Lecture #16 - Random Processes Flashcards
What is a random variable?
A random variable is a function that assigns a real number to each outcome in the sample space of a random experiment.
What is covariance?
The measure of how two random variables change together
What’s a random process
A collection of random variables, characterised by a set of probability distribution functions that are a function of time.
When would you use a random process?
Modelling any natural phenomena
What is the difference between a random variable and a random process w.r.t the output of an experiment?
RV, the output is mapped to a number
RP, the output of the experiment is mapped to a waveform which is a function of time.
What does it mean for a random process X(t) to be strictly stationary
If the joint probability distribution is time-invariant
Explain the relationship between strict sense stationary process and wide sense stationary
Strict sense stationary process is always wide sense stationary, but not the other way around.
Describe what a cyclostationary process is
- Signal whose statistical properties vary cyclically with time
PAM
Describe what a locally stationary or quasi-stationary is
- Statistical properties change slowly over short periods of time.
- Globally nonstationary, but approximately locally stationary, and are
- Modelled as if the statistics actually are stationary over a short segments
- E.g. speech
What does a stationary process mean?
If the statistical properties do not change over time.
