In probability theory and statistics, smoothness of a density function is a measure which determines how many times the density function can be differentiated, or equivalently the limiting behavior of distributionâÂÂs characteristic function.
Formally, we call the distribution of a random variable X ordinary smooth of order ò if its characteristic function satisfies
for some positive constants d<sub>0</sub>, d<sub>1</sub>, ò. The examples of such distributions are gamma, exponential, uniform, etc.
The distribution is called supersmooth of order ò if its characteristic function satisfies
for some positive constants d<sub>0</sub>, d<sub>1</sub>, ò, ó and constants ò<sub>0</sub>, ò<sub>1</sub>. Such supersmooth distributions have derivatives of all orders. Examples: normal, Cauchy, mixture normal.