   63     47.0  49.63436 -2.63436 1.886    -1.397065
#>  Dataset 10 parent   63     49.3  49.63436 -0.33436 1.886    -0.177319
#>  Dataset 10 parent   91     44.7  45.08853 -0.38853 1.886    -0.206049
#>  Dataset 10 parent   91     46.7  45.08853  1.61147 1.886     0.854600
#>  Dataset 10 parent  120     42.1  41.07653  1.02347 1.886     0.542772
#>  Dataset 10 parent  120     41.3  41.07653  0.22347 1.886     0.118513
#>  Dataset 10     A1    8      3.3   4.08295 -0.78295 1.886    -0.415218
#>  Dataset 10     A1    8      3.4   4.08295 -0.68295 1.886    -0.362186
#>  Dataset 10     A1   14      3.9   6.04367 -2.14367 1.886    -1.136841
#>  Dataset 10     A1   14      2.9   6.04367 -3.14367 1.886    -1.667165
#>  Dataset 10     A1   21      6.4   7.59693 -1.19693 1.886    -0.634761
#>  Dataset 10     A1   21      7.2   7.59693 -0.39693 1.886    -0.210502
#>  Dataset 10     A1   41      9.1   9.86436 -0.76436 1.886    -0.405361
#>  Dataset 10     A1   41      8.5   9.86436 -1.36436 1.886    -0.723555
#>  Dataset 10     A1   63     11.7  10.99397  0.70603 1.886     0.374425
#>  Dataset 10     A1   63     12.0  10.99397  1.00603 1.886     0.533522
#>  Dataset 10     A1   91     13.3  11.91274  1.38726 1.886     0.735696
#>  Dataset 10     A1   91     13.2  11.91274  1.28726 1.886     0.682663
#>  Dataset 10     A1  120     14.3  12.66519  1.63481 1.886     0.866981
#>  Dataset 10     A1  120     12.1  12.66519 -0.56519 1.886    -0.299733

# The following takes about 6 minutes
#f_saem_dfop_sfo_deSolve <- saem(f_mmkin["DFOP-SFO", ], solution_type = "deSolve",
#  control = list(nbiter.saemix = c(200, 80), nbdisplay = 10))

#saemix::compare.saemix(list(
#  f_saem_dfop_sfo$so,
#  f_saem_dfop_sfo_deSolve$so))

# If the model supports it, we can also use eigenvalue based solutions, which
# take a similar amount of time
#f_saem_sfo_sfo_eigen <- saem(f_mmkin["SFO-SFO", ], solution_type = "eigen",
#  control = list(nbiter.saemix = c(200, 80), nbdisplay = 10))
# }