I need to fit `Y_ij ~ NegBin(m_ij,k)`

, hence a negative binomial distribution to a count. However, the data I have observed are censored, I know the value of `y_ij`

, but it could be more than that value. Writting down the loglikelihood going with this problem is:

```
ll = \sum_{i=1}^n w_i (c_i log(P(Y_ij=y_ij|X_ij)) + (1- c_i) log(1- \sum_{k=1}^32 P(Y_ij = k|X_ij)))
```

Where `X_ij`

represent the design matrix (with the covariates of interest), `w_i`

is the weight for each observation, `y_ij`

is the response variable and `P(Y_ij=y_ij|Xij)`

is the negative binomial distribution where the `m_ij=exp(X_ij \beta)`

and `\alpha`

is the overdispersion parameter.

Does someone knows if there exist a build-in code in R that could be used to obtain this?