Probability model
A probability model allows for the formal mathematical description of contingencies.
Formally, a probability model is a Measure space
represents the set of mutually exclusive outcomes (world-states); is a σ-algebra of possible events closed under compliment, finite union, and finite intersection; and is the probability measure of an event.
Note in some cases, especially discrete ones,
it is unnecessary to limit what kind events are allowed,
and so
An event here represents some (possibly infinite) union of outcome singletons,
i.e. an event is a set of outcomes which would fulfil the event.
The σ-algebra contains at least
- The intersection of events
, which represents the fulfilment of both (and) - The union of events
, which represents the fulfilment of either (or) - The compliment of an event
, which represents the non-fulfilment of (not)
The probability of any such event is
Properties
Some of these follow from measure space Properties
is monotone on ordered by inclusion, i.e. . - For any
, it holds that