Time series data is composed of signals and noise, where signals capture intrinsic dynamics of the process; however, noise represents the unmodeled component of a signal. The intrinsic dynamics of a time series signal can be as simple as the mean of the process or it can be a complex functional form within observations, as represented here:
xt = f(xi) + εt for i=1,2,3, ... t-1
Here, xt is observations and εt is white noise. The f(xi) denotes the functional form; an example of a constant as a functional form is as follows:
xt = μ + εt
Here, the constant value μ in the preceding equation acts as a drift parameter, as shown in the following figure:
Figure 3.1: Example of time series with drift parameter
As εt is white noise, this smoothing-based approach helps separate the intrinsic functional form from random...
