# Statistical specification for a Regression with continuous finite range count like data

I am interested in explaining what kind of personal characteristics and work environment variables are associated with sickness absenteeism.

My dependent variable is the total number of days a given employee falls sick.

My question is twofold:

1. Given that not all employees are present for the same amount of time (in months or days) over a year, should I account for this difference in number of days at the office by:

• including the number of days as a covariate (DV is thus a discrete count ),
• or by rescaling my dependent variable ($$DV = \frac{nb-days-sick}{nb-days-supposed-to-be-working}$$, i.e. a continuous DV)?

1. (Depending on the answer to the first question) Which statistical specification is most appropriate in this context?

Many employees never fell sick and hence there are many 0s, but they could have fell sick; hence hurdle models do not seem appropriate. There are also some extreme values, with some employees being sick for most or all of the year. See above the distribution of the original and rescaled dependent variable.

I thought about using a log transformation ($$log(DV+1)$$) for my rescaled DV but the distribution is still not normal (see below)

If I use the rescaled DV then usual count model (Negative Binomial, zero-inflated Poisson) are no longer appropriate. I also thought about a Tobit model but non-0 value would then need to be distributed under a Weibull or Exponential distribution. Any thoughts?

My knowledge of these distributions is very limited and it would be great to receive some feedback! I am using R; mostly glm, AER and vglm so far.

Since your response is a count, I would start out with Poisson regression, but maybe later change to some similar model, like quasi-Poisson, negative binomial or versions of these admitting excess zeros. But here I will concentrate on the Poisson regression model, and the aspects I will discuss will apply equally to those alternatives.

You should definitely take into account the number of working days in a year specified by each workers contract (that is, giving the "opportunity"'s for being absent.) The way to doing that with Poisson regression is with an offset, for details see Poisson regression on devices that fail during observation period? and a lot of other posts here ...