The density of the Laplace distribution is given by:
$$f(x;\mu,\sigma)=\frac{1}{2\sigma}\exp\left(-\frac{\vert x- \mu\vert}{\sigma}\right).$$
It is easy to see that this function is not differentiable at $\mu$. However, I am interested on some asymptotic normality results of the MLE $(\hat{\mu},\hat{\sigma})$, which require double-differentiability of the log likelihood function:
$${\mathcal l}(\mu,\sigma) = \sum_{j=1}^n \log f(x_j;\mu,\sigma),$$
with respect to $(\mu,\sigma)$, for a random sample $(x_1,\dots,x_n)$. What I basically need is the existence of the Hessian matrix of the log-likelihood evaluated at the MLE, which means the existence of: $\frac{\partial^2}{\partial \mu^2}{\mathcal l}(\mu,\sigma) \Big\vert_{\mu=\hat{\mu}}$, $\frac{\partial^2}{\partial \sigma^2}{\mathcal l}(\mu,\sigma) \Big\vert_{\sigma=\hat{\sigma}}$, $\frac{\partial^2}{\partial \mu\partial\sigma}{\mathcal l}(\mu,\sigma) \Big\vert_{\mu=\hat{\mu},\sigma=\hat{\sigma}}$.
Is there any reference to justify differentiability of the log-likelihood, or it is not differentiable at the MLE?
