In a panel data tobit model,^[1][2] if the outcome ${\displaystyle Y_{i,t}}$  partially depends on the previous outcome history ${\displaystyle Y_{i,0},\ldots ,Y_{t-1}}$  this tobit model is called "dynamic". For instance, taking a person who finds a job with a high salary this year, it will be easier for her to find a job with a high salary next year because the fact that she has a high-wage job this year will be a very positive signal for the potential employers. The essence of this type of dynamic effect is the state dependence of the outcome. The "unobservable effects" here refers to the factor which partially determines the outcome of individual but cannot be observed in the data. For instance, the ability of a person is very important in job-hunting, but it is not observable for researchers. A typical dynamic unobserved effects tobit model can be represented as

${\displaystyle Y_{i,t}=Y_{i,t}^{1}[Y_{i,t}>0];}$ 

${\displaystyle Y_{i,t}=z_{i,t}\delta +\rho y_{i,t-1}+c_{i}+u_{i,t};}$ 

${\displaystyle c_{i}\mid y_{i,0},\ldots ,y_{i,t-1}\sim F(y_{i,0}x_{i});}$ 

${\displaystyle u_{i,t}\mid z_{i,t},y_{i,0},\ldots ,y_{i,t-1}\sim N(0,1).}$ 

In this specific model, ${\displaystyle \rho y_{i,t-1}}$  is the dynamic effect part and ${\displaystyle c_{i}}$  is the unobserved effect part whose distribution is determined by the initial outcome of individual i and some exogenous features of individual i.

Based on this setup, the likelihood function conditional on ${\displaystyle \{y_{i,0}\}_{i-1}^{N}}$  can be given as

${\displaystyle \prod _{i=1}^{N}\int f_{\theta }(c_{i}\mid y_{i,0},x_{i})\left[\prod _{t=1}^{T}{\Bigl (}1[y_{i,t}=0][1-\Phi (z_{i,t}\delta +\rho y_{i,t-1}>0]{\frac {\varphi (z_{i,t}\delta +\rho y_{i,t-1}+c_{i})}{\Phi (z_{i,t}\delta +\rho y_{i,t-1}+c_{i})}}{\biggr )}\right]\,dc_{i}}$ 

For the initial values ${\displaystyle \{y_{i,0}\}_{i-1}^{N}}$  ,there are two different ways to treat them in the construction of the likelihood function: treating them as constant, or imposing a distribution on them and calculate out the unconditional likelihood function. But whichever way is chosen to treat the initial values in the likelihood function, we cannot get rid of the integration inside the likelihood function when estimating the model by maximum likelihood estimation (MLE). Expectation Maximum (EM) algorithm is usually a good solution for this computation issue.^[3] Based on the consistent point estimates from MLE, Average Partial Effect (APE)^[4] can be calculated correspondingly.^[5]

Formulation edit

A typical dynamic unobserved effects model with a binary dependent variable is represented^[6] as:

${\displaystyle P(y_{it}=1\mid y_{i,t-1},\dots ,y_{i,0},z_{i},c_{i})=G(z_{it}\delta +\rho y_{i,t-1}+c_{i})}$ 

where c_i is an unobservable explanatory variable, z_it are explanatory variables which are exogenous conditional on the c_i, and G(∙) is a cumulative distribution function.

Estimates of parameters edit

In this type of model, economists have a special interest in ρ, which is used to characterize the state dependence. For example, y_i,t can be a woman's choice whether to work or not, z_it includes the i-th individual's age, education level, number of children, and other factors. c_i can be some individual specific characteristic which cannot be observed by economists.^[7] It is a reasonable conjecture that one's labor choice in period t should depend on his or her choice in period t − 1 due to habit formation or other reasons. This dependence is characterized by parameter ρ.

There are several MLE-based approaches to estimate δ and ρ consistently. The simplest way is to treat y_i,0 as non-stochastic and assume c_i is independent with z_i. Then by integrating P(y_i,t , y_i,t-1 , … , y_i,1 | y_i,0 , z_i , c_i) against the density of c_i, we can obtain the conditional density P(y_i,t , y_i,t-1 , ... , y_i,1 |y_i,0 , z_i). The objective function for the conditional MLE can be represented as: ${\displaystyle \sum _{i=1}^{N}}$  log (P (y_i,t , y_i,t-1, … , y_i,1 | y_i,0 , z_i)).

Treating y_i,0 as non-stochastic implicitly assumes the independence of y_i,0 on z_i. But in most cases in reality, y_i,0 depends on c_i and c_i also depends on z_i. An improvement on the approach above is to assume a density of y_i,0 conditional on (c_i, z_i) and conditional likelihood P(y_i,t , y_i,t-1 , … , y_t,1,y_i,0 | c_i, z_i) can be obtained. By integrating this likelihood against the density of c_i conditional on z_i, we can obtain the conditional density P(y_i,t , y_i,t-1 , … , y_i,1 , y_i,0 | z_i). The objective function for the conditional MLE^[8] is ${\displaystyle \sum _{i=1}^{N}}$  log (P (y_i,t , y_i,t-1, … , y_i,1 | y_i,0 , z_i)).

Based on the estimates for (δ, ρ) and the corresponding variance, values of the coefficients can be tested^[9] and the average partial effect can be calculated.^[10]