We will begin our discussion of Gaussian processes by first describing a way to represent functions as probabilistic objects. We may think of a function, 
, as a mapping from a set of inputs, 
, to a set of outputs, 
. Thus, we can write:
One way to represent functions is by listing for each 
value its corresponding 
value. In fact, you may remember this way of representing functions from elementary school:
| x | y |
|---|---|
| 0.00 | 0.46 |
| 0.33 | 2.60 |
| 0.67 | 5.90 |
| 1.00 | 7.91 |
As a general case, the values of and will live on the real line; thus, we can see a function as a (potentially) infinite and ordered list of paired (
, 
) values. The order is important because, if we shuffle the values, we will get different functions.
A function can also be represented as a (potentially) infinite array indexed by the values of , with the important distinction that the values of...
