The purpose of this vignette is to present how to reproduce exactly the results from Decision Modelling for Health Economic Evaluation. While other vignettes such as vignette("c-homogeneous", "heemod"), vignette("d-non-homogeneous", "heemod") or vignette("e-probabilistic", "heemod") are greatly inspired from this book, key elements differ (mostly for the sake of clarity) and thus results differ, sometimes significantly, from the book. Here we show how to exactly reproduce the results with the heemod package.

HIV model

Key differences in DMHEE:

  1. transitions occur at the end of each year,
  2. cost are counted starting from year 1, not year 0,
  3. treatment stops after 2 years,
  4. rounding errors.

It is possible to reproduce 1. and 2. by making transition happen at the end of each year with method = “end”. Since with this method the transition occur 1 year after the beginning, costs should be discounted from the first cycle with the argument first = TRUE in discount(). Point 3. is reproduced by making rr and cost_lami a time changing variable like this rr = ifelse(markov_cycle <= 2, .509, 1.00).

The last point is reproduced by writing transition probabilities as fractions.

par_mod <- define_parameters(
  rr = ifelse(markov_cycle <= 2, .509, 1),
  cost_lami = ifelse(markov_cycle <= 2, 2086.5, 0),
  cost_zido = 2278
)

mat_mono <- define_transition(
  1251/1734, 350/1734, 116/1734,  17/1734,
  0,         731/1258, 512/1258,  15/1258,
  0,         0,        1312/1749, 437/1749,
  0,         0,        0,         1.00
)
## No named state -> generating names.
mat_comb <- define_transition(
  C, 350/1734*rr, 116/1734*rr, 17/1734*rr,
  0, C,           512/1258*rr, 15/1258*rr,
  0, 0,           C,           437/1749*rr,
  0, 0,           0,           1.00
)
## No named state -> generating names.
A_mono <- define_state(
  cost_health = 2756,
  cost_drugs = cost_zido,
  cost_total = discount(
    cost_health + cost_drugs, .06, first = T),
  life_year = 1
)
B_mono <- define_state(
  cost_health = 3052,
  cost_drugs = cost_zido,
  cost_total = discount(
    cost_health + cost_drugs, .06, first = T),
  life_year = 1
)
C_mono <- define_state(
  cost_health = 9007,
  cost_drugs = cost_zido,
  cost_total = discount(
    cost_health + cost_drugs, .06, first = T),
  life_year = 1
)
D_mono <- define_state(
  cost_health = 0,
  cost_drugs = 0,
  cost_total = discount(
    cost_health + cost_drugs, .06, first = T),
  life_year = 0
)

A_comb <- define_state(
  cost_health = 2756,
  cost_drugs = cost_zido + cost_lami,
  cost_total = discount(
    cost_health + cost_drugs, .06, first = T),
  life_year = 1
)
B_comb <- define_state(
  cost_health = 3052,
  cost_drugs = cost_zido + cost_lami,
  cost_total = discount(
    cost_health + cost_drugs, .06, first = T),
  life_year = 1
)
C_comb <- define_state(
  cost_health = 9007,
  cost_drugs = cost_zido + cost_lami,
  cost_total = discount(
    cost_health + cost_drugs, .06, first = T),
  life_year = 1
)
D_comb <- define_state(
  cost_health = 0,
  cost_drugs = 0,
  cost_total = discount(
    cost_health + cost_drugs, .06, first = T),
  life_year = 0
)

mod_mono <- define_strategy(
  transition = mat_mono,
  A_mono,
  B_mono,
  C_mono,
  D_mono
)
## No named state -> generating names.
mod_comb <- define_strategy(
  transition = mat_comb,
  A_comb,
  B_comb,
  C_comb,
  D_comb
)
## No named state -> generating names.
res_mod <- run_model(
  mono = mod_mono,
  comb = mod_comb,
  parameters = par_mod,
  cycles = 20,
  cost = cost_total,
  effect = life_year,
  method = "end",
  init = c(1, 0, 0, 0)
)
summary(res_mod)
## 2 strategies run for 20 cycles.
## 
## Initial state counts:
## 
## A = 1
## B = 0
## C = 0
## D = 0
## 
## Counting method: 'end'.
## 
## Values:
## 
##      cost_health cost_drugs cost_total life_year
## mono    45541.24   18203.97   44663.45  7.991207
## comb    48082.83   24492.28   50601.65  8.937389
## 
## Efficiency frontier:
## 
## mono -> comb
## 
## Differences:
## 
##      Cost Diff. Effect Diff.     ICER Ref.
## comb   5938.198    0.9461822 6275.956 mono

THR model

Key difference in DMHEE:

  1. Mortality rates are much higher in the book.

This can be corrected by using a user-specified mortality table and then fetch the values with:

look_up(death_prob, age = age, sex = sex, bin = "age")
# a function to return age-related mortality rate
# given age and sex
death_prob <- data.frame(
  age = rep(seq(35, 85, 10), each = 2),
  sex = rep(1:0, 6),
  value = c(
    1.51e-3, .99e-3, 3.93e-3,
    2.6e-3, 10.9e-3, 6.7e-3,
    31.6e-3, 19.3e-3, 80.1e-3,
    53.5e-3, 187.9e-3, 154.8e-3
  )
)
death_prob
##    age sex   value
## 1   35   1 0.00151
## 2   35   0 0.00099
## 3   45   1 0.00393
## 4   45   0 0.00260
## 5   55   1 0.01090
## 6   55   0 0.00670
## 7   65   1 0.03160
## 8   65   0 0.01930
## 9   75   1 0.08010
## 10  75   0 0.05350
## 11  85   1 0.18790
## 12  85   0 0.15480
param <- define_parameters(
    age_init = 60,
    sex = 0,
    # age increases with cycles
    age = age_init + markov_cycle,
    
    # operative mortality rates
    omrPTHR = .02,
    omrRTHR = .02,
    
    # re-revision mortality rate
    rrr = .04,
    
    # parameters for calculating primary revision rate
    cons = -5.490935,
    ageC = -.0367022,
    maleC = .768536,
    lambda = exp(cons + ageC * age_init + maleC * sex),
    lngamma = 0.3740968,
    gamma = exp(lngamma),
    lnrrNP1 = -1.344474,
    rrNP1 = exp(lnrrNP1),
   
    # revision probability of primary procedure
    standardRR = 1 - exp(lambda * ((markov_cycle - 1) ^ gamma -
                                     markov_cycle ^ gamma)),
    np1RR = 1 - exp(lambda * rrNP1 * ((markov_cycle - 1) ^ gamma - 
                                        markov_cycle ^ gamma)),
    
    # age-related mortality rate
    sex_cat = ifelse(sex == 0, "FMLE", "MLE"),
    mr = look_up(death_prob, age = age, sex = sex, bin = "age"),
    
    u_successP = .85,
    u_revisionTHR = .30,
    u_successR = .75,
    c_revisionTHR = 5294
)

mat_standard <- define_transition(
    state_names = c(
      "PrimaryTHR",
      "SuccessP",
      "RevisionTHR",
      "SuccessR",
      "Death"
    ),
    0, C, 0,          0, omrPTHR,
    0, C, standardRR, 0, mr,
    0, 0, 0,          C, omrRTHR+mr,
    0, 0, rrr,        C, mr,
    0, 0, 0,          0, 1
)

mat_np1 <- define_transition(
    state_names = c(
      "PrimaryTHR",
      "SuccessP",
      "RevisionTHR",
      "SuccessR",
      "Death"
    ),
    0, C, 0,     0, omrPTHR,
    0, C, np1RR, 0, mr,
    0, 0, 0,     C, omrRTHR+mr,
    0, 0, rrr,   C, mr,
    0, 0, 0,     0, 1
)

mod_standard <- define_strategy(
  transition = mat_standard,
  PrimaryTHR = define_state(
    utility = 0,
    cost = 394
  ),
  SuccessP = define_state(
    utility = discount(u_successP, .015),
    cost = 0
  ),
  RevisionTHR = define_state(
    utility = discount(u_revisionTHR, .015),
    cost = discount(c_revisionTHR, .06)
  ),
  SuccessR = define_state(
    utility = discount(u_successR, .015),
    cost = 0
  ),
  Death = define_state(
    utility = 0,
    cost = 0
  )
)

mod_np1 <- define_strategy(
  transition = mat_np1,
  PrimaryTHR = define_state(
    utility = 0,
    cost = 579
  ),
  SuccessP = define_state(
    utility = discount(u_successP, .015),
    cost = 0
  ),
  RevisionTHR = define_state(
    utility = discount(u_revisionTHR, .015),
    cost = discount(c_revisionTHR, .06)
  ),
  SuccessR = define_state(
    utility = discount(u_successR, .015),
    cost = 0
  ),
  Death = define_state(
    utility = 0,
    cost = 0
  )
)

res_mod <- run_model(
  standard = mod_standard,
  np1 = mod_np1,
  parameters = param,
  cycles = 60,
  cost = cost,
  effect = utility,
  method = "beginning",
  init = c(1, 0, 0, 0, 0)
)
summary(res_mod)
## 2 strategies run for 60 cycles.
## 
## Initial state counts:
## 
## PrimaryTHR = 1
## SuccessP = 0
## RevisionTHR = 0
## SuccessR = 0
## Death = 0
## 
## Counting method: 'beginning'.
## 
## Values:
## 
##           utility     cost
## standard 14.65283 512.4327
## np1      14.69734 610.3112
## 
## Efficiency frontier:
## 
## standard -> np1
## 
## Differences:
## 
##     Cost Diff. Effect Diff.     ICER     Ref.
## np1   97.87858   0.04451095 2198.977 standard